| """Functions for generating grid graphs and lattices |
| |
| The :func:`grid_2d_graph`, :func:`triangular_lattice_graph`, and |
| :func:`hexagonal_lattice_graph` functions correspond to the three |
| `regular tilings of the plane`_, the square, triangular, and hexagonal |
| tilings, respectively. :func:`grid_graph` and :func:`hypercube_graph` |
| are similar for arbitrary dimensions. Useful relevant discussion can |
| be found about `Triangular Tiling`_, and `Square, Hex and Triangle Grids`_ |
| |
| .. _regular tilings of the plane: https://en.wikipedia.org/wiki/List_of_regular_polytopes_and_compounds#Euclidean_tilings |
| .. _Square, Hex and Triangle Grids: http://www-cs-students.stanford.edu/~amitp/game-programming/grids/ |
| .. _Triangular Tiling: https://en.wikipedia.org/wiki/Triangular_tiling |
| |
| """ |
|
|
| from itertools import repeat |
| from math import sqrt |
|
|
| import networkx as nx |
| from networkx.classes import set_node_attributes |
| from networkx.exception import NetworkXError |
| from networkx.generators.classic import cycle_graph, empty_graph, path_graph |
| from networkx.relabel import relabel_nodes |
| from networkx.utils import flatten, nodes_or_number, pairwise |
|
|
| __all__ = [ |
| "grid_2d_graph", |
| "grid_graph", |
| "hypercube_graph", |
| "triangular_lattice_graph", |
| "hexagonal_lattice_graph", |
| ] |
|
|
|
|
| @nx._dispatchable(graphs=None, returns_graph=True) |
| @nodes_or_number([0, 1]) |
| def grid_2d_graph(m, n, periodic=False, create_using=None): |
| """Returns the two-dimensional grid graph. |
| |
| The grid graph has each node connected to its four nearest neighbors. |
| |
| Parameters |
| ---------- |
| m, n : int or iterable container of nodes |
| If an integer, nodes are from `range(n)`. |
| If a container, elements become the coordinate of the nodes. |
| |
| periodic : bool or iterable |
| If `periodic` is True, both dimensions are periodic. If False, none |
| are periodic. If `periodic` is iterable, it should yield 2 bool |
| values indicating whether the 1st and 2nd axes, respectively, are |
| periodic. |
| |
| create_using : NetworkX graph constructor, optional (default=nx.Graph) |
| Graph type to create. If graph instance, then cleared before populated. |
| |
| Returns |
| ------- |
| NetworkX graph |
| The (possibly periodic) grid graph of the specified dimensions. |
| |
| """ |
| G = empty_graph(0, create_using) |
| row_name, rows = m |
| col_name, cols = n |
| G.add_nodes_from((i, j) for i in rows for j in cols) |
| G.add_edges_from(((i, j), (pi, j)) for pi, i in pairwise(rows) for j in cols) |
| G.add_edges_from(((i, j), (i, pj)) for i in rows for pj, j in pairwise(cols)) |
|
|
| try: |
| periodic_r, periodic_c = periodic |
| except TypeError: |
| periodic_r = periodic_c = periodic |
|
|
| if periodic_r and len(rows) > 2: |
| first = rows[0] |
| last = rows[-1] |
| G.add_edges_from(((first, j), (last, j)) for j in cols) |
| if periodic_c and len(cols) > 2: |
| first = cols[0] |
| last = cols[-1] |
| G.add_edges_from(((i, first), (i, last)) for i in rows) |
| |
| if G.is_directed(): |
| G.add_edges_from((v, u) for u, v in G.edges()) |
| return G |
|
|
|
|
| @nx._dispatchable(graphs=None, returns_graph=True) |
| def grid_graph(dim, periodic=False): |
| """Returns the *n*-dimensional grid graph. |
| |
| The dimension *n* is the length of the list `dim` and the size in |
| each dimension is the value of the corresponding list element. |
| |
| Parameters |
| ---------- |
| dim : list or tuple of numbers or iterables of nodes |
| 'dim' is a tuple or list with, for each dimension, either a number |
| that is the size of that dimension or an iterable of nodes for |
| that dimension. The dimension of the grid_graph is the length |
| of `dim`. |
| |
| periodic : bool or iterable |
| If `periodic` is True, all dimensions are periodic. If False all |
| dimensions are not periodic. If `periodic` is iterable, it should |
| yield `dim` bool values each of which indicates whether the |
| corresponding axis is periodic. |
| |
| Returns |
| ------- |
| NetworkX graph |
| The (possibly periodic) grid graph of the specified dimensions. |
| |
| Examples |
| -------- |
| To produce a 2 by 3 by 4 grid graph, a graph on 24 nodes: |
| |
| >>> from networkx import grid_graph |
| >>> G = grid_graph(dim=(2, 3, 4)) |
| >>> len(G) |
| 24 |
| >>> G = grid_graph(dim=(range(7, 9), range(3, 6))) |
| >>> len(G) |
| 6 |
| """ |
| from networkx.algorithms.operators.product import cartesian_product |
|
|
| if not dim: |
| return empty_graph(0) |
|
|
| try: |
| func = (cycle_graph if p else path_graph for p in periodic) |
| except TypeError: |
| func = repeat(cycle_graph if periodic else path_graph) |
|
|
| G = next(func)(dim[0]) |
| for current_dim in dim[1:]: |
| Gnew = next(func)(current_dim) |
| G = cartesian_product(Gnew, G) |
| |
| H = relabel_nodes(G, flatten) |
| return H |
|
|
|
|
| @nx._dispatchable(graphs=None, returns_graph=True) |
| def hypercube_graph(n): |
| """Returns the *n*-dimensional hypercube graph. |
| |
| The nodes are the integers between 0 and ``2 ** n - 1``, inclusive. |
| |
| For more information on the hypercube graph, see the Wikipedia |
| article `Hypercube graph`_. |
| |
| .. _Hypercube graph: https://en.wikipedia.org/wiki/Hypercube_graph |
| |
| Parameters |
| ