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	"""
	Interpolation inside triangular grids.
	"""

	import numpy as np

	from matplotlib import _api
	from matplotlib.tri import Triangulation
	from matplotlib.tri._trifinder import TriFinder
	from matplotlib.tri._tritools import TriAnalyzer

	__all__ = ('TriInterpolator', 'LinearTriInterpolator', 'CubicTriInterpolator')


	class TriInterpolator:
	"""
	Abstract base class for classes used to interpolate on a triangular grid.

	Derived classes implement the following methods:

	- ``__call__(x, y)``,
	where x, y are array-like point coordinates of the same shape, and
	that returns a masked array of the same shape containing the
	interpolated z-values.

	- ``gradient(x, y)``,
	where x, y are array-like point coordinates of the same
	shape, and that returns a list of 2 masked arrays of the same shape
	containing the 2 derivatives of the interpolator (derivatives of
	interpolated z values with respect to x and y).
	"""

	def __init__(self, triangulation, z, trifinder=None):
	_api.check_isinstance(Triangulation, triangulation=triangulation)
	self._triangulation = triangulation

	self._z = np.asarray(z)
	if self._z.shape != self._triangulation.x.shape:
	raise ValueError("z array must have same length as triangulation x"
	" and y arrays")

	_api.check_isinstance((TriFinder, None), trifinder=trifinder)
	self._trifinder = trifinder or self._triangulation.get_trifinder()

	# Default scaling factors : 1.0 (= no scaling)
	# Scaling may be used for interpolations for which the order of
	# magnitude of x, y has an impact on the interpolant definition.
	# Please refer to :meth:`_interpolate_multikeys` for details.
	self._unit_x = 1.0
	self._unit_y = 1.0

	# Default triangle renumbering: None (= no renumbering)
	# Renumbering may be used to avoid unnecessary computations
	# if complex calculations are done inside the Interpolator.
	# Please refer to :meth:`_interpolate_multikeys` for details.
	self._tri_renum = None

	# __call__ and gradient docstrings are shared by all subclasses
	# (except, if needed, relevant additions).
	# However these methods are only implemented in subclasses to avoid
	# confusion in the documentation.
	_docstring__call__ = """
	Returns a masked array containing interpolated values at the specified
	(x, y) points.

	Parameters
	----------
	x, y : array-like
	x and y coordinates of the same shape and any number of
	dimensions.

	Returns
	-------
	np.ma.array
	Masked array of the same shape as x and y; values corresponding
	to (x, y) points outside of the triangulation are masked out.

	"""

	_docstringgradient = r"""
	Returns a list of 2 masked arrays containing interpolated derivatives
	at the specified (x, y) points.

	Parameters
	----------
	x, y : array-like
	x and y coordinates of the same shape and any number of
	dimensions.

	Returns
	-------
	dzdx, dzdy : np.ma.array
	2 masked arrays of the same shape as x and y; values
	corresponding to (x, y) points outside of the triangulation
	are masked out.
	The first returned array contains the values of
	:math:`\frac{\partial z}{\partial x}` and the second those of
	:math:`\frac{\partial z}{\partial y}`.

	"""

	def _interpolate_multikeys(self, x, y, tri_index=None,
	return_keys=('z',)):
	"""
	Versatile (private) method defined for all TriInterpolators.

	:meth:`_interpolate_multikeys` is a wrapper around method
	:meth:`_interpolate_single_key` (to be defined in the child
	subclasses).
	:meth:`_interpolate_single_key actually performs the interpolation,
	but only for 1-dimensional inputs and at valid locations (inside
	unmasked triangles of the triangulation).

	The purpose of :meth:`_interpolate_multikeys` is to implement the
	following common tasks needed in all subclasses implementations:

	- calculation of containing triangles
	- dealing with more than one interpolation request at the same
	location (e.g., if the 2 derivatives are requested, it is
	unnecessary to compute the containing triangles twice)
	- scaling according to self._unit_x, self._unit_y
	- dealing with points outside of the grid (with fill value np.nan)
	- dealing with multi-dimensional x, y arrays: flattening for
	:meth:`_interpolate_params` call and final reshaping.

	(Note that np.vectorize could do most of those things very well for
	you, but it does it by function evaluations over successive tuples of
	the input arrays. Therefore, this tends to be more time-consuming than
	using optimized numpy functions - e.g., np.dot - which can be used
	easily on the flattened inputs, in the child-subclass methods
	:meth:`_interpolate_single_key`.)

	It is guaranteed that the calls to :meth:`_interpolate_single_key`
	will be done with flattened (1-d) array-like input parameters x, y
	and with flattened, valid `tri_index` arrays (no -1 index allowed).

	Parameters
	----------
	x, y : array-like
	x and y coordinates where interpolated values are requested.
	tri_index : array-like of int, optional
	Array of the containing triangle indices, same shape as
	x and y. Defaults to None. If None, these indices
	will be computed by a TriFinder instance.
	(Note: For point outside the grid, tri_index[ipt] shall be -1).
	return_keys : tuple of keys from {'z', 'dzdx', 'dzdy'}
	Defines the interpolation arrays to return, and in which order.

	Returns
	-------
	list of arrays
	Each array-like contains the expected interpolated values in the
	order defined by return_keys parameter.
	"""
	# Flattening and rescaling inputs arrays x, y
	# (initial shape is stored for output)
	x = np.asarray(x, dtype=np.float64)
	y = np.asarray(y, dtype=np.float64)
	sh_ret = x.shape
	if x.shape != y.shape:
	raise ValueError("x and y shall have same shapes."
	" Given: {0} and {1}".format(x.shape, y.shape))
	x = np.ravel(x)
	y = np.ravel(y)
	x_scaled = x/self._unit_x
	y_scaled = y/self._unit_y
	size_ret = np.size(x_scaled)

	# Computes & ravels the element indexes, extract the valid ones.
	if tri_index is None:
	tri_index = self._trifinder(x, y)
	else:
	if tri_index.shape != sh_ret:
	raise ValueError(
	"tri_index array is provided and shall"
	" have same shape as x and y. Given: "
	"{0} and {1}".format(tri_index.shape, sh_ret))
	tri_index = np.ravel(tri_index)

	mask_in = (tri_index != -1)
	if self._tri_renum is None:
	valid_tri_index = tri_index[mask_in]
	else:
	valid_tri_index = self._tri_renum[tri_index[mask_in]]
	valid_x = x_scaled[mask_in]
	valid_y = y_scaled[mask_in]

	ret = []
	for return_key in return_keys:
	# Find the return index associated with the key.
	try:
	return_index = {'z': 0, 'dzdx': 1, 'dzdy': 2}[return_key]
	except KeyError as err:
	raise ValueError("return_keys items shall take values in"
	" {'z', 'dzdx', 'dzdy'}") from err

	# Sets the scale factor for f & df components
	scale = [1., 1./self._unit_x, 1./self._unit_y][return_index]

	# Computes the interpolation
	ret_loc = np.empty(size_ret, dtype=np.float64)
	ret_loc[~mask_in] = np.nan
	ret_loc[mask_in] = self._interpolate_single_key(
	return_key, valid_tri_index, valid_x, valid_y) * scale
	ret += [np.ma.masked_invalid(ret_loc.reshape(sh_ret), copy=False)]

	return ret

	def _interpolate_single_key(self, return_key, tri_index, x, y):
	"""
	Interpolate at points belonging to the triangulation
	(inside an unmasked triangles).

	Parameters
	----------
	return_key : {'z', 'dzdx', 'dzdy'}
	The requested values (z or its derivatives).
	tri_index : 1D int array
	Valid triangle index (cannot be -1).
	x, y : 1D arrays, same shape as `tri_index`
	Valid locations where interpolation is requested.

	Returns
	-------
	1-d array
	Returned array of the same size as tri_index
	"""
	raise NotImplementedError("TriInterpolator subclasses" +
	"should implement _interpolate_single_key!")


	class LinearTriInterpolator(TriInterpolator):
	"""
	Linear interpolator on a triangular grid.

