NvidiaWarp-GarmentCode/warp/stubs.py

# Autogenerated file, do not edit, this file provides stubs for builtins autocomplete in VSCode, PyCharm, etc

from typing import Any
from typing import Tuple
from typing import Callable
from typing import TypeVar
from typing import Generic
from typing import overload as over

Length = TypeVar("Length", bound=int)
Rows = TypeVar("Rows", bound=int)
Cols = TypeVar("Cols", bound=int)
DType = TypeVar("DType")
Int = TypeVar("Int")
Float = TypeVar("Float")
Scalar = TypeVar("Scalar")
Vector = Generic[Length, Scalar]
Matrix = Generic[Rows, Cols, Scalar]
Quaternion = Generic[Float]
Transformation = Generic[Float]
Array = Generic[DType]
FabricArray = Generic[DType]
IndexedFabricArray = Generic[DType]

from warp.types import array, array1d, array2d, array3d, array4d, constant
from warp.types import indexedarray, indexedarray1d, indexedarray2d, indexedarray3d, indexedarray4d
from warp.fabric import fabricarray, fabricarrayarray, indexedfabricarray, indexedfabricarrayarray

from warp.types import bool, int8, uint8, int16, uint16, int32, uint32, int64, uint64, float16, float32, float64
from warp.types import vec2, vec2b, vec2ub, vec2s, vec2us, vec2i, vec2ui, vec2l, vec2ul, vec2h, vec2f, vec2d
from warp.types import vec3, vec3b, vec3ub, vec3s, vec3us, vec3i, vec3ui, vec3l, vec3ul, vec3h, vec3f, vec3d
from warp.types import vec4, vec4b, vec4ub, vec4s, vec4us, vec4i, vec4ui, vec4l, vec4ul, vec4h, vec4f, vec4d
from warp.types import mat22, mat22h, mat22f, mat22d
from warp.types import mat33, mat33h, mat33f, mat33d
from warp.types import mat44, mat44h, mat44f, mat44d
from warp.types import quat, quath, quatf, quatd
from warp.types import transform, transformh, transformf, transformd
from warp.types import spatial_vector, spatial_vectorh, spatial_vectorf, spatial_vectord
from warp.types import spatial_matrix, spatial_matrixh, spatial_matrixf, spatial_matrixd

from warp.types import Bvh, Mesh, HashGrid, Volume, MarchingCubes
from warp.types import bvh_query_t, hash_grid_query_t, mesh_query_aabb_t, mesh_query_point_t, mesh_query_ray_t


from warp.types import matmul, adj_matmul, batched_matmul, adj_batched_matmul, from_ptr

from warp.types import vector as vec
from warp.types import matrix as mat

from warp.context import init, func, func_grad, func_replay, func_native, kernel, struct, overload
from warp.context import is_cpu_available, is_cuda_available, is_device_available
from warp.context import get_devices, get_preferred_device
from warp.context import get_cuda_devices, get_cuda_device_count, get_cuda_device, map_cuda_device, unmap_cuda_device
from warp.context import get_device, set_device, synchronize_device
from warp.context import (
    zeros,
    zeros_like,
    full,
    full_like,
    clone,
    empty,
    empty_like,
    copy,
    from_numpy,
    launch,
    synchronize,
    force_load,
    load_module,
)
from warp.context import set_module_options, get_module_options, get_module
from warp.context import capture_begin, capture_end, capture_launch
from warp.context import Kernel, Function, Launch
from warp.context import Stream, get_stream, set_stream, synchronize_stream
from warp.context import Event, record_event, wait_event, wait_stream
from warp.context import RegisteredGLBuffer

from warp.tape import Tape
from warp.utils import ScopedTimer, ScopedDevice, ScopedStream
from warp.utils import transform_expand, quat_between_vectors

from warp.torch import from_torch, to_torch
from warp.torch import device_from_torch, device_to_torch
from warp.torch import stream_from_torch, stream_to_torch

from warp.jax import from_jax, to_jax
from warp.jax import device_from_jax, device_to_jax

from warp.dlpack import from_dlpack, to_dlpack

from warp.constants import *

from . import builtins

import warp.config

__version__ = warp.config.version


@over
def min(x: Scalar, y: Scalar) -> Scalar:
    """
    Return the minimum of two scalars.
    """
    ...


@over
def min(x: Vector[Any, Scalar], y: Vector[Any, Scalar]) -> Vector[Any, Scalar]:
    """
    Return the element-wise minimum of two vectors.
    """
    ...


@over
def min(v: Vector[Any, Scalar]) -> Scalar:
    """
    Return the minimum element of a vector ``v``.
    """
    ...


@over
def max(x: Scalar, y: Scalar) -> Scalar:
    """
    Return the maximum of two scalars.
    """
    ...


@over
def max(x: Vector[Any, Scalar], y: Vector[Any, Scalar]) -> Vector[Any, Scalar]:
    """
    Return the element-wise maximum of two vectors.
    """
    ...


@over
def max(v: Vector[Any, Scalar]) -> Scalar:
    """
    Return the maximum element of a vector ``v``.
    """
    ...


@over
def clamp(x: Scalar, a: Scalar, b: Scalar) -> Scalar:
    """
    Clamp the value of ``x`` to the range [a, b].
    """
    ...


@over
def abs(x: Scalar) -> Scalar:
    """
    Return the absolute value of ``x``.
    """
    ...


@over
def sign(x: Scalar) -> Scalar:
    """
    Return -1 if ``x`` < 0, return 1 otherwise.
    """
    ...


@over
def step(x: Scalar) -> Scalar:
    """
    Return 1.0 if ``x`` < 0.0, return 0.0 otherwise.
    """
    ...


@over
def nonzero(x: Scalar) -> Scalar:
    """
    Return 1.0 if ``x`` is not equal to zero, return 0.0 otherwise.
    """
    ...


@over
def sin(x: Float) -> Float:
    """
    Return the sine of ``x`` in radians.
    """
    ...


@over
def cos(x: Float) -> Float:
    """
    Return the cosine of ``x`` in radians.
    """
    ...


@over
def acos(x: Float) -> Float:
    """
    Return arccos of ``x`` in radians. Inputs are automatically clamped to [-1.0, 1.0].
    """
    ...


@over
def asin(x: Float) -> Float:
    """
    Return arcsin of ``x`` in radians. Inputs are automatically clamped to [-1.0, 1.0].
    """
    ...


@over
def sqrt(x: Float) -> Float:
    """
    Return the square root of ``x``, where ``x`` is positive.
    """
    ...


@over
def cbrt(x: Float) -> Float:
    """
    Return the cube root of ``x``.
    """
    ...


@over
def tan(x: Float) -> Float:
    """
    Return the tangent of ``x`` in radians.
    """
    ...


@over
def atan(x: Float) -> Float:
    """
    Return the arctangent of ``x`` in radians.
    """
    ...


@over
def atan2(y: Float, x: Float) -> Float:
    """
    Return the 2-argument arctangent, atan2, of the point ``(x, y)`` in radians.
    """
    ...


@over
def sinh(x: Float) -> Float:
    """
    Return the sinh of ``x``.
    """
    ...


@over
def cosh(x: Float) -> Float:
    """
    Return the cosh of ``x``.
    """
    ...


@over
def tanh(x: Float) -> Float:
    """
    Return the tanh of ``x``.
    """
    ...


@over
def degrees(x: Float) -> Float:
    """
    Convert ``x`` from radians into degrees.
    """
    ...


@over
def radians(x: Float) -> Float:
    """
    Convert ``x`` from degrees into radians.
    """
    ...


@over
def log(x: Float) -> Float:
    """
    Return the natural logarithm (base-e) of ``x``, where ``x`` is positive.
    """
    ...


@over
def log2(x: Float) -> Float:
    """
    Return the binary logarithm (base-2) of ``x``, where ``x`` is positive.
    """
    ...


@over
def log10(x: Float) -> Float:
    """
    Return the common logarithm (base-10) of ``x``, where ``x`` is positive.
    """
    ...


@over
def exp(x: Float) -> Float:
    """
    Return the value of the exponential function :math:`e^x`.
    """
    ...


@over
def pow(x: Float, y: Float) -> Float:
    """
    Return the result of ``x`` raised to power of ``y``.
    """
    ...


@over
def round(x: Float) -> Float:
    """
    Return the nearest integer value to ``x``, rounding halfway cases away from zero.
       This is the most intuitive form of rounding in the colloquial sense, but can be slower than other options like :func:`warp.rint()`.
       Differs from :func:`numpy.round()`, which behaves the same way as :func:`numpy.rint()`.
    """
    ...


@over
def rint(x: Float) -> Float:
    """
    Return the nearest integer value to ``x``, rounding halfway cases to nearest even integer.
       It is generally faster than :func:`warp.round()`. Equivalent to :func:`numpy.rint()`.
    """
    ...


@over
def trunc(x: Float) -> Float:
    """
    Return the nearest integer that is closer to zero than ``x``.
       In other words, it discards the fractional part of ``x``.
       It is similar to casting ``float(int(x))``, but preserves the negative sign when x is in the range [-0.0, -1.0).
       Equivalent to :func:`numpy.trunc()` and :func:`numpy.fix()`.
    """
    ...


@over
def floor(x: Float) -> Float:
    """
    Return the largest integer that is less than or equal to ``x``.
    """
    ...


@over
def ceil(x: Float) -> Float:
    """
    Return the smallest integer that is greater than or equal to ``x``.
    """
    ...


@over
def frac(x: Float) -> Float:
    """
    Retrieve the fractional part of x.
        In other words, it discards the integer part of x and is equivalent to ``x - trunc(x)``.
    """
    ...


@over
def dot(x: Vector[Any, Scalar], y: Vector[Any, Scalar]) -> Scalar:
    """
    Compute the dot product between two vectors.
    """
    ...


@over
def dot(x: Quaternion[Float], y: Quaternion[Float]) -> Scalar:
    """
    Compute the dot product between two quaternions.
    """
    ...


@over
def ddot(x: Matrix[Any, Any, Scalar], y: Matrix[Any, Any, Scalar]) -> Scalar:
    """
    Compute the double dot product between two matrices.
    """
    ...


@over
def argmin(v: Vector[Any, Scalar]) -> uint32:
    """
    Return the index of the minimum element of a vector ``v``.
    """
    ...


@over
def argmax(v: Vector[Any, Scalar]) -> uint32:
    """
    Return the index of the maximum element of a vector ``v``.
    """
    ...


@over
def outer(x: Vector[Any, Scalar], y: Vector[Any, Scalar]) -> Matrix[Any, Any, Scalar]:
    """
    Compute the outer product ``x*y^T`` for two vectors.
    """
    ...


@over
def cross(x: Vector[3, Scalar], y: Vector[3, Scalar]) -> Vector[3, Scalar]:
    """
    Compute the cross product of two 3D vectors.
    """
    ...


@over
def skew(x: Vector[3, Scalar]):
    """
    Compute the skew-symmetric 3x3 matrix for a 3D vector ``x``.
    """
    ...


@over
def length(x: Vector[Any, Float]) -> Scalar:
    """
    Compute the length of a vector ``x``.
    """
    ...


@over
def length(x: Quaternion[Float]) -> Scalar:
    """
    Compute the length of a quaternion ``x``.
    """
    ...


@over
def length_sq(x: Vector[Any, Scalar]) -> Scalar:
    """
    Compute the squared length of a 2D vector ``x``.
    """
    ...


@over
def length_sq(x: Quaternion[Scalar]) -> Scalar:
    """
    Compute the squared length of a quaternion ``x``.
    """
    ...


@over
def normalize(x: Vector[Any, Float]) -> Vector[Any, Scalar]:
    """
    Compute the normalized value of ``x``. If ``length(x)`` is 0 then the zero vector is returned.
    """
    ...


@over
def normalize(x: Quaternion[Float]) -> Quaternion[Scalar]:
    """
    Compute the normalized value of ``x``. If ``length(x)`` is 0, then the zero quaternion is returned.
    """
    ...


@over
def transpose(m: Matrix[Any, Any, Scalar]):
    """
    Return the transpose of the matrix ``m``.
    """
    ...


@over
def inverse(m: Matrix[2, 2, Float]) -> Matrix[Any, Any, Float]:
    """
    Return the inverse of a 2x2 matrix ``m``.
    """
    ...


@over
def inverse(m: Matrix[3, 3, Float]) -> Matrix[Any, Any, Float]:
    """
    Return the inverse of a 3x3 matrix ``m``.
    """
    ...


@over
def inverse(m: Matrix[4, 4, Float]) -> Matrix[Any, Any, Float]:
    """
    Return the inverse of a 4x4 matrix ``m``.
    """
    ...


@over
def determinant(m: Matrix[2, 2, Float]) -> Scalar:
    """
    Return the determinant of a 2x2 matrix ``m``.
    """
    ...


@over
def determinant(m: Matrix[3, 3, Float]) -> Scalar:
    """
    Return the determinant of a 3x3 matrix ``m``.
    """
    ...


@over
def determinant(m: Matrix[4, 4, Float]) -> Scalar:
    """
    Return the determinant of a 4x4 matrix ``m``.
    """
    ...


@over
def trace(m: Matrix[Any, Any, Scalar]) -> Scalar:
    """
    Return the trace of the matrix ``m``.
    """
    ...


@over
def diag(d: Vector[Any, Scalar]) -> Matrix[Any, Any, Scalar]:
    """
    Returns a matrix with the components of the vector ``d`` on the diagonal.
    """
    ...


@over
def get_diag(m: Matrix[Any, Any, Scalar]) -> Vector[Any, Scalar]:
    """
    Returns a vector containing the diagonal elements of the square matrix ``m``.
    """
    ...


@over
def get_diag(m: Matrix[Any, Any, Scalar]) -> Vector[Any, Scalar]:
    """
    Returns a vector containing the diagonal elements of the square matrix.
    """
    ...


@over
def cw_mul(x: Vector[Any, Scalar], y: Vector[Any, Scalar]) -> Vector[Any, Scalar]:
    """
    Component-wise multiplication of two 2D vectors.
    """
    ...


@over
def cw_mul(x: Matrix[Any, Any, Scalar], y: Matrix[Any, Any, Scalar]) -> Matrix[Any, Any, Scalar]:
    """
    Component-wise multiplication of two 2D vectors.
    """
    ...


@over
def cw_div(x: Vector[Any, Scalar], y: Vector[Any, Scalar]) -> Vector[Any, Scalar]:
    """
    Component-wise division of two 2D vectors.
    """
    ...


@over
def cw_div(x: Matrix[Any, Any, Scalar], y: Matrix[Any, Any, Scalar]) -> Matrix[Any, Any, Scalar]:
    """
    Component-wise division of two 2D vectors.
    """
    ...


@over
def quat_identity() -> quatf:
    """
    Construct an identity quaternion with zero imaginary part and real part of 1.0
    """
    ...


@over
def quat_from_axis_angle(axis: Vector[3, Float], angle: Float) -> Quaternion[Scalar]:
    """
    Construct a quaternion representing a rotation of angle radians around the given axis.
    """
    ...


@over
def quat_to_axis_angle(q: Quaternion[Float], axis: Vector[3, Float], angle: Float):
    """
    Extract the rotation axis and angle radians a quaternion represents.
    """
    ...


@over
def quat_from_matrix(m: Matrix[3, 3, Float]) -> Quaternion[Scalar]:
    """
    Construct a quaternion from a 3x3 matrix.
    """
    ...


@over
def quat_rpy(roll: Float, pitch: Float, yaw: Float) -> Quaternion[Scalar]:
    """
    Construct a quaternion representing a combined roll (z), pitch (x), yaw rotations (y) in radians.
    """
    ...


@over
def quat_inverse(q: Quaternion[Float]) -> Quaternion[Scalar]:
    """
    Compute quaternion conjugate.
    """
    ...


@over
def quat_rotate(q: Quaternion[Float], p: Vector[3, Float]) -> Vector[3, Scalar]:
    """
    Rotate a vector by a quaternion.
    """
    ...


@over
def quat_rotate_inv(q: Quaternion[Float], p: Vector[3, Float]) -> Vector[3, Scalar]:
    """
    Rotate a vector by the inverse of a quaternion.
    """
    ...


@over
def quat_slerp(q0: Quaternion[Float], q1: Quaternion[Float], t: Float) -> Quaternion[Scalar]:
    """
    Linearly interpolate between two quaternions.
    """
    ...


@over
def quat_to_matrix(q: Quaternion[Float]) -> Matrix[3, 3, Scalar]:
    """
    Convert a quaternion to a 3x3 rotation matrix.
    """
    ...


@over
def transform_identity() -> transformf:
    """
    Construct an identity transform with zero translation and identity rotation.
    """
    ...


@over
def transform_get_translation(t: Transformation[Float]) -> Vector[3, Scalar]:
    """
    Return the translational part of a transform ``t``.
    """
    ...


@over
def transform_get_rotation(t: Transformation[Float]) -> Quaternion[Scalar]:
    """
    Return the rotational part of a transform ``t``.
    """
    ...


@over
def transform_multiply(a: Transformation[Float], b: Transformation[Float]) -> Transformation[Scalar]:
    """
    Multiply two rigid body transformations together.
    """
    ...


@over
def transform_point(t: Transformation[Scalar], p: Vector[3, Scalar]) -> Vector[3, Scalar]:
    """
    Apply the transform to a point ``p`` treating the homogenous coordinate as w=1 (translation and rotation).
    """
    ...


@over
def transform_point(m: Matrix[4, 4, Scalar], p: Vector[3, Scalar]) -> Vector[3, Scalar]:
    """
    Apply the transform to a point ``p`` treating the homogenous coordinate as w=1.
       The transformation is applied treating ``p`` as a column vector, e.g.: ``y = M*p``.
       Note this is in contrast to some libraries, notably USD, which applies transforms to row vectors, ``y^T = p^T*M^T``.
       If the transform is coming from a library that uses row-vectors, then users should transpose the transformation
       matrix before calling this method.
    """
    ...


@over
def transform_vector(t: Transformation[Scalar], v: Vector[3, Scalar]) -> Vector[3, Scalar]:
    """
    Apply the transform to a vector ``v`` treating the homogenous coordinate as w=0 (rotation only).
    """
    ...


@over
def transform_vector(m: Matrix[4, 4, Scalar], v: Vector[3, Scalar]) -> Vector[3, Scalar]:
    """
    Apply the transform to a vector ``v`` treating the homogenous coordinate as w=0.
       The transformation is applied treating ``v`` as a column vector, e.g.: ``y = M*v``
       note this is in contrast to some libraries, notably USD, which applies transforms to row vectors, ``y^T = v^T*M^T``.
       If the transform is coming from a library that uses row-vectors, then users should transpose the transformation
       matrix before calling this method.
    """
    ...


@over
def transform_inverse(t: Transformation[Float]) -> Transformation[Float]:
    """
    Compute the inverse of the transformation ``t``.
    """
    ...


@over
def spatial_dot(a: Vector[6, Float], b: Vector[6, Float]) -> Scalar:
    """
    Compute the dot product of two 6D screw vectors.
    """
    ...


@over
def spatial_cross(a: Vector[6, Float], b: Vector[6, Float]) -> Vector[6, Float]:
    """
    Compute the cross product of two 6D screw vectors.
    """
    ...


@over
def spatial_cross_dual(a: Vector[6, Float], b: Vector[6, Float]) -> Vector[6, Float]:
    """
    Compute the dual cross product of two 6D screw vectors.
    """
    ...


@over
def spatial_top(a: Vector[6, Float]):
    """
    Return the top (first) part of a 6D screw vector.
    """
    ...


@over
def spatial_bottom(a: Vector[6, Float]):
    """
    Return the bottom (second) part of a 6D screw vector.
    """
    ...


@over
def spatial_jacobian(
    S: Array[Vector[6, Float]],
    joint_parents: Array[int32],
    joint_qd_start: Array[int32],
    joint_start: int32,
    joint_count: int32,
    J_start: int32,
    J_out: Array[Float],
):
    """ """
    ...


@over
def spatial_mass(
    I_s: Array[Matrix[6, 6, Float]], joint_start: int32, joint_count: int32, M_start: int32, M: Array[Float]
):
    """ """
    ...


@over
def mlp(
    weights: Array[float32],
    bias: Array[float32],
    activation: Callable,
    index: int32,
    x: Array[float32],
    out: Array[float32],
):
    """
    Evaluate a multi-layer perceptron (MLP) layer in the form: ``out = act(weights*x + bias)``.

       :param weights: A layer's network weights with dimensions ``(m, n)``.
       :param bias: An array with dimensions ``(n)``.
       :param activation: A ``wp.func`` function that takes a single scalar float as input and returns a scalar float as output
       :param index: The batch item to process, typically each thread will process one item in the batch, in which case
                     index should be ``wp.tid()``
       :param x: The feature matrix with dimensions ``(n, b)``
       :param out: The network output with dimensions ``(m, b)``

       :note: Feature and output matrices are transposed compared to some other frameworks such as PyTorch.
              All matrices are assumed to be stored in flattened row-major memory layout (NumPy default).
    """
    ...


@over
def bvh_query_aabb(id: uint64, lower: vec3f, upper: vec3f) -> bvh_query_t:
    """
    Construct an axis-aligned bounding box query against a BVH object. This query can be used to iterate over all bounds
       inside a BVH.

       :param id: The BVH identifier
       :param lower: The lower bound of the bounding box in BVH space
       :param upper: The upper bound of the bounding box in BVH space
    """
    ...


@over
def bvh_query_ray(id: uint64, start: vec3f, dir: vec3f) -> bvh_query_t:
    """
    Construct a ray query against a BVH object. This query can be used to iterate over all bounds
       that intersect the ray.

       :param id: The BVH identifier
       :param start: The start of the ray in BVH space
       :param dir: The direction of the ray in BVH space
    """
    ...


@over
def bvh_query_next(query: bvh_query_t, index: int32) -> bool:
    """
    Move to the next bound returned by the query.
       The index of the current bound is stored in ``index``, returns ``False`` if there are no more overlapping bound.
    """
    ...


@over
def mesh_query_point(id: uint64, point: vec3f, max_dist: float32) -> mesh_query_point_t:
    """
    Computes the closest point on the :class:`Mesh` with identifier ``id`` to the given ``point`` in space.

       Identifies the sign of the distance using additional ray-casts to determine if the point is inside or outside.
       This method is relatively robust, but does increase computational cost.
       See below for additional sign determination methods.

       Identifies the sign of the distance using additional ray-casts to determine if the point is inside or outside. This method is relatively robust, but
       does increase computational cost. See below for additional sign determination methods.

       :param id: The mesh identifier
       :param point: The point in space to query
       :param max_dist: Mesh faces above this distance will not be considered by the query
    """
    ...


@over
def mesh_query_point_no_sign(id: uint64, point: vec3f, max_dist: float32) -> mesh_query_point_t:
    """
    Computes the closest point on the :class:`Mesh` with identifier ``id`` to the given ``point`` in space.

       This method does not compute the sign of the point (inside/outside) which makes it faster than other point query methods.

       :param id: The mesh identifier
       :param point: The point in space to query
       :param max_dist: Mesh faces above this distance will not be considered by the query
    """
    ...


@over
def mesh_query_furthest_point_no_sign(id: uint64, point: vec3f, min_dist: float32) -> mesh_query_point_t:
    """
    Computes the furthest point on the mesh with identifier `id` to the given point in space.

       This method does not compute the sign of the point (inside/outside).

       :param id: The mesh identifier
       :param point: The point in space to query
       :param min_dist: Mesh faces below this distance will not be considered by the query
    """
    ...


@over
def mesh_query_point_sign_normal(id: uint64, point: vec3f, max_dist: float32, epsilon: float32) -> mesh_query_point_t:
    """
    Computes the closest point on the :class:`Mesh` with identifier ``id`` to the given ``point`` in space.

       Identifies the sign of the distance (inside/outside) using the angle-weighted pseudo normal.
       This approach to sign determination is robust for well conditioned meshes that are watertight and non-self intersecting.
       It is also comparatively fast to compute.

       :param id: The mesh identifier
       :param point: The point in space to query
       :param max_dist: Mesh faces above this distance will not be considered by the query
       :param epsilon: Epsilon treating distance values as equal, when locating the minimum distance vertex/face/edge, as a
                       fraction of the average edge length, also for treating closest point as being on edge/vertex default 1e-3
    """
    ...