	Each triangle is represented by a plane so that an interpolated value at
	point (x, y) lies on the plane of the triangle containing (x, y).
	Interpolated values are therefore continuous across the triangulation, but
	their first derivatives are discontinuous at edges between triangles.

	Parameters
	----------
	triangulation : `~matplotlib.tri.Triangulation`
	The triangulation to interpolate over.
	z : (npoints,) array-like
	Array of values, defined at grid points, to interpolate between.
	trifinder : `~matplotlib.tri.TriFinder`, optional
	If this is not specified, the Triangulation's default TriFinder will
	be used by calling `.Triangulation.get_trifinder`.

	Methods
	-------
	`__call__` (x, y) : Returns interpolated values at (x, y) points.
	`gradient` (x, y) : Returns interpolated derivatives at (x, y) points.

	"""
	def __init__(self, triangulation, z, trifinder=None):
	super().__init__(triangulation, z, trifinder)

	# Store plane coefficients for fast interpolation calculations.
	self._plane_coefficients = \
	self._triangulation.calculate_plane_coefficients(self._z)

	def __call__(self, x, y):
	return self._interpolate_multikeys(x, y, tri_index=None,
	return_keys=('z',))[0]
	__call__.__doc__ = TriInterpolator._docstring__call__

	def gradient(self, x, y):
	return self._interpolate_multikeys(x, y, tri_index=None,
	return_keys=('dzdx', 'dzdy'))
	gradient.__doc__ = TriInterpolator._docstringgradient

	def _interpolate_single_key(self, return_key, tri_index, x, y):
	_api.check_in_list(['z', 'dzdx', 'dzdy'], return_key=return_key)
	if return_key == 'z':
	return (self._plane_coefficients[tri_index, 0]*x +
	self._plane_coefficients[tri_index, 1]*y +
	self._plane_coefficients[tri_index, 2])
	elif return_key == 'dzdx':
	return self._plane_coefficients[tri_index, 0]
	else: # 'dzdy'
	return self._plane_coefficients[tri_index, 1]


	class CubicTriInterpolator(TriInterpolator):
	r"""
	Cubic interpolator on a triangular grid.

	In one-dimension - on a segment - a cubic interpolating function is
	defined by the values of the function and its derivative at both ends.
	This is almost the same in 2D inside a triangle, except that the values
	of the function and its 2 derivatives have to be defined at each triangle
	node.

	The CubicTriInterpolator takes the value of the function at each node -
	provided by the user - and internally computes the value of the
	derivatives, resulting in a smooth interpolation.
	(As a special feature, the user can also impose the value of the
	derivatives at each node, but this is not supposed to be the common
	usage.)

	Parameters
	----------
	triangulation : `~matplotlib.tri.Triangulation`
	The triangulation to interpolate over.
	z : (npoints,) array-like
	Array of values, defined at grid points, to interpolate between.
	kind : {'min_E', 'geom', 'user'}, optional
	Choice of the smoothing algorithm, in order to compute
	the interpolant derivatives (defaults to 'min_E'):

	- if 'min_E': (default) The derivatives at each node is computed
	to minimize a bending energy.
	- if 'geom': The derivatives at each node is computed as a
	weighted average of relevant triangle normals. To be used for
	speed optimization (large grids).
	- if 'user': The user provides the argument dz, no computation
	is hence needed.

	trifinder : `~matplotlib.tri.TriFinder`, optional
	If not specified, the Triangulation's default TriFinder will
	be used by calling `.Triangulation.get_trifinder`.
	dz : tuple of array-likes (dzdx, dzdy), optional
	Used only if kind ='user'. In this case dz must be provided as
	(dzdx, dzdy) where dzdx, dzdy are arrays of the same shape as z and
	are the interpolant first derivatives at the triangulation points.

	Methods
	-------
	`__call__` (x, y) : Returns interpolated values at (x, y) points.
	`gradient` (x, y) : Returns interpolated derivatives at (x, y) points.

	Notes
	-----
	This note is a bit technical and details how the cubic interpolation is
	computed.

	The interpolation is based on a Clough-Tocher subdivision scheme of
	the triangulation mesh (to make it clearer, each triangle of the
	grid will be divided in 3 child-triangles, and on each child triangle
	the interpolated function is a cubic polynomial of the 2 coordinates).
	This technique originates from FEM (Finite Element Method) analysis;
	the element used is a reduced Hsieh-Clough-Tocher (HCT)
	element. Its shape functions are described in [1]_.
	The assembled function is guaranteed to be C1-smooth, i.e. it is
	continuous and its first derivatives are also continuous (this
	is easy to show inside the triangles but is also true when crossing the
	edges).

	In the default case (kind ='min_E'), the interpolant minimizes a
	curvature energy on the functional space generated by the HCT element
	shape functions - with imposed values but arbitrary derivatives at each
	node. The minimized functional is the integral of the so-called total
	curvature (implementation based on an algorithm from [2]_ - PCG sparse
	solver):

	.. math::

	E(z) = \frac{1}{2} \int_{\Omega} \left(
	\left( \frac{\partial^2{z}}{\partial{x}^2} \right)^2 +
	\left( \frac{\partial^2{z}}{\partial{y}^2} \right)^2 +
	2\left( \frac{\partial^2{z}}{\partial{y}\partial{x}} \right)^2
	\right) dx\,dy

	If the case kind ='geom' is chosen by the user, a simple geometric
	approximation is used (weighted average of the triangle normal
	vectors), which could improve speed on very large grids.

	References
	----------
	.. [1] Michel Bernadou, Kamal Hassan, "Basis functions for general
	Hsieh-Clough-Tocher triangles, complete or reduced.",
	International Journal for Numerical Methods in Engineering,
	17(5):784 - 789. 2.01.
	.. [2] C.T. Kelley, "Iterative Methods for Optimization".

	"""
	def __init__(self, triangulation, z, kind='min_E', trifinder=None,
	dz=None):
	super().__init__(triangulation, z, trifinder)

	# Loads the underlying c++ _triangulation.
	# (During loading, reordering of triangulation._triangles may occur so
	# that all final triangles are now anti-clockwise)
	self._triangulation.get_cpp_triangulation()

	# To build the stiffness matrix and avoid zero-energy spurious modes
	# we will only store internally the valid (unmasked) triangles and
	# the necessary (used) points coordinates.
	# 2 renumbering tables need to be computed and stored:
	# - a triangle renum table in order to translate the result from a
	# TriFinder instance into the internal stored triangle number.
	# - a node renum table to overwrite the self._z values into the new
	# (used) node numbering.
	tri_analyzer = TriAnalyzer(self._triangulation)
	(compressed_triangles, compressed_x, compressed_y, tri_renum,
	node_renum) = tri_analyzer._get_compressed_triangulation()
	self._triangles = compressed_triangles
	self._tri_renum = tri_renum
	# Taking into account the node renumbering in self._z:
	valid_node = (node_renum != -1)
	self._z[node_renum[valid_node]] = self._z[valid_node]

	# Computing scale factors
	self._unit_x = np.ptp(compressed_x)
	self._unit_y = np.ptp(compressed_y)
	self._pts = np.column_stack([compressed_x / self._unit_x,
	compressed_y / self._unit_y])
	# Computing triangle points
	self._tris_pts = self._pts[self._triangles]
	# Computing eccentricities
	self._eccs = self._compute_tri_eccentricities(self._tris_pts)
	# Computing dof estimations for HCT triangle shape function
	_api.check_in_list(['user', 'geom', 'min_E'], kind=kind)
	self._dof = self._compute_dof(kind, dz=dz)
	# Loading HCT element
	self._ReferenceElement = _ReducedHCT_Element()

	def __call__(self, x, y):
	return self._interpolate_multikeys(x, y, tri_index=None,
	return_keys=('z',))[0]
	__call__.__doc__ = TriInterpolator._docstring__call__

	def gradient(self, x, y):
	return self._interpolate_multikeys(x, y, tri_index=None,
	return_keys=('dzdx', 'dzdy'))
	gradient.__doc__ = TriInterpolator._docstringgradient

	def _interpolate_single_key(self, return_key, tri_index, x, y):
	_api.check_in_list(['z', 'dzdx', 'dzdy'], return_key=return_key)
	tris_pts = self._tris_pts[tri_index]
	alpha = self._get_alpha_vec(x, y, tris_pts)
	ecc = self._eccs[tri_index]
	dof = np.expand_dims(self._dof[tri_index], axis=1)
	if return_key == 'z':
	return self._ReferenceElement.get_function_values(
	alpha, ecc, dof)
	else: # 'dzdx', 'dzdy'
	J = self._get_jacobian(tris_pts)
	dzdx = self._ReferenceElement.get_function_derivatives(
	alpha, J, ecc, dof)
	if return_key == 'dzdx':
	return dzdx[:, 0, 0]
	else:
	return dzdx[:, 1, 0]

	def _compute_dof(self, kind, dz=None):
	"""
	Compute and return nodal dofs according to kind.