@over
def mesh_query_point_sign_winding_number(
    id: uint64, point: vec3f, max_dist: float32, accuracy: float32, threshold: float32
) -> mesh_query_point_t:
    """
    Computes the closest point on the :class:`Mesh` with identifier ``id`` to the given point in space.

       Identifies the sign using the winding number of the mesh relative to the query point. This method of sign determination is robust for poorly conditioned meshes
       and provides a smooth approximation to sign even when the mesh is not watertight. This method is the most robust and accurate of the sign determination meshes
       but also the most expensive.

       .. note:: The :class:`Mesh` object must be constructed with ``support_winding_number=True`` for this method to return correct results.

       :param id: The mesh identifier
       :param point: The point in space to query
       :param max_dist: Mesh faces above this distance will not be considered by the query
       :param accuracy: Accuracy for computing the winding number with fast winding number method utilizing second-order dipole approximation, default 2.0
       :param threshold: The threshold of the winding number to be considered inside, default 0.5
    """
    ...


@over
def mesh_query_ray(id: uint64, start: vec3f, dir: vec3f, max_t: float32) -> mesh_query_ray_t:
    """
    Computes the closest ray hit on the :class:`Mesh` with identifier ``id``.

       :param id: The mesh identifier
       :param start: The start point of the ray
       :param dir: The ray direction (should be normalized)
       :param max_t: The maximum distance along the ray to check for intersections
    """
    ...


@over
def mesh_query_edge(
    id: uint64,
    v1: int,
    v2: int,
    t: float32,
    bary_u: float32,
    bary_v: float32,
    sign: float32,
    normal: vec3f,
    face: int32,
) -> bool:
    """
    Computes the closest edge hit on the mesh with identifier `id`, returns ``True`` if a point < ``max_t`` is found.

       :param id: The mesh identifier
       :param v1: The first vertex of the edge
       :param v2: The second vertex of the edge
       :param t: Returns the distance of the closest hit along the ray
       :param bary_u: Returns the barycentric u coordinate of the closest hit
       :param bary_v: Returns the barycentric v coordinate of the closest hit
       :param sign: Returns a value > 0 if the hit ray hit front of the face, returns < 0 otherwise
       :param normal: Returns the face normal
       :param face: Returns the index of the hit face
    """
    ...


@over
def mesh_query_aabb(id: uint64, lower: vec3f, upper: vec3f) -> mesh_query_aabb_t:
    """
    Construct an axis-aligned bounding box query against a :class:`Mesh`.
       This query can be used to iterate over all triangles inside a volume.

       :param id: The mesh identifier
       :param lower: The lower bound of the bounding box in mesh space
       :param upper: The upper bound of the bounding box in mesh space
    """
    ...


@over
def mesh_query_aabb_next(query: mesh_query_aabb_t, index: int32) -> bool:
    """
    Move to the next triangle overlapping the query bounding box.
       The index of the current face is stored in ``index``, returns ``False`` if there are no more overlapping triangles.
    """
    ...


@over
def mesh_eval_position(id: uint64, face: int32, bary_u: float32, bary_v: float32) -> vec3f:
    """
    Evaluates the position on the :class:`Mesh` given a face index and barycentric coordinates.
    """
    ...


@over
def mesh_eval_velocity(id: uint64, face: int32, bary_u: float32, bary_v: float32) -> vec3f:
    """
    Evaluates the velocity on the :class:`Mesh` given a face index and barycentric coordinates.
    """
    ...


@over
def hash_grid_query(id: uint64, point: vec3f, max_dist: float32) -> hash_grid_query_t:
    """
    Construct a point query against a :class:`HashGrid`. This query can be used to iterate over all neighboring points within a fixed radius from the query point.
    """
    ...


@over
def hash_grid_query_next(query: hash_grid_query_t, index: int32) -> bool:
    """
    Move to the next point in the hash grid query. The index of the current neighbor is stored in ``index``, returns ``False``
       if there are no more neighbors.
    """
    ...


@over
def hash_grid_point_id(id: uint64, index: int32) -> int:
    """
    Return the index of a point in the :class:`HashGrid`. This can be used to reorder threads such that grid
       traversal occurs in a spatially coherent order.

       Returns -1 if the :class:`HashGrid` has not been reserved.
    """
    ...


@over
def intersect_tri_tri(v0: vec3f, v1: vec3f, v2: vec3f, u0: vec3f, u1: vec3f, u2: vec3f) -> int:
    """
    Tests for intersection between two triangles (v0, v1, v2) and (u0, u1, u2) using Moller's method. Returns > 0 if triangles intersect.
    """
    ...


@over
def mesh_get(id: uint64) -> Mesh:
    """
    Retrieves the mesh given its index.
    """
    ...


@over
def mesh_eval_face_normal(id: uint64, face: int32) -> vec3f:
    """
    Evaluates the face normal the mesh given a face index.
    """
    ...


@over
def mesh_get_point(id: uint64, index: int32) -> vec3f:
    """
    Returns the point of the mesh given a index.
    """
    ...


@over
def mesh_get_velocity(id: uint64, index: int32) -> vec3f:
    """
    Returns the velocity of the mesh given a index.
    """
    ...


@over
def mesh_get_index(id: uint64, index: int32) -> int:
    """
    Returns the point-index of the mesh given a face-vertex index.
    """
    ...


@over
def closest_point_edge_edge(p1: vec3f, q1: vec3f, p2: vec3f, q2: vec3f, epsilon: float32) -> vec3f:
    """
    Finds the closest points between two edges. Returns barycentric weights to the points on each edge, as well as the closest distance between the edges.

       :param p1: First point of first edge
       :param q1: Second point of first edge
       :param p2: First point of second edge
       :param q2: Second point of second edge
       :param epsilon: Zero tolerance for determining if points in an edge are degenerate.
       :param out: vec3 output containing (s,t,d), where `s` in [0,1] is the barycentric weight for the first edge, `t` is the barycentric weight for the second edge, and `d` is the distance between the two edges at these two closest points.
    """
    ...


@over
def volume_sample_f(id: uint64, uvw: vec3f, sampling_mode: int32) -> float:
    """
    Sample the volume given by ``id`` at the volume local-space point ``uvw``.
       Interpolation should be :attr:`warp.Volume.CLOSEST` or :attr:`wp.Volume.LINEAR.`
    """
    ...


@over
def volume_sample_grad_f(id: uint64, uvw: vec3f, sampling_mode: int32, grad: vec3f) -> float:
    """
    Sample the volume and its gradient given by ``id`` at the volume local-space point ``uvw``.
       Interpolation should be :attr:`warp.Volume.CLOSEST` or :attr:`wp.Volume.LINEAR.`
    """
    ...


@over
def volume_sample_grad_f(id: uint64, uvw: vec3f, sampling_mode: int32, grad: vec3f) -> float:
    """
    Sample the volume and its gradient given by ``id`` at the volume local-space point ``uvw``. Interpolation should be ``wp.Volume.CLOSEST``, or ``wp.Volume.LINEAR.``
    """
    ...


@over
def volume_lookup_f(id: uint64, i: int32, j: int32, k: int32) -> float:
    """
    Returns the value of voxel with coordinates ``i``, ``j``, ``k``.
       If the voxel at this index does not exist, this function returns the background value
    """
    ...


@over
def volume_store_f(id: uint64, i: int32, j: int32, k: int32, value: float32):
    """
    Store ``value`` at the voxel with coordinates ``i``, ``j``, ``k``.
    """
    ...


@over
def volume_sample_v(id: uint64, uvw: vec3f, sampling_mode: int32) -> vec3f:
    """
    Sample the vector volume given by ``id`` at the volume local-space point ``uvw``.
       Interpolation should be :attr:`warp.Volume.CLOSEST` or :attr:`wp.Volume.LINEAR.`
    """
    ...


@over
def volume_lookup_v(id: uint64, i: int32, j: int32, k: int32) -> vec3f:
    """
    Returns the vector value of voxel with coordinates ``i``, ``j``, ``k``.
       If the voxel at this index does not exist, this function returns the background value.
    """
    ...


@over
def volume_store_v(id: uint64, i: int32, j: int32, k: int32, value: vec3f):
    """
    Store ``value`` at the voxel with coordinates ``i``, ``j``, ``k``.
    """
    ...