	Parameters
	----------
	kind : {'min_E', 'geom', 'user'}
	Choice of the _DOF_estimator subclass to estimate the gradient.
	dz : tuple of array-likes (dzdx, dzdy), optional
	Used only if kind=user; in this case passed to the
	:class:`_DOF_estimator_user`.

	Returns
	-------
	array-like, shape (npts, 2)
	Estimation of the gradient at triangulation nodes (stored as
	degree of freedoms of reduced-HCT triangle elements).
	"""
	if kind == 'user':
	if dz is None:
	raise ValueError("For a CubicTriInterpolator with "
	"kind='user', a valid dz "
	"argument is expected.")
	TE = _DOF_estimator_user(self, dz=dz)
	elif kind == 'geom':
	TE = _DOF_estimator_geom(self)
	else: # 'min_E', checked in __init__
	TE = _DOF_estimator_min_E(self)
	return TE.compute_dof_from_df()

	@staticmethod
	def _get_alpha_vec(x, y, tris_pts):
	"""
	Fast (vectorized) function to compute barycentric coordinates alpha.

	Parameters
	----------
	x, y : array-like of dim 1 (shape (nx,))
	Coordinates of the points whose points barycentric coordinates are
	requested.
	tris_pts : array like of dim 3 (shape: (nx, 3, 2))
	Coordinates of the containing triangles apexes.

	Returns
	-------
	array of dim 2 (shape (nx, 3))
	Barycentric coordinates of the points inside the containing
	triangles.
	"""
	ndim = tris_pts.ndim-2

	a = tris_pts[:, 1, :] - tris_pts[:, 0, :]
	b = tris_pts[:, 2, :] - tris_pts[:, 0, :]
	abT = np.stack([a, b], axis=-1)
	ab = _transpose_vectorized(abT)
	OM = np.stack([x, y], axis=1) - tris_pts[:, 0, :]

	metric = ab @ abT
	# Here we try to deal with the colinear cases.
	# metric_inv is in this case set to the Moore-Penrose pseudo-inverse
	# meaning that we will still return a set of valid barycentric
	# coordinates.
	metric_inv = _pseudo_inv22sym_vectorized(metric)
	Covar = ab @ _transpose_vectorized(np.expand_dims(OM, ndim))
	ksi = metric_inv @ Covar
	alpha = _to_matrix_vectorized([
	[1-ksi[:, 0, 0]-ksi[:, 1, 0]], [ksi[:, 0, 0]], [ksi[:, 1, 0]]])
	return alpha

	@staticmethod
	def _get_jacobian(tris_pts):
	"""
	Fast (vectorized) function to compute triangle jacobian matrix.

	Parameters
	----------
	tris_pts : array like of dim 3 (shape: (nx, 3, 2))
	Coordinates of the containing triangles apexes.

	Returns
	-------
	array of dim 3 (shape (nx, 2, 2))
	Barycentric coordinates of the points inside the containing
	triangles.
	J[itri, :, :] is the jacobian matrix at apex 0 of the triangle
	itri, so that the following (matrix) relationship holds:
	[dz/dksi] = [J] x [dz/dx]
	with x: global coordinates
	ksi: element parametric coordinates in triangle first apex
	local basis.
	"""
	a = np.array(tris_pts[:, 1, :] - tris_pts[:, 0, :])
	b = np.array(tris_pts[:, 2, :] - tris_pts[:, 0, :])
	J = _to_matrix_vectorized([[a[:, 0], a[:, 1]],
	[b[:, 0], b[:, 1]]])
	return J

	@staticmethod
	def _compute_tri_eccentricities(tris_pts):
	"""
	Compute triangle eccentricities.

	Parameters
	----------
	tris_pts : array like of dim 3 (shape: (nx, 3, 2))
	Coordinates of the triangles apexes.

	Returns
	-------
	array like of dim 2 (shape: (nx, 3))
	The so-called eccentricity parameters [1] needed for HCT triangular
	element.
	"""
	a = np.expand_dims(tris_pts[:, 2, :] - tris_pts[:, 1, :], axis=2)
	b = np.expand_dims(tris_pts[:, 0, :] - tris_pts[:, 2, :], axis=2)
	c = np.expand_dims(tris_pts[:, 1, :] - tris_pts[:, 0, :], axis=2)
	# Do not use np.squeeze, this is dangerous if only one triangle
	# in the triangulation...
	dot_a = (_transpose_vectorized(a) @ a)[:, 0, 0]
	dot_b = (_transpose_vectorized(b) @ b)[:, 0, 0]
	dot_c = (_transpose_vectorized(c) @ c)[:, 0, 0]
	# Note that this line will raise a warning for dot_a, dot_b or dot_c
	# zeros, but we choose not to support triangles with duplicate points.
	return _to_matrix_vectorized([[(dot_c-dot_b) / dot_a],
	[(dot_a-dot_c) / dot_b],
	[(dot_b-dot_a) / dot_c]])


	# FEM element used for interpolation and for solving minimisation
	# problem (Reduced HCT element)
	class _ReducedHCT_Element:
	"""
	Implementation of reduced HCT triangular element with explicit shape
	functions.

	Computes z, dz, d2z and the element stiffness matrix for bending energy:
	E(f) = integral( (d2z/dx2 + d2z/dy2)**2 dA)

	* Reference for the shape functions: *
	[1] Basis functions for general Hsieh-Clough-Tocher _triangles, complete or
	reduced.
	Michel Bernadou, Kamal Hassan
	International Journal for Numerical Methods in Engineering.
	17(5):784 - 789. 2.01

	* Element description: *
	9 dofs: z and dz given at 3 apex
	C1 (conform)

	"""
	# 1) Loads matrices to generate shape functions as a function of
	# triangle eccentricities - based on [1] p.11 '''
	M = np.array([
	[ 0.00, 0.00, 0.00, 4.50, 4.50, 0.00, 0.00, 0.00, 0.00, 0.00],
	[-0.25, 0.00, 0.00, 0.50, 1.25, 0.00, 0.00, 0.00, 0.00, 0.00],
	[-0.25, 0.00, 0.00, 1.25, 0.50, 0.00, 0.00, 0.00, 0.00, 0.00],
	[ 0.50, 1.00, 0.00, -1.50, 0.00, 3.00, 3.00, 0.00, 0.00, 3.00],
	[ 0.00, 0.00, 0.00, -0.25, 0.25, 0.00, 1.00, 0.00, 0.00, 0.50],
	[ 0.25, 0.00, 0.00, -0.50, -0.25, 1.00, 0.00, 0.00, 0.00, 1.00],
	[ 0.50, 0.00, 1.00, 0.00, -1.50, 0.00, 0.00, 3.00, 3.00, 3.00],
	[ 0.25, 0.00, 0.00, -0.25, -0.50, 0.00, 0.00, 0.00, 1.00, 1.00],
	[ 0.00, 0.00, 0.00, 0.25, -0.25, 0.00, 0.00, 1.00, 0.00, 0.50]])
	M0 = np.array([
	[ 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00],
	[ 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00],
	[ 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00],
	[-1.00, 0.00, 0.00, 1.50, 1.50, 0.00, 0.00, 0.00, 0.00, -3.00],
	[-0.50, 0.00, 0.00, 0.75, 0.75, 0.00, 0.00, 0.00, 0.00, -1.50],
	[ 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00],
	[ 1.00, 0.00, 0.00, -1.50, -1.50, 0.00, 0.00, 0.00, 0.00, 3.00],
	[ 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00],
	[ 0.50, 0.00, 0.00, -0.75, -0.75, 0.00, 0.00, 0.00, 0.00, 1.50]])
	M1 = np.array([
	[-0.50, 0.00, 0.00, 1.50, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00],
	[ 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00],
	[-0.25, 0.00, 0.00, 0.75, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00],
	[ 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00],
	[ 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00],
	[ 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00],
	[ 0.50, 0.00, 0.00, -1.50, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00],
	[ 0.25, 0.00, 0.00, -0.75, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00],
	[ 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00]])
	M2 = np.array([
	[ 0.50, 0.00, 0.00, 0.00, -1.50, 0.00, 0.00, 0.00, 0.00, 0.00],
	[ 0.25, 0.00, 0.00, 0.00, -0.75, 0.00, 0.00, 0.00, 0.00, 0.00],
	[ 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00],
	[-0.50, 0.00, 0.00, 0.00, 1.50, 0.00, 0.00, 0.00, 0.00, 0.00],
	[ 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00],
	[-0.25, 0.00, 0.00, 0.00, 0.75, 0.00, 0.00, 0.00, 0.00, 0.00],
	[ 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00],
	[ 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00],
	[ 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00, 0.00]])