@over
def volume_sample_i(id: uint64, uvw: vec3f) -> int:
    """
    Sample the :class:`int32` volume given by ``id`` at the volume local-space point ``uvw``.
    """
    ...


@over
def volume_lookup_i(id: uint64, i: int32, j: int32, k: int32) -> int:
    """
    Returns the :class:`int32` value of voxel with coordinates ``i``, ``j``, ``k``.
       If the voxel at this index does not exist, this function returns the background value.
    """
    ...


@over
def volume_store_i(id: uint64, i: int32, j: int32, k: int32, value: int32):
    """
    Store ``value`` at the voxel with coordinates ``i``, ``j``, ``k``.
    """
    ...


@over
def volume_index_to_world(id: uint64, uvw: vec3f) -> vec3f:
    """
    Transform a point ``uvw`` defined in volume index space to world space given the volume's intrinsic affine transformation.
    """
    ...


@over
def volume_world_to_index(id: uint64, xyz: vec3f) -> vec3f:
    """
    Transform a point ``xyz`` defined in volume world space to the volume's index space given the volume's intrinsic affine transformation.
    """
    ...


@over
def volume_index_to_world_dir(id: uint64, uvw: vec3f) -> vec3f:
    """
    Transform a direction ``uvw`` defined in volume index space to world space given the volume's intrinsic affine transformation.
    """
    ...


@over
def volume_world_to_index_dir(id: uint64, xyz: vec3f) -> vec3f:
    """
    Transform a direction ``xyz`` defined in volume world space to the volume's index space given the volume's intrinsic affine transformation.
    """
    ...


@over
def rand_init(seed: int32) -> uint32:
    """
    Initialize a new random number generator given a user-defined seed. Returns a 32-bit integer representing the RNG state.
    """
    ...


@over
def rand_init(seed: int32, offset: int32) -> uint32:
    """
    Initialize a new random number generator given a user-defined seed and an offset.
       This alternative constructor can be useful in parallel programs, where a kernel as a whole should share a seed,
       but each thread should generate uncorrelated values. In this case usage should be ``r = rand_init(seed, tid)``
    """
    ...


@over
def randi(state: uint32) -> int:
    """
    Return a random integer in the range [0, 2^32).
    """
    ...


@over
def randi(state: uint32, min: int32, max: int32) -> int:
    """
    Return a random integer between [min, max).
    """
    ...


@over
def randf(state: uint32) -> float:
    """
    Return a random float between [0.0, 1.0).
    """
    ...


@over
def randf(state: uint32, min: float32, max: float32) -> float:
    """
    Return a random float between [min, max).
    """
    ...


@over
def randn(state: uint32) -> float:
    """
    Sample a normal distribution.
    """
    ...


@over
def sample_cdf(state: uint32, cdf: Array[float32]) -> int:
    """
    Inverse-transform sample a cumulative distribution function.
    """
    ...


@over
def sample_triangle(state: uint32) -> vec2f:
    """
    Uniformly sample a triangle. Returns sample barycentric coordinates.
    """
    ...


@over
def sample_unit_ring(state: uint32) -> vec2f:
    """
    Uniformly sample a ring in the xy plane.
    """
    ...


@over
def sample_unit_disk(state: uint32) -> vec2f:
    """
    Uniformly sample a disk in the xy plane.
    """
    ...


@over
def sample_unit_sphere_surface(state: uint32) -> vec3f:
    """
    Uniformly sample a unit sphere surface.
    """
    ...


@over
def sample_unit_sphere(state: uint32) -> vec3f:
    """
    Uniformly sample a unit sphere.
    """
    ...


@over
def sample_unit_hemisphere_surface(state: uint32) -> vec3f:
    """
    Uniformly sample a unit hemisphere surface.
    """
    ...


@over
def sample_unit_hemisphere(state: uint32) -> vec3f:
    """
    Uniformly sample a unit hemisphere.
    """
    ...


@over
def sample_unit_square(state: uint32) -> vec2f:
    """
    Uniformly sample a unit square.
    """
    ...


@over
def sample_unit_cube(state: uint32) -> vec3f:
    """
    Uniformly sample a unit cube.
    """
    ...


@over
def poisson(state: uint32, lam: float32) -> uint32:
    """
    Generate a random sample from a Poisson distribution.

       :param state: RNG state
       :param lam: The expected value of the distribution
    """
    ...


@over
def noise(state: uint32, x: float32) -> float:
    """
    Non-periodic Perlin-style noise in 1D.
    """
    ...


@over
def noise(state: uint32, xy: vec2f) -> float:
    """
    Non-periodic Perlin-style noise in 2D.
    """
    ...


@over
def noise(state: uint32, xyz: vec3f) -> float:
    """
    Non-periodic Perlin-style noise in 3D.
    """
    ...


@over
def noise(state: uint32, xyzt: vec4f) -> float:
    """
    Non-periodic Perlin-style noise in 4D.
    """
    ...


@over
def pnoise(state: uint32, x: float32, px: int32) -> float:
    """
    Periodic Perlin-style noise in 1D.
    """
    ...


@over
def pnoise(state: uint32, xy: vec2f, px: int32, py: int32) -> float:
    """
    Periodic Perlin-style noise in 2D.
    """
    ...


@over
def pnoise(state: uint32, xyz: vec3f, px: int32, py: int32, pz: int32) -> float:
    """
    Periodic Perlin-style noise in 3D.
    """
    ...


@over
def pnoise(state: uint32, xyzt: vec4f, px: int32, py: int32, pz: int32, pt: int32) -> float:
    """
    Periodic Perlin-style noise in 4D.
    """
    ...


@over
def curlnoise(state: uint32, xy: vec2f, octaves: uint32, lacunarity: float32, gain: float32) -> vec2f:
    """
    Divergence-free vector field based on the gradient of a Perlin noise function.
    """
    ...


@over
def curlnoise(state: uint32, xyz: vec3f, octaves: uint32, lacunarity: float32, gain: float32) -> vec3f:
    """
    Divergence-free vector field based on the curl of three Perlin noise functions.
    """
    ...


@over
def curlnoise(state: uint32, xyzt: vec4f, octaves: uint32, lacunarity: float32, gain: float32) -> vec3f:
    """
    Divergence-free vector field based on the curl of three Perlin noise functions.
    """
    ...


@over
def printf():
    """
    Allows printing formatted strings using C-style format specifiers.
    """
    ...


@over
def tid() -> Tuple[int, int]:
    """
    Return the current thread indices for a 2D kernel launch. Use ``i,j = wp.tid()`` syntax to retrieve the
       coordinates inside the kernel thread grid. This function may not be called from user-defined Warp functions.
    """
    ...


@over
def tid() -> Tuple[int, int, int]:
    """
    Return the current thread indices for a 3D kernel launch. Use ``i,j,k = wp.tid()`` syntax to retrieve the
       coordinates inside the kernel thread grid. This function may not be called from user-defined Warp functions.
    """
    ...


@over
def tid() -> Tuple[int, int, int, int]:
    """
    Return the current thread indices for a 4D kernel launch. Use ``i,j,k,l = wp.tid()`` syntax to retrieve the
       coordinates inside the kernel thread grid. This function may not be called from user-defined Warp functions.
    """
    ...


@over
def select(cond: bool, arg1: Any, arg2: Any):
    """
    Select between two arguments, if ``cond`` is ``False`` then return ``arg1``, otherwise return ``arg2``
    """
    ...


@over
def select(cond: bool, arg1: Any, arg2: Any):
    """
    Select between two arguments, if ``cond`` is ``False`` then return ``arg1``, otherwise return ``arg2``
    """
    ...


@over
def select(cond: bool, arg1: Any, arg2: Any):
    """
    Select between two arguments, if cond is false then return ``arg1``, otherwise return ``arg2``
    """
    ...


@over
def select(cond: int8, arg1: Any, arg2: Any):
    """
    Select between two arguments, if ``cond`` is ``False`` then return ``arg1``, otherwise return ``arg2``
    """
    ...


@over
def select(cond: uint8, arg1: Any, arg2: Any):
    """
    Select between two arguments, if ``cond`` is ``False`` then return ``arg1``, otherwise return ``arg2``
    """
    ...