	# 2) Loads matrices to rotate components of gradient & Hessian
	# vectors in the reference basis of triangle first apex (a0)
	rotate_dV = np.array([[ 1., 0.], [ 0., 1.],
	[ 0., 1.], [-1., -1.],
	[-1., -1.], [ 1., 0.]])

	rotate_d2V = np.array([[1., 0., 0.], [0., 1., 0.], [ 0., 0., 1.],
	[0., 1., 0.], [1., 1., 1.], [ 0., -2., -1.],
	[1., 1., 1.], [1., 0., 0.], [-2., 0., -1.]])

	# 3) Loads Gauss points & weights on the 3 sub-_triangles for P2
	# exact integral - 3 points on each subtriangles.
	# NOTE: as the 2nd derivative is discontinuous , we really need those 9
	# points!
	n_gauss = 9
	gauss_pts = np.array([[13./18., 4./18., 1./18.],
	[ 4./18., 13./18., 1./18.],
	[ 7./18., 7./18., 4./18.],
	[ 1./18., 13./18., 4./18.],
	[ 1./18., 4./18., 13./18.],
	[ 4./18., 7./18., 7./18.],
	[ 4./18., 1./18., 13./18.],
	[13./18., 1./18., 4./18.],
	[ 7./18., 4./18., 7./18.]], dtype=np.float64)
	gauss_w = np.ones([9], dtype=np.float64) / 9.

	# 4) Stiffness matrix for curvature energy
	E = np.array([[1., 0., 0.], [0., 1., 0.], [0., 0., 2.]])

	# 5) Loads the matrix to compute DOF_rot from tri_J at apex 0
	J0_to_J1 = np.array([[-1., 1.], [-1., 0.]])
	J0_to_J2 = np.array([[ 0., -1.], [ 1., -1.]])

	def get_function_values(self, alpha, ecc, dofs):
	"""
	Parameters
	----------
	alpha : is a (N x 3 x 1) array (array of column-matrices) of
	barycentric coordinates,
	ecc : is a (N x 3 x 1) array (array of column-matrices) of triangle
	eccentricities,
	dofs : is a (N x 1 x 9) arrays (arrays of row-matrices) of computed
	degrees of freedom.

	Returns
	-------
	Returns the N-array of interpolated function values.
	"""
	subtri = np.argmin(alpha, axis=1)[:, 0]
	ksi = _roll_vectorized(alpha, -subtri, axis=0)
	E = _roll_vectorized(ecc, -subtri, axis=0)
	x = ksi[:, 0, 0]
	y = ksi[:, 1, 0]
	z = ksi[:, 2, 0]
	x_sq = x*x
	y_sq = y*y
	z_sq = z*z
	V = _to_matrix_vectorized([
	[x_sqx], [y_sqy], [z_sqz], [x_sqz], [x_sqy], [y_sqx],
	[y_sqz], [z_sqy], [z_sqx], [xy*z]])
	prod = self.M @ V
	prod += _scalar_vectorized(E[:, 0, 0], self.M0 @ V)
	prod += _scalar_vectorized(E[:, 1, 0], self.M1 @ V)
	prod += _scalar_vectorized(E[:, 2, 0], self.M2 @ V)
	s = _roll_vectorized(prod, 3*subtri, axis=0)
	return (dofs @ s)[:, 0, 0]

	def get_function_derivatives(self, alpha, J, ecc, dofs):
	"""
	Parameters
	----------
	alpha is a (N x 3 x 1) array (array of column-matrices of
	barycentric coordinates)
	J is a (N x 2 x 2) array of jacobian matrices (jacobian matrix at
	triangle first apex)
	ecc is a (N x 3 x 1) array (array of column-matrices of triangle
	eccentricities)
	dofs is a (N x 1 x 9) arrays (arrays of row-matrices) of computed
	degrees of freedom.

	Returns
	-------
	Returns the values of interpolated function derivatives [dz/dx, dz/dy]
	in global coordinates at locations alpha, as a column-matrices of
	shape (N x 2 x 1).
	"""
	subtri = np.argmin(alpha, axis=1)[:, 0]
	ksi = _roll_vectorized(alpha, -subtri, axis=0)
	E = _roll_vectorized(ecc, -subtri, axis=0)
	x = ksi[:, 0, 0]
	y = ksi[:, 1, 0]
	z = ksi[:, 2, 0]
	x_sq = x*x
	y_sq = y*y
	z_sq = z*z
	dV = _to_matrix_vectorized([
	[ -3.x_sq, -3.x_sq],
	[ 3.*y_sq, 0.],
	[ 0., 3.*z_sq],
	[ -2.xz, -2.xz+x_sq],
	[-2.xy+x_sq, -2.xy],
	[ 2.xy-y_sq, -y_sq],
	[ 2.yz, y_sq],
	[ z_sq, 2.yz],
	[ -z_sq, 2.xz-z_sq],
	[ xz-yz, xy-yz]])
	# Puts back dV in first apex basis
	dV = dV @ _extract_submatrices(
	self.rotate_dV, subtri, block_size=2, axis=0)

	prod = self.M @ dV
	prod += _scalar_vectorized(E[:, 0, 0], self.M0 @ dV)
	prod += _scalar_vectorized(E[:, 1, 0], self.M1 @ dV)
	prod += _scalar_vectorized(E[:, 2, 0], self.M2 @ dV)
	dsdksi = _roll_vectorized(prod, 3*subtri, axis=0)
	dfdksi = dofs @ dsdksi
	# In global coordinates:
	# Here we try to deal with the simplest colinear cases, returning a
	# null matrix.
	J_inv = _safe_inv22_vectorized(J)
	dfdx = J_inv @ _transpose_vectorized(dfdksi)
	return dfdx

	def get_function_hessians(self, alpha, J, ecc, dofs):
	"""
	Parameters
	----------
	alpha is a (N x 3 x 1) array (array of column-matrices) of
	barycentric coordinates
	J is a (N x 2 x 2) array of jacobian matrices (jacobian matrix at
	triangle first apex)
	ecc is a (N x 3 x 1) array (array of column-matrices) of triangle
	eccentricities
	dofs is a (N x 1 x 9) arrays (arrays of row-matrices) of computed
	degrees of freedom.