@over
def select(cond: int16, arg1: Any, arg2: Any):
    """
    Select between two arguments, if ``cond`` is ``False`` then return ``arg1``, otherwise return ``arg2``
    """
    ...


@over
def select(cond: uint16, arg1: Any, arg2: Any):
    """
    Select between two arguments, if ``cond`` is ``False`` then return ``arg1``, otherwise return ``arg2``
    """
    ...


@over
def select(cond: int32, arg1: Any, arg2: Any):
    """
    Select between two arguments, if ``cond`` is ``False`` then return ``arg1``, otherwise return ``arg2``
    """
    ...


@over
def select(cond: uint32, arg1: Any, arg2: Any):
    """
    Select between two arguments, if ``cond`` is ``False`` then return ``arg1``, otherwise return ``arg2``
    """
    ...


@over
def select(cond: int64, arg1: Any, arg2: Any):
    """
    Select between two arguments, if ``cond`` is ``False`` then return ``arg1``, otherwise return ``arg2``
    """
    ...


@over
def select(cond: uint64, arg1: Any, arg2: Any):
    """
    Select between two arguments, if ``cond`` is ``False`` then return ``arg1``, otherwise return ``arg2``
    """
    ...


@over
def select(arr: Array[Any], arg1: Any, arg2: Any):
    """
    Select between two arguments, if ``arr`` is null then return ``arg1``, otherwise return ``arg2``
    """
    ...


@over
def atomic_add(a: Array[Any], i: int32, value: Any):
    """
    Atomically add ``value`` onto ``a[i]``.
    """
    ...


@over
def atomic_add(a: Array[Any], i: int32, j: int32, value: Any):
    """
    Atomically add ``value`` onto ``a[i,j]``.
    """
    ...


@over
def atomic_add(a: Array[Any], i: int32, j: int32, k: int32, value: Any):
    """
    Atomically add ``value`` onto ``a[i,j,k]``.
    """
    ...


@over
def atomic_add(a: Array[Any], i: int32, j: int32, k: int32, l: int32, value: Any):
    """
    Atomically add ``value`` onto ``a[i,j,k,l]``.
    """
    ...


@over
def atomic_add(a: FabricArray[Any], i: int32, value: Any):
    """
    Atomically add ``value`` onto ``a[i]``.
    """
    ...


@over
def atomic_add(a: FabricArray[Any], i: int32, j: int32, value: Any):
    """
    Atomically add ``value`` onto ``a[i,j]``.
    """
    ...


@over
def atomic_add(a: FabricArray[Any], i: int32, j: int32, k: int32, value: Any):
    """
    Atomically add ``value`` onto ``a[i,j,k]``.
    """
    ...


@over
def atomic_add(a: FabricArray[Any], i: int32, j: int32, k: int32, l: int32, value: Any):
    """
    Atomically add ``value`` onto ``a[i,j,k,l]``.
    """
    ...


@over
def atomic_add(a: IndexedFabricArray[Any], i: int32, value: Any):
    """
    Atomically add ``value`` onto ``a[i]``.
    """
    ...


@over
def atomic_add(a: IndexedFabricArray[Any], i: int32, j: int32, value: Any):
    """
    Atomically add ``value`` onto ``a[i,j]``.
    """
    ...


@over
def atomic_add(a: IndexedFabricArray[Any], i: int32, j: int32, k: int32, value: Any):
    """
    Atomically add ``value`` onto ``a[i,j,k]``.
    """
    ...


@over
def atomic_add(a: IndexedFabricArray[Any], i: int32, j: int32, k: int32, l: int32, value: Any):
    """
    Atomically add ``value`` onto ``a[i,j,k,l]``.
    """
    ...


@over
def atomic_add(a: FabricArray[Any], i: int32, value: Any):
    """
    Atomically add ``value`` onto the array at location given by index.
    """
    ...


@over
def atomic_add(a: FabricArray[Any], i: int32, j: int32, value: Any):
    """
    Atomically add ``value`` onto the array at location given by indices.
    """
    ...


@over
def atomic_add(a: FabricArray[Any], i: int32, j: int32, k: int32, value: Any):
    """
    Atomically add ``value`` onto the array at location given by indices.
    """
    ...


@over
def atomic_add(a: FabricArray[Any], i: int32, j: int32, k: int32, l: int32, value: Any):
    """
    Atomically add ``value`` onto the array at location given by indices.
    """
    ...


@over
def atomic_add(a: IndexedFabricArray[Any], i: int32, value: Any):
    """
    Atomically add ``value`` onto the array at location given by index.
    """
    ...


@over
def atomic_add(a: IndexedFabricArray[Any], i: int32, j: int32, value: Any):
    """
    Atomically add ``value`` onto the array at location given by indices.
    """
    ...


@over
def atomic_add(a: IndexedFabricArray[Any], i: int32, j: int32, k: int32, value: Any):
    """
    Atomically add ``value`` onto the array at location given by indices.
    """
    ...


@over
def atomic_add(a: IndexedFabricArray[Any], i: int32, j: int32, k: int32, l: int32, value: Any):
    """
    Atomically add ``value`` onto the array at location given by indices.
    """
    ...


@over
def atomic_sub(a: Array[Any], i: int32, value: Any):
    """
    Atomically subtract ``value`` onto ``a[i]``.
    """
    ...


@over
def atomic_sub(a: Array[Any], i: int32, j: int32, value: Any):
    """
    Atomically subtract ``value`` onto ``a[i,j]``.
    """
    ...


@over
def atomic_sub(a: Array[Any], i: int32, j: int32, k: int32, value: Any):
    """
    Atomically subtract ``value`` onto ``a[i,j,k]``.
    """
    ...


@over
def atomic_sub(a: Array[Any], i: int32, j: int32, k: int32, l: int32, value: Any):
    """
    Atomically subtract ``value`` onto ``a[i,j,k,l]``.
    """
    ...


@over
def atomic_sub(a: FabricArray[Any], i: int32, value: Any):
    """
    Atomically subtract ``value`` onto ``a[i]``.
    """
    ...


@over
def atomic_sub(a: FabricArray[Any], i: int32, j: int32, value: Any):
    """
    Atomically subtract ``value`` onto ``a[i,j]``.
    """
    ...


@over
def atomic_sub(a: FabricArray[Any], i: int32, j: int32, k: int32, value: Any):
    """
    Atomically subtract ``value`` onto ``a[i,j,k]``.
    """
    ...


@over
def atomic_sub(a: FabricArray[Any], i: int32, j: int32, k: int32, l: int32, value: Any):
    """
    Atomically subtract ``value`` onto ``a[i,j,k,l]``.
    """
    ...


@over
def atomic_sub(a: IndexedFabricArray[Any], i: int32, value: Any):
    """
    Atomically subtract ``value`` onto ``a[i]``.
    """
    ...


@over
def atomic_sub(a: IndexedFabricArray[Any], i: int32, j: int32, value: Any):
    """
    Atomically subtract ``value`` onto ``a[i,j]``.
    """
    ...


@over
def atomic_sub(a: IndexedFabricArray[Any], i: int32, j: int32, k: int32, value: Any):
    """
    Atomically subtract ``value`` onto ``a[i,j,k]``.
    """
    ...


@over
def atomic_sub(a: IndexedFabricArray[Any], i: int32, j: int32, k: int32, l: int32, value: Any):
    """
    Atomically subtract ``value`` onto ``a[i,j,k,l]``.
    """
    ...


@over
def atomic_sub(a: FabricArray[Any], i: int32, value: Any):
    """
    Atomically subtract ``value`` onto the array at location given by index.
    """
    ...


@over
def atomic_sub(a: FabricArray[Any], i: int32, j: int32, value: Any):
    """
    Atomically subtract ``value`` onto the array at location given by indices.
    """
    ...


@over
def atomic_sub(a: FabricArray[Any], i: int32, j: int32, k: int32, value: Any):
    """
    Atomically subtract ``value`` onto the array at location given by indices.
    """
    ...


@over
def atomic_sub(a: FabricArray[Any], i: int32, j: int32, k: int32, l: int32, value: Any):
    """
    Atomically subtract ``value`` onto the array at location given by indices.
    """
    ...


@over
def atomic_sub(a: IndexedFabricArray[Any], i: int32, value: Any):
    """
    Atomically subtract ``value`` onto the array at location given by index.
    """
    ...