	Returns
	-------
	Returns the values of interpolated function 2nd-derivatives
	[d2z/dx2, d2z/dy2, d2z/dxdy] in global coordinates at locations alpha,
	as a column-matrices of shape (N x 3 x 1).
	"""
	d2sdksi2 = self.get_d2Sidksij2(alpha, ecc)
	d2fdksi2 = dofs @ d2sdksi2
	H_rot = self.get_Hrot_from_J(J)
	d2fdx2 = d2fdksi2 @ H_rot
	return _transpose_vectorized(d2fdx2)

	def get_d2Sidksij2(self, alpha, ecc):
	"""
	Parameters
	----------
	alpha is a (N x 3 x 1) array (array of column-matrices) of
	barycentric coordinates
	ecc is a (N x 3 x 1) array (array of column-matrices) of triangle
	eccentricities

	Returns
	-------
	Returns the arrays d2sdksi2 (N x 3 x 1) Hessian of shape functions
	expressed in covariant coordinates in first apex basis.
	"""
	subtri = np.argmin(alpha, axis=1)[:, 0]
	ksi = _roll_vectorized(alpha, -subtri, axis=0)
	E = _roll_vectorized(ecc, -subtri, axis=0)
	x = ksi[:, 0, 0]
	y = ksi[:, 1, 0]
	z = ksi[:, 2, 0]
	d2V = _to_matrix_vectorized([
	[ 6.x, 6.x, 6.*x],
	[ 6.*y, 0., 0.],
	[ 0., 6.*z, 0.],
	[ 2.z, 2.z-4.x, 2.z-2.*x],
	[2.y-4.x, 2.y, 2.y-2.*x],
	[2.x-4.y, 0., -2.*y],
	[ 2.z, 0., 2.y],
	[ 0., 2.y, 2.z],
	[ 0., 2.x-4.z, -2.*z],
	[ -2.z, -2.y, x-y-z]])
	# Puts back d2V in first apex basis
	d2V = d2V @ _extract_submatrices(
	self.rotate_d2V, subtri, block_size=3, axis=0)
	prod = self.M @ d2V
	prod += _scalar_vectorized(E[:, 0, 0], self.M0 @ d2V)
	prod += _scalar_vectorized(E[:, 1, 0], self.M1 @ d2V)
	prod += _scalar_vectorized(E[:, 2, 0], self.M2 @ d2V)
	d2sdksi2 = _roll_vectorized(prod, 3*subtri, axis=0)
	return d2sdksi2

	def get_bending_matrices(self, J, ecc):
	"""
	Parameters
	----------
	J is a (N x 2 x 2) array of jacobian matrices (jacobian matrix at
	triangle first apex)
	ecc is a (N x 3 x 1) array (array of column-matrices) of triangle
	eccentricities

	Returns
	-------
	Returns the element K matrices for bending energy expressed in
	GLOBAL nodal coordinates.
	K_ij = integral [ (d2zi/dx2 + d2zi/dy2) * (d2zj/dx2 + d2zj/dy2) dA]
	tri_J is needed to rotate dofs from local basis to global basis
	"""
	n = np.size(ecc, 0)

	# 1) matrix to rotate dofs in global coordinates
	J1 = self.J0_to_J1 @ J
	J2 = self.J0_to_J2 @ J
	DOF_rot = np.zeros([n, 9, 9], dtype=np.float64)
	DOF_rot[:, 0, 0] = 1
	DOF_rot[:, 3, 3] = 1
	DOF_rot[:, 6, 6] = 1
	DOF_rot[:, 1:3, 1:3] = J
	DOF_rot[:, 4:6, 4:6] = J1
	DOF_rot[:, 7:9, 7:9] = J2

	# 2) matrix to rotate Hessian in global coordinates.
	H_rot, area = self.get_Hrot_from_J(J, return_area=True)

	# 3) Computes stiffness matrix
	# Gauss quadrature.
	K = np.zeros([n, 9, 9], dtype=np.float64)
	weights = self.gauss_w
	pts = self.gauss_pts
	for igauss in range(self.n_gauss):
	alpha = np.tile(pts[igauss, :], n).reshape(n, 3)
	alpha = np.expand_dims(alpha, 2)
	weight = weights[igauss]
	d2Skdksi2 = self.get_d2Sidksij2(alpha, ecc)
	d2Skdx2 = d2Skdksi2 @ H_rot
	K += weight * (d2Skdx2 @ self.E @ _transpose_vectorized(d2Skdx2))

	# 4) With nodal (not elem) dofs
	K = _transpose_vectorized(DOF_rot) @ K @ DOF_rot

	# 5) Need the area to compute total element energy
	return _scalar_vectorized(area, K)

	def get_Hrot_from_J(self, J, return_area=False):
	"""
	Parameters
	----------
	J is a (N x 2 x 2) array of jacobian matrices (jacobian matrix at
	triangle first apex)

	Returns
	-------
	Returns H_rot used to rotate Hessian from local basis of first apex,
	to global coordinates.
	if return_area is True, returns also the triangle area (0.5*det(J))
	"""
	# Here we try to deal with the simplest colinear cases; a null
	# energy and area is imposed.
	J_inv = _safe_inv22_vectorized(J)
	Ji00 = J_inv[:, 0, 0]
	Ji11 = J_inv[:, 1, 1]
	Ji10 = J_inv[:, 1, 0]
	Ji01 = J_inv[:, 0, 1]
	H_rot = _to_matrix_vectorized([
	[Ji00Ji00, Ji10Ji10, Ji00*Ji10],
	[Ji01Ji01, Ji11Ji11, Ji01*Ji11],
	[2Ji00Ji01, 2Ji11Ji10, Ji00Ji11+Ji10Ji01]])
	if not return_area:
	return H_rot
	else:
	area = 0.5 * (J[:, 0, 0]J[:, 1, 1] - J[:, 0, 1]J[:, 1, 0])
	return H_rot, area

	def get_Kff_and_Ff(self, J, ecc, triangles, Uc):
	"""
	Build K and F for the following elliptic formulation:
	minimization of curvature energy with value of function at node
	imposed and derivatives 'free'.

	Build the global Kff matrix in cco format.
	Build the full Ff vec Ff = - Kfc x Uc.

	Parameters
	----------
	J is a (N x 2 x 2) array of jacobian matrices (jacobian matrix at
	triangle first apex)
	ecc is a (N x 3 x 1) array (array of column-matrices) of triangle
	eccentricities
	triangles is a (N x 3) array of nodes indexes.
	Uc is (N x 3) array of imposed displacements at nodes

	Returns
	-------
	(Kff_rows, Kff_cols, Kff_vals) Kff matrix in coo format - Duplicate
	(row, col) entries must be summed.
	Ff: force vector - dim npts * 3
	"""
	ntri = np.size(ecc, 0)
	vec_range = np.arange(ntri, dtype=np.int32)
	c_indices = np.full(ntri, -1, dtype=np.int32) # for unused dofs, -1
	f_dof = [1, 2, 4, 5, 7, 8]
	c_dof = [0, 3, 6]

	# vals, rows and cols indices in global dof numbering
	f_dof_indices = _to_matrix_vectorized([[
	c_indices, triangles[:, 0]2, triangles[:, 0]2+1,
	c_indices, triangles[:, 1]2, triangles[:, 1]2+1,
	c_indices, triangles[:, 2]2, triangles[:, 2]2+1]])

	expand_indices = np.ones([ntri, 9, 1], dtype=np.int32)
	f_row_indices = _transpose_vectorized(expand_indices @ f_dof_indices)
	f_col_indices = expand_indices @ f_dof_indices
	K_elem = self.get_bending_matrices(J, ecc)

	# Extracting sub-matrices
	# Explanation & notations:
	# * Subscript f denotes 'free' degrees of freedom (i.e. dz/dx, dz/dx)
	# * Subscript c denotes 'condensated' (imposed) degrees of freedom
	# (i.e. z at all nodes)
	# * F = [Ff, Fc] is the force vector
	# * U = [Uf, Uc] is the imposed dof vector
	# [ Kff Kfc ]
	# * K = [ ] is the laplacian stiffness matrix
	# [ Kcf Kff ]
	# * As F = K x U one gets straightforwardly: Ff = - Kfc x Uc

	# Computing Kff stiffness matrix in sparse coo format
	Kff_vals = np.ravel(K_elem[np.ix_(vec_range, f_dof, f_dof)])
	Kff_rows = np.ravel(f_row_indices[np.ix_(vec_range, f_dof, f_dof)])
	Kff_cols = np.ravel(f_col_indices[np.ix_(vec_range, f_dof, f_dof)])

	# Computing Ff force vector in sparse coo format
	Kfc_elem = K_elem[np.ix_(vec_range, f_dof, c_dof)]
	Uc_elem = np.expand_dims(Uc, axis=2)
	Ff_elem = -(Kfc_elem @ Uc_elem)[:, :, 0]
	Ff_indices = f_dof_indices[np.ix_(vec_range, [0], f_dof)][:, 0, :]

	# Extracting Ff force vector in dense format
	# We have to sum duplicate indices - using bincount
	Ff = np.bincount(np.ravel(Ff_indices), weights=np.ravel(Ff_elem))
	return Kff_rows, Kff_cols, Kff_vals, Ff


	# :class:_DOF_estimator, _DOF_estimator_user, _DOF_estimator_geom,
	# _DOF_estimator_min_E
	# Private classes used to compute the degree of freedom of each triangular
	# element for the TriCubicInterpolator.
	class _DOF_estimator:
	"""
	Abstract base class for classes used to estimate a function's first
	derivatives, and deduce the dofs for a CubicTriInterpolator using a
	reduced HCT element formulation.