@over
def atomic_sub(a: IndexedFabricArray[Any], i: int32, j: int32, value: Any):
    """
    Atomically subtract ``value`` onto the array at location given by indices.
    """
    ...


@over
def atomic_sub(a: IndexedFabricArray[Any], i: int32, j: int32, k: int32, value: Any):
    """
    Atomically subtract ``value`` onto the array at location given by indices.
    """
    ...


@over
def atomic_sub(a: IndexedFabricArray[Any], i: int32, j: int32, k: int32, l: int32, value: Any):
    """
    Atomically subtract ``value`` onto the array at location given by indices.
    """
    ...


@over
def atomic_min(a: Array[Any], i: int32, value: Any):
    """
    Compute the minimum of ``value`` and ``a[i]`` and atomically update the array.

    Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_min(a: Array[Any], i: int32, j: int32, value: Any):
    """
    Compute the minimum of ``value`` and ``a[i,j]`` and atomically update the array.

    Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_min(a: Array[Any], i: int32, j: int32, k: int32, value: Any):
    """
    Compute the minimum of ``value`` and ``a[i,j,k]`` and atomically update the array.

    Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_min(a: Array[Any], i: int32, j: int32, k: int32, l: int32, value: Any):
    """
    Compute the minimum of ``value`` and ``a[i,j,k,l]`` and atomically update the array.

    Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_min(a: FabricArray[Any], i: int32, value: Any):
    """
    Compute the minimum of ``value`` and ``a[i]`` and atomically update the array.

    Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_min(a: FabricArray[Any], i: int32, j: int32, value: Any):
    """
    Compute the minimum of ``value`` and ``a[i,j]`` and atomically update the array.

    Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_min(a: FabricArray[Any], i: int32, j: int32, k: int32, value: Any):
    """
    Compute the minimum of ``value`` and ``a[i,j,k]`` and atomically update the array.

    Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_min(a: FabricArray[Any], i: int32, j: int32, k: int32, l: int32, value: Any):
    """
    Compute the minimum of ``value`` and ``a[i,j,k,l]`` and atomically update the array.

    Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_min(a: IndexedFabricArray[Any], i: int32, value: Any):
    """
    Compute the minimum of ``value`` and ``a[i]`` and atomically update the array.

    Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_min(a: IndexedFabricArray[Any], i: int32, j: int32, value: Any):
    """
    Compute the minimum of ``value`` and ``a[i,j]`` and atomically update the array.

    Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_min(a: IndexedFabricArray[Any], i: int32, j: int32, k: int32, value: Any):
    """
    Compute the minimum of ``value`` and ``a[i,j,k]`` and atomically update the array.

    Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_min(a: IndexedFabricArray[Any], i: int32, j: int32, k: int32, l: int32, value: Any):
    """
    Compute the minimum of ``value`` and ``a[i,j,k,l]`` and atomically update the array.

    Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_min(a: FabricArray[Any], i: int32, value: Any):
    """
    Compute the minimum of ``value`` and ``array[index]`` and atomically update the array. Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_min(a: FabricArray[Any], i: int32, j: int32, value: Any):
    """
    Compute the minimum of ``value`` and ``array[index]`` and atomically update the array. Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_min(a: FabricArray[Any], i: int32, j: int32, k: int32, value: Any):
    """
    Compute the minimum of ``value`` and ``array[index]`` and atomically update the array. Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_min(a: FabricArray[Any], i: int32, j: int32, k: int32, l: int32, value: Any):
    """
    Compute the minimum of ``value`` and ``array[index]`` and atomically update the array. Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_min(a: IndexedFabricArray[Any], i: int32, value: Any):
    """
    Compute the minimum of ``value`` and ``array[index]`` and atomically update the array. Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_min(a: IndexedFabricArray[Any], i: int32, j: int32, value: Any):
    """
    Compute the minimum of ``value`` and ``array[index]`` and atomically update the array. Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_min(a: IndexedFabricArray[Any], i: int32, j: int32, k: int32, value: Any):
    """
    Compute the minimum of ``value`` and ``array[index]`` and atomically update the array. Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_min(a: IndexedFabricArray[Any], i: int32, j: int32, k: int32, l: int32, value: Any):
    """
    Compute the minimum of ``value`` and ``array[index]`` and atomically update the array. Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_max(a: Array[Any], i: int32, value: Any):
    """
    Compute the maximum of ``value`` and ``a[i]`` and atomically update the array.

    Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_max(a: Array[Any], i: int32, j: int32, value: Any):
    """
    Compute the maximum of ``value`` and ``a[i,j]`` and atomically update the array.

    Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_max(a: Array[Any], i: int32, j: int32, k: int32, value: Any):
    """
    Compute the maximum of ``value`` and ``a[i,j,k]`` and atomically update the array.

    Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_max(a: Array[Any], i: int32, j: int32, k: int32, l: int32, value: Any):
    """
    Compute the maximum of ``value`` and ``a[i,j,k,l]`` and atomically update the array.

    Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_max(a: FabricArray[Any], i: int32, value: Any):
    """
    Compute the maximum of ``value`` and ``a[i]`` and atomically update the array.

    Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_max(a: FabricArray[Any], i: int32, j: int32, value: Any):
    """
    Compute the maximum of ``value`` and ``a[i,j]`` and atomically update the array.

    Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_max(a: FabricArray[Any], i: int32, j: int32, k: int32, value: Any):
    """
    Compute the maximum of ``value`` and ``a[i,j,k]`` and atomically update the array.

    Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_max(a: FabricArray[Any], i: int32, j: int32, k: int32, l: int32, value: Any):
    """
    Compute the maximum of ``value`` and ``a[i,j,k,l]`` and atomically update the array.

    Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_max(a: IndexedFabricArray[Any], i: int32, value: Any):
    """
    Compute the maximum of ``value`` and ``a[i]`` and atomically update the array.

    Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_max(a: IndexedFabricArray[Any], i: int32, j: int32, value: Any):
    """
    Compute the maximum of ``value`` and ``a[i,j]`` and atomically update the array.

    Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_max(a: IndexedFabricArray[Any], i: int32, j: int32, k: int32, value: Any):
    """
    Compute the maximum of ``value`` and ``a[i,j,k]`` and atomically update the array.

    Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_max(a: IndexedFabricArray[Any], i: int32, j: int32, k: int32, l: int32, value: Any):
    """
    Compute the maximum of ``value`` and ``a[i,j,k,l]`` and atomically update the array.

    Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_max(a: FabricArray[Any], i: int32, value: Any):
    """
    Compute the maximum of ``value`` and ``array[index]`` and atomically update the array. Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_max(a: FabricArray[Any], i: int32, j: int32, value: Any):
    """
    Compute the maximum of ``value`` and ``array[index]`` and atomically update the array. Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_max(a: FabricArray[Any], i: int32, j: int32, k: int32, value: Any):
    """
    Compute the maximum of ``value`` and ``array[index]`` and atomically update the array. Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_max(a: FabricArray[Any], i: int32, j: int32, k: int32, l: int32, value: Any):
    """
    Compute the maximum of ``value`` and ``array[index]`` and atomically update the array. Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_max(a: IndexedFabricArray[Any], i: int32, value: Any):
    """
    Compute the maximum of ``value`` and ``array[index]`` and atomically update the array. Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_max(a: IndexedFabricArray[Any], i: int32, j: int32, value: Any):
    """
    Compute the maximum of ``value`` and ``array[index]`` and atomically update the array. Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_max(a: IndexedFabricArray[Any], i: int32, j: int32, k: int32, value: Any):
    """
    Compute the maximum of ``value`` and ``array[index]`` and atomically update the array. Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def atomic_max(a: IndexedFabricArray[Any], i: int32, j: int32, k: int32, l: int32, value: Any):
    """
    Compute the maximum of ``value`` and ``array[index]`` and atomically update the array. Note that for vectors and matrices the operation is only atomic on a per-component basis.
    """
    ...


@over
def lerp(a: Float, b: Float, t: Float) -> Float:
    """
    Linearly interpolate two values ``a`` and ``b`` using factor ``t``, computed as ``a*(1-t) + b*t``
    """
    ...


@over
def lerp(a: Vector[Any, Float], b: Vector[Any, Float], t: Float) -> Vector[Any, Float]:
    """
    Linearly interpolate two values ``a`` and ``b`` using factor ``t``, computed as ``a*(1-t) + b*t``
    """
    ...