	Derived classes implement ``compute_df(self, **kwargs)``, returning
	``np.vstack([dfx, dfy]).T`` where ``dfx, dfy`` are the estimation of the 2
	gradient coordinates.
	"""
	def __init__(self, interpolator, **kwargs):
	_api.check_isinstance(CubicTriInterpolator, interpolator=interpolator)
	self._pts = interpolator._pts
	self._tris_pts = interpolator._tris_pts
	self.z = interpolator._z
	self._triangles = interpolator._triangles
	(self._unit_x, self._unit_y) = (interpolator._unit_x,
	interpolator._unit_y)
	self.dz = self.compute_dz(**kwargs)
	self.compute_dof_from_df()

	def compute_dz(self, **kwargs):
	raise NotImplementedError

	def compute_dof_from_df(self):
	"""
	Compute reduced-HCT elements degrees of freedom, from the gradient.
	"""
	J = CubicTriInterpolator._get_jacobian(self._tris_pts)
	tri_z = self.z[self._triangles]
	tri_dz = self.dz[self._triangles]
	tri_dof = self.get_dof_vec(tri_z, tri_dz, J)
	return tri_dof

	@staticmethod
	def get_dof_vec(tri_z, tri_dz, J):
	"""
	Compute the dof vector of a triangle, from the value of f, df and
	of the local Jacobian at each node.

	Parameters
	----------
	tri_z : shape (3,) array
	f nodal values.
	tri_dz : shape (3, 2) array
	df/dx, df/dy nodal values.
	J
	Jacobian matrix in local basis of apex 0.

	Returns
	-------
	dof : shape (9,) array
	For each apex ``iapex``::

	dof[iapex*3+0] = f(Ai)
	dof[iapex*3+1] = df(Ai).(AiAi+)
	dof[iapex*3+2] = df(Ai).(AiAi-)
	"""
	npt = tri_z.shape[0]
	dof = np.zeros([npt, 9], dtype=np.float64)
	J1 = _ReducedHCT_Element.J0_to_J1 @ J
	J2 = _ReducedHCT_Element.J0_to_J2 @ J

	col0 = J @ np.expand_dims(tri_dz[:, 0, :], axis=2)
	col1 = J1 @ np.expand_dims(tri_dz[:, 1, :], axis=2)
	col2 = J2 @ np.expand_dims(tri_dz[:, 2, :], axis=2)

	dfdksi = _to_matrix_vectorized([
	[col0[:, 0, 0], col1[:, 0, 0], col2[:, 0, 0]],
	[col0[:, 1, 0], col1[:, 1, 0], col2[:, 1, 0]]])
	dof[:, 0:7:3] = tri_z
	dof[:, 1:8:3] = dfdksi[:, 0]
	dof[:, 2:9:3] = dfdksi[:, 1]
	return dof


	class _DOF_estimator_user(_DOF_estimator):
	"""dz is imposed by user; accounts for scaling if any."""

	def compute_dz(self, dz):
	(dzdx, dzdy) = dz
	dzdx = dzdx * self._unit_x
	dzdy = dzdy * self._unit_y
	return np.vstack([dzdx, dzdy]).T


	class _DOF_estimator_geom(_DOF_estimator):
	"""Fast 'geometric' approximation, recommended for large arrays."""

	def compute_dz(self):
	"""
	self.df is computed as weighted average of _triangles sharing a common
	node. On each triangle itri f is first assumed linear (= ~f), which
	allows to compute d~f[itri]
	Then the following approximation of df nodal values is then proposed:
	f[ipt] = SUM ( w[itri] x d~f[itri] , for itri sharing apex ipt)
	The weighted coeff. w[itri] are proportional to the angle of the
	triangle itri at apex ipt
	"""
	el_geom_w = self.compute_geom_weights()
	el_geom_grad = self.compute_geom_grads()

	# Sum of weights coeffs
	w_node_sum = np.bincount(np.ravel(self._triangles),
	weights=np.ravel(el_geom_w))

	# Sum of weighted df = (dfx, dfy)
	dfx_el_w = np.empty_like(el_geom_w)
	dfy_el_w = np.empty_like(el_geom_w)
	for iapex in range(3):
	dfx_el_w[:, iapex] = el_geom_w[:, iapex]*el_geom_grad[:, 0]
	dfy_el_w[:, iapex] = el_geom_w[:, iapex]*el_geom_grad[:, 1]
	dfx_node_sum = np.bincount(np.ravel(self._triangles),
	weights=np.ravel(dfx_el_w))
	dfy_node_sum = np.bincount(np.ravel(self._triangles),
	weights=np.ravel(dfy_el_w))

	# Estimation of df
	dfx_estim = dfx_node_sum/w_node_sum
	dfy_estim = dfy_node_sum/w_node_sum
	return np.vstack([dfx_estim, dfy_estim]).T

	def compute_geom_weights(self):
	"""
	Build the (nelems, 3) weights coeffs of _triangles angles,
	renormalized so that np.sum(weights, axis=1) == np.ones(nelems)
	"""
	weights = np.zeros([np.size(self._triangles, 0), 3])
	tris_pts = self._tris_pts
	for ipt in range(3):
	p0 = tris_pts[:, ipt % 3, :]
	p1 = tris_pts[:, (ipt+1) % 3, :]
	p2 = tris_pts[:, (ipt-1) % 3, :]
	alpha1 = np.arctan2(p1[:, 1]-p0[:, 1], p1[:, 0]-p0[:, 0])
	alpha2 = np.arctan2(p2[:, 1]-p0[:, 1], p2[:, 0]-p0[:, 0])
	# In the below formula we could take modulo 2. but
	# modulo 1. is safer regarding round-off errors (flat triangles).
	angle = np.abs(((alpha2-alpha1) / np.pi) % 1)
	# Weight proportional to angle up np.pi/2; null weight for
	# degenerated cases 0 and np.pi (note that angle is normalized
	# by np.pi).
	weights[:, ipt] = 0.5 - np.abs(angle-0.5)
	return weights

	def compute_geom_grads(self):
	"""
	Compute the (global) gradient component of f assumed linear (~f).
	returns array df of shape (nelems, 2)
	df[ielem].dM[ielem] = dz[ielem] i.e. df = dz x dM = dM.T^-1 x dz
	"""
	tris_pts = self._tris_pts
	tris_f = self.z[self._triangles]

	dM1 = tris_pts[:, 1, :] - tris_pts[:, 0, :]
	dM2 = tris_pts[:, 2, :] - tris_pts[:, 0, :]
	dM = np.dstack([dM1, dM2])
	# Here we try to deal with the simplest colinear cases: a null
	# gradient is assumed in this case.
	dM_inv = _safe_inv22_vectorized(dM)

	dZ1 = tris_f[:, 1] - tris_f[:, 0]
	dZ2 = tris_f[:, 2] - tris_f[:, 0]
	dZ = np.vstack([dZ1, dZ2]).T
	df = np.empty_like(dZ)

	# With np.einsum: could be ej,eji -> ej
	df[:, 0] = dZ[:, 0]dM_inv[:, 0, 0] + dZ[:, 1]dM_inv[:, 1, 0]
	df[:, 1] = dZ[:, 0]dM_inv[:, 0, 1] + dZ[:, 1]dM_inv[:, 1, 1]
	return df


	class _DOF_estimator_min_E(_DOF_estimator_geom):
	"""
	The 'smoothest' approximation, df is computed through global minimization
	of the bending energy:
	E(f) = integral[(d2z/dx2 + d2z/dy2 + 2 d2z/dxdy)**2 dA]
	"""
	def __init__(self, Interpolator):
	self._eccs = Interpolator._eccs
	super().__init__(Interpolator)

	def compute_dz(self):
	"""
	Elliptic solver for bending energy minimization.
	Uses a dedicated 'toy' sparse Jacobi PCG solver.
	"""
	# Initial guess for iterative PCG solver.
	dz_init = super().compute_dz()
	Uf0 = np.ravel(dz_init)

	reference_element = _ReducedHCT_Element()
	J = CubicTriInterpolator._get_jacobian(self._tris_pts)
	eccs = self._eccs
	triangles = self._triangles
	Uc = self.z[self._triangles]

	# Building stiffness matrix and force vector in coo format
	Kff_rows, Kff_cols, Kff_vals, Ff = reference_element.get_Kff_and_Ff(
	J, eccs, triangles, Uc)

	# Building sparse matrix and solving minimization problem
	# We could use scipy.sparse direct solver; however to avoid this
	# external dependency an implementation of a simple PCG solver with
	# a simple diagonal Jacobi preconditioner is implemented.
	tol = 1.e-10
	n_dof = Ff.shape[0]
	Kff_coo = _Sparse_Matrix_coo(Kff_vals, Kff_rows, Kff_cols,
	shape=(n_dof, n_dof))
	Kff_coo.compress_csc()
	Uf, err = _cg(A=Kff_coo, b=Ff, x0=Uf0, tol=tol)
	# If the PCG did not converge, we return the best guess between Uf0
	# and Uf.
	err0 = np.linalg.norm(Kff_coo.dot(Uf0) - Ff)
	if err0 < err:
	# Maybe a good occasion to raise a warning here ?
	_api.warn_external("In TriCubicInterpolator initialization, "
	"PCG sparse solver did not converge after "
	"1000 iterations. `geom` approximation is "
	"used instead of `min_E`")
	Uf = Uf0

	# Building dz from Uf
	dz = np.empty([self._pts.shape[0], 2], dtype=np.float64)
	dz[:, 0] = Uf[::2]
	dz[:, 1] = Uf[1::2]
	return dz


	# The following private :class:_Sparse_Matrix_coo and :func:_cg provide
	# a PCG sparse solver for (symmetric) elliptic problems.
	class _Sparse_Matrix_coo:
	def __init__(self, vals, rows, cols, shape):
	"""
	Create a sparse matrix in coo format.
	vals: arrays of values of non-null entries of the matrix
	rows: int arrays of rows of non-null entries of the matrix
	cols: int arrays of cols of non-null entries of the matrix
	shape: 2-tuple (n, m) of matrix shape
	"""
	self.n, self.m = shape
	self.vals = np.asarray(vals, dtype=np.float64)
	self.rows = np.asarray(rows, dtype=np.int32)
	self.cols = np.asarray(cols, dtype=np.int32)

	def dot(self, V):
	"""
	Dot product of self by a vector V in sparse-dense to dense format
	V dense vector of shape (self.m,).
	"""
	assert V.shape == (self.m,)
	return np.bincount(self.rows,
	weights=self.vals*V[self.cols],
	minlength=self.m)

	def compress_csc(self):
	"""
	Compress rows, cols, vals / summing duplicates. Sort for csc format.
	"""
	_, unique, indices = np.unique(
	self.rows + self.n*self.cols,
	return_index=True, return_inverse=True)
	self.rows = self.rows[unique]
	self.cols = self.cols[unique]
	self.vals = np.bincount(indices, weights=self.vals)

	def compress_csr(self):
	"""
	Compress rows, cols, vals / summing duplicates. Sort for csr format.
	"""
	_, unique, indices = np.unique(
	self.m*self.rows + self.cols,
	return_index=True, return_inverse=True)
	self.rows = self.rows[unique]
	self.cols = self.cols[unique]
	self.vals = np.bincount(indices, weights=self.vals)

	def to_dense(self):
	"""
	Return a dense matrix representing self, mainly for debugging purposes.
	"""
	ret = np.zeros([self.n, self.m], dtype=np.float64)
	nvals = self.vals.size
	for i in range(nvals):
	ret[self.rows[i], self.cols[i]] += self.vals[i]
	return ret

	def __str__(self):
	return self.to_dense().__str__()

	@property
	def diag(self):
	"""Return the (dense) vector of the diagonal elements."""
	in_diag = (self.rows == self.cols)
	diag = np.zeros(min(self.n, self.n), dtype=np.float64) # default 0.
	diag[self.rows[in_diag]] = self.vals[in_diag]
	return diag


	def _cg(A, b, x0=None, tol=1.e-10, maxiter=1000):
	"""
	Use Preconditioned Conjugate Gradient iteration to solve A x = b
	A simple Jacobi (diagonal) preconditioner is used.

	Parameters
	----------
	A : _Sparse_Matrix_coo
	A must have been compressed before by compress_csc or
	compress_csr method.
	b : array
	Right hand side of the linear system.
	x0 : array, optional
	Starting guess for the solution. Defaults to the zero vector.
	tol : float, optional
	Tolerance to achieve. The algorithm terminates when the relative
	residual is below tol. Default is 1e-10.
	maxiter : int, optional
	Maximum number of iterations. Iteration will stop after maxiter
	steps even if the specified tolerance has not been achieved. Defaults
	to 1000.

	Returns
	-------
	x : array
	The converged solution.
	err : float
	The absolute error np.linalg.norm(A.dot(x) - b)
	"""
	n = b.size
	assert A.n == n
	assert A.m == n
	b_norm = np.linalg.norm(b)

	# Jacobi pre-conditioner
	kvec = A.diag
	# For diag elem < 1e-6 we keep 1e-6.
	kvec = np.maximum(kvec, 1e-6)

	# Initial guess
	if x0 is None:
	x = np.zeros(n)
	else:
	x = x0

	r = b - A.dot(x)
	w = r/kvec

	p = np.zeros(n)
	beta = 0.0
	rho = np.dot(r, w)
	k = 0

	# Following C. T. Kelley
	while (np.sqrt(abs(rho)) > tol*b_norm) and (k < maxiter):
	p = w + beta*p
	z = A.dot(p)
	alpha = rho/np.dot(p, z)
	r = r - alpha*z
	w = r/kvec
	rhoold = rho
	rho = np.dot(r, w)
	x = x + alpha*p
	beta = rho/rhoold
	# err = np.linalg.norm(A.dot(x) - b) # absolute accuracy - not used
	k += 1
	err = np.linalg.norm(A.dot(x) - b)
	return x, err


	# The following private functions:
	# :func:`_safe_inv22_vectorized`
	# :func:`_pseudo_inv22sym_vectorized`
	# :func:`_scalar_vectorized`
	# :func:`_transpose_vectorized`
	# :func:`_roll_vectorized`
	# :func:`_to_matrix_vectorized`
	# :func:`_extract_submatrices`
	# provide fast numpy implementation of some standard operations on arrays of
	# matrices - stored as (:, n_rows, n_cols)-shaped np.arrays.