@over
def lerp(a: Matrix[Any, Any, Float], b: Matrix[Any, Any, Float], t: Float) -> Matrix[Any, Any, Float]:
    """
    Linearly interpolate two values ``a`` and ``b`` using factor ``t``, computed as ``a*(1-t) + b*t``
    """
    ...


@over
def lerp(a: Quaternion[Float], b: Quaternion[Float], t: Float) -> Quaternion[Float]:
    """
    Linearly interpolate two values ``a`` and ``b`` using factor ``t``, computed as ``a*(1-t) + b*t``
    """
    ...


@over
def lerp(a: Transformation[Float], b: Transformation[Float], t: Float) -> Transformation[Float]:
    """
    Linearly interpolate two values ``a`` and ``b`` using factor ``t``, computed as ``a*(1-t) + b*t``
    """
    ...


@over
def smoothstep(edge0: Float, edge1: Float, x: Float) -> Float:
    """
    Smoothly interpolate between two values ``edge0`` and ``edge1`` using a factor ``x``,
       and return a result between 0 and 1 using a cubic Hermite interpolation after clamping.
    """
    ...


@over
def expect_near(arg1: Float, arg2: Float, tolerance: Float):
    """
    Prints an error to stdout if ``arg1`` and ``arg2`` are not closer than tolerance in magnitude
    """
    ...


@over
def expect_near(arg1: vec3f, arg2: vec3f, tolerance: float32):
    """
    Prints an error to stdout if any element of ``arg1`` and ``arg2`` are not closer than tolerance in magnitude
    """
    ...


@over
def lower_bound(arr: Array[Scalar], value: Scalar) -> int:
    """
    Search a sorted array ``arr`` for the closest element greater than or equal to ``value``.
    """
    ...


@over
def lower_bound(arr: Array[Scalar], arr_begin: int32, arr_end: int32, value: Scalar) -> int:
    """
    Search a sorted array ``arr`` in the range [arr_begin, arr_end) for the closest element greater than or equal to ``value``.
    """
    ...


@over
def lower_bound(arr: Array[Scalar], arr_begin: int32, arr_end: int32, value: Scalar) -> int:
    """
    Search a sorted array range [arr_begin, arr_end) for the closest element greater than or equal to value.
    """
    ...


@over
def add(x: Scalar, y: Scalar) -> Scalar:
    """ """
    ...


@over
def add(x: Vector[Any, Scalar], y: Vector[Any, Scalar]) -> Vector[Any, Scalar]:
    """ """
    ...


@over
def add(x: Quaternion[Scalar], y: Quaternion[Scalar]) -> Quaternion[Scalar]:
    """ """
    ...


@over
def add(x: Matrix[Any, Any, Scalar], y: Matrix[Any, Any, Scalar]) -> Matrix[Any, Any, Scalar]:
    """ """
    ...


@over
def add(x: Transformation[Scalar], y: Transformation[Scalar]) -> Transformation[Scalar]:
    """ """
    ...


@over
def sub(x: Scalar, y: Scalar) -> Scalar:
    """ """
    ...


@over
def sub(x: Vector[Any, Scalar], y: Vector[Any, Scalar]) -> Vector[Any, Scalar]:
    """ """
    ...


@over
def sub(x: Matrix[Any, Any, Scalar], y: Matrix[Any, Any, Scalar]) -> Matrix[Any, Any, Scalar]:
    """ """
    ...


@over
def sub(x: Quaternion[Scalar], y: Quaternion[Scalar]) -> Quaternion[Scalar]:
    """ """
    ...


@over
def sub(x: Transformation[Scalar], y: Transformation[Scalar]) -> Transformation[Scalar]:
    """ """
    ...


@over
def bit_and(x: Int, y: Int) -> Int:
    """ """
    ...


@over
def bit_or(x: Int, y: Int) -> Int:
    """ """
    ...


@over
def bit_xor(x: Int, y: Int) -> Int:
    """ """
    ...


@over
def lshift(x: Int, y: Int) -> Int:
    """ """
    ...


@over
def rshift(x: Int, y: Int) -> Int:
    """ """
    ...


@over
def invert(x: Int) -> Int:
    """ """
    ...


@over
def mul(x: Scalar, y: Scalar) -> Scalar:
    """ """
    ...


@over
def mul(x: Vector[Any, Scalar], y: Scalar) -> Vector[Any, Scalar]:
    """ """
    ...


@over
def mul(x: Scalar, y: Vector[Any, Scalar]) -> Vector[Any, Scalar]:
    """ """
    ...


@over
def mul(x: Quaternion[Scalar], y: Scalar) -> Quaternion[Scalar]:
    """ """
    ...


@over
def mul(x: Scalar, y: Quaternion[Scalar]) -> Quaternion[Scalar]:
    """ """
    ...


@over
def mul(x: Quaternion[Scalar], y: Quaternion[Scalar]) -> Quaternion[Scalar]:
    """ """
    ...


@over
def mul(x: Scalar, y: Matrix[Any, Any, Scalar]) -> Matrix[Any, Any, Scalar]:
    """ """
    ...


@over
def mul(x: Matrix[Any, Any, Scalar], y: Scalar) -> Matrix[Any, Any, Scalar]:
    """ """
    ...


@over
def mul(x: Matrix[Any, Any, Scalar], y: Vector[Any, Scalar]) -> Vector[Any, Scalar]:
    """ """
    ...


@over
def mul(x: Matrix[Any, Any, Scalar], y: Matrix[Any, Any, Scalar]):
    """ """
    ...


@over
def mul(x: Transformation[Scalar], y: Transformation[Scalar]) -> Transformation[Scalar]:
    """ """
    ...


@over
def mul(x: Scalar, y: Transformation[Scalar]) -> Transformation[Scalar]:
    """ """
    ...


@over
def mul(x: Transformation[Scalar], y: Scalar) -> Transformation[Scalar]:
    """ """
    ...


@over
def mod(x: Scalar, y: Scalar) -> Scalar:
    """ """
    ...


@over
def div(x: Scalar, y: Scalar) -> Scalar:
    """ """
    ...


@over
def div(x: Vector[Any, Scalar], y: Scalar) -> Vector[Any, Scalar]:
    """ """
    ...


@over
def div(x: Matrix[Any, Any, Scalar], y: Scalar) -> Matrix[Any, Any, Scalar]:
    """ """
    ...


@over
def div(x: Quaternion[Scalar], y: Scalar) -> Quaternion[Scalar]:
    """ """
    ...


@over
def floordiv(x: Scalar, y: Scalar) -> Scalar:
    """ """
    ...


@over
def pos(x: Scalar) -> Scalar:
    """ """
    ...


@over
def pos(x: Vector[Any, Scalar]) -> Vector[Any, Scalar]:
    """ """
    ...


@over
def pos(x: Quaternion[Scalar]) -> Quaternion[Scalar]:
    """ """
    ...


@over
def pos(x: Matrix[Any, Any, Scalar]) -> Matrix[Any, Any, Scalar]:
    """ """
    ...


@over
def neg(x: Scalar) -> Scalar:
    """ """
    ...


@over
def neg(x: Vector[Any, Scalar]) -> Vector[Any, Scalar]:
    """ """
    ...


@over
def neg(x: Quaternion[Scalar]) -> Quaternion[Scalar]:
    """ """
    ...


@over
def neg(x: Matrix[Any, Any, Scalar]) -> Matrix[Any, Any, Scalar]:
    """ """
    ...


@over
def unot(b: bool) -> bool:
    """ """
    ...


@over
def unot(b: bool) -> bool:
    """ """
    ...


@over
def unot(b: int8) -> bool:
    """ """
    ...


@over
def unot(b: uint8) -> bool:
    """ """
    ...


@over
def unot(b: int16) -> bool:
    """ """
    ...


@over
def unot(b: uint16) -> bool:
    """ """
    ...


@over
def unot(b: int32) -> bool:
    """ """
    ...


@over
def unot(b: uint32) -> bool:
    """ """
    ...


@over
def unot(b: int64) -> bool:
    """ """
    ...


@over
def unot(b: uint64) -> bool:
    """ """
    ...


@over
def unot(a: Array[Any]) -> bool:
    """ """
    ...