	# Development note: Dealing with pathologic 'flat' triangles in the
	# CubicTriInterpolator code and impact on (2, 2)-matrix inversion functions
	# :func:`_safe_inv22_vectorized` and :func:`_pseudo_inv22sym_vectorized`.
	#
	# Goals:
	# 1) The CubicTriInterpolator should be able to handle flat or almost flat
	# triangles without raising an error,
	# 2) These degenerated triangles should have no impact on the automatic dof
	# calculation (associated with null weight for the _DOF_estimator_geom and
	# with null energy for the _DOF_estimator_min_E),
	# 3) Linear patch test should be passed exactly on degenerated meshes,
	# 4) Interpolation (with :meth:`_interpolate_single_key` or
	# :meth:`_interpolate_multi_key`) shall be correctly handled even inside
	# the pathologic triangles, to interact correctly with a TriRefiner class.
	#
	# Difficulties:
	# Flat triangles have rank-deficient J (so-called jacobian matrix) and
	# metric (the metric tensor = J x J.T). Computation of the local
	# tangent plane is also problematic.
	#
	# Implementation:
	# Most of the time, when computing the inverse of a rank-deficient matrix it
	# is safe to simply return the null matrix (which is the implementation in
	# :func:`_safe_inv22_vectorized`). This is because of point 2), itself
	# enforced by:
	# - null area hence null energy in :class:`_DOF_estimator_min_E`
	# - angles close or equal to 0 or np.pi hence null weight in
	# :class:`_DOF_estimator_geom`.
	# Note that the function angle -> weight is continuous and maximum for an
	# angle np.pi/2 (refer to :meth:`compute_geom_weights`)
	# The exception is the computation of barycentric coordinates, which is done
	# by inversion of the metric matrix. In this case, we need to compute a set
	# of valid coordinates (1 among numerous possibilities), to ensure point 4).
	# We benefit here from the symmetry of metric = J x J.T, which makes it easier
	# to compute a pseudo-inverse in :func:`_pseudo_inv22sym_vectorized`
	def _safe_inv22_vectorized(M):
	"""
	Inversion of arrays of (2, 2) matrices, returns 0 for rank-deficient
	matrices.

	M : array of (2, 2) matrices to inverse, shape (n, 2, 2)
	"""
	_api.check_shape((None, 2, 2), M=M)
	M_inv = np.empty_like(M)
	prod1 = M[:, 0, 0]*M[:, 1, 1]
	delta = prod1 - M[:, 0, 1]*M[:, 1, 0]

	# We set delta_inv to 0. in case of a rank deficient matrix; a
	# rank-deficient input matrix M will lead to a null matrix in output
	rank2 = (np.abs(delta) > 1e-8*np.abs(prod1))
	if np.all(rank2):
	# Normal 'optimized' flow.
	delta_inv = 1./delta
	else:
	# 'Pathologic' flow.
	delta_inv = np.zeros(M.shape[0])
	delta_inv[rank2] = 1./delta[rank2]

	M_inv[:, 0, 0] = M[:, 1, 1]*delta_inv
	M_inv[:, 0, 1] = -M[:, 0, 1]*delta_inv
	M_inv[:, 1, 0] = -M[:, 1, 0]*delta_inv
	M_inv[:, 1, 1] = M[:, 0, 0]*delta_inv
	return M_inv


	def _pseudo_inv22sym_vectorized(M):
	"""
	Inversion of arrays of (2, 2) SYMMETRIC matrices; returns the
	(Moore-Penrose) pseudo-inverse for rank-deficient matrices.

	In case M is of rank 1, we have M = trace(M) x P where P is the orthogonal
	projection on Im(M), and we return trace(M)^-1 x P == M / trace(M)**2
	In case M is of rank 0, we return the null matrix.

	M : array of (2, 2) matrices to inverse, shape (n, 2, 2)
	"""
	_api.check_shape((None, 2, 2), M=M)
	M_inv = np.empty_like(M)
	prod1 = M[:, 0, 0]*M[:, 1, 1]
	delta = prod1 - M[:, 0, 1]*M[:, 1, 0]
	rank2 = (np.abs(delta) > 1e-8*np.abs(prod1))

	if np.all(rank2):
	# Normal 'optimized' flow.
	M_inv[:, 0, 0] = M[:, 1, 1] / delta
	M_inv[:, 0, 1] = -M[:, 0, 1] / delta
	M_inv[:, 1, 0] = -M[:, 1, 0] / delta
	M_inv[:, 1, 1] = M[:, 0, 0] / delta
	else:
	# 'Pathologic' flow.
	# Here we have to deal with 2 sub-cases
	# 1) First sub-case: matrices of rank 2:
	delta = delta[rank2]
	M_inv[rank2, 0, 0] = M[rank2, 1, 1] / delta
	M_inv[rank2, 0, 1] = -M[rank2, 0, 1] / delta
	M_inv[rank2, 1, 0] = -M[rank2, 1, 0] / delta
	M_inv[rank2, 1, 1] = M[rank2, 0, 0] / delta
	# 2) Second sub-case: rank-deficient matrices of rank 0 and 1:
	rank01 = ~rank2
	tr = M[rank01, 0, 0] + M[rank01, 1, 1]
	tr_zeros = (np.abs(tr) < 1.e-8)
	sq_tr_inv = (1.-tr_zeros) / (tr**2+tr_zeros)
	# sq_tr_inv = 1. / tr**2
	M_inv[rank01, 0, 0] = M[rank01, 0, 0] * sq_tr_inv
	M_inv[rank01, 0, 1] = M[rank01, 0, 1] * sq_tr_inv
	M_inv[rank01, 1, 0] = M[rank01, 1, 0] * sq_tr_inv
	M_inv[rank01, 1, 1] = M[rank01, 1, 1] * sq_tr_inv

	return M_inv


	def _scalar_vectorized(scalar, M):
	"""
	Scalar product between scalars and matrices.
	"""
	return scalar[:, np.newaxis, np.newaxis]*M


	def _transpose_vectorized(M):
	"""
	Transposition of an array of matrices M.
	"""
	return np.transpose(M, [0, 2, 1])


	def _roll_vectorized(M, roll_indices, axis):
	"""
	Roll an array of matrices along axis (0: rows, 1: columns) according to
	an array of indices roll_indices.
	"""
	assert axis in [0, 1]
	ndim = M.ndim
	assert ndim == 3
	ndim_roll = roll_indices.ndim
	assert ndim_roll == 1
	sh = M.shape
	r, c = sh[-2:]
	assert sh[0] == roll_indices.shape[0]
	vec_indices = np.arange(sh[0], dtype=np.int32)

	# Builds the rolled matrix
	M_roll = np.empty_like(M)
	if axis == 0:
	for ir in range(r):
	for ic in range(c):
	M_roll[:, ir, ic] = M[vec_indices, (-roll_indices+ir) % r, ic]
	else: # 1
	for ir in range(r):
	for ic in range(c):
	M_roll[:, ir, ic] = M[vec_indices, ir, (-roll_indices+ic) % c]
	return M_roll


	def _to_matrix_vectorized(M):
	"""
	Build an array of matrices from individuals np.arrays of identical shapes.

	Parameters
	----------
	M
	ncols-list of nrows-lists of shape sh.

	Returns
	-------
	M_res : np.array of shape (sh, nrow, ncols)
	M_res satisfies ``M_res[..., i, j] = M[i][j]``.
	"""
	assert isinstance(M, (tuple, list))
	assert all(isinstance(item, (tuple, list)) for item in M)
	c_vec = np.asarray([len(item) for item in M])
	assert np.all(c_vec-c_vec[0] == 0)
	r = len(M)
	c = c_vec[0]
	M00 = np.asarray(M[0][0])
	dt = M00.dtype
	sh = [M00.shape[0], r, c]
	M_ret = np.empty(sh, dtype=dt)
	for irow in range(r):
	for icol in range(c):
	M_ret[:, irow, icol] = np.asarray(M[irow][icol])
	return M_ret


	def _extract_submatrices(M, block_indices, block_size, axis):
	"""
	Extract selected blocks of a matrices M depending on parameters
	block_indices and block_size.

	Returns the array of extracted matrices Mres so that ::

	M_res[..., ir, :] = M[(block_indices*block_size+ir), :]
	"""
	assert block_indices.ndim == 1
	assert axis in [0, 1]

	r, c = M.shape
	if axis == 0:
	sh = [block_indices.shape[0], block_size, c]
	else: # 1
	sh = [block_indices.shape[0], r, block_size]

	dt = M.dtype
	M_res = np.empty(sh, dtype=dt)
	if axis == 0:
	for ir in range(block_size):
	M_res[:, ir, :] = M[(block_indices*block_size+ir), :]
	else: # 1
	for ic in range(block_size):
	M_res[:, :, ic] = M[:, (block_indices*block_size+ic)]

	return M_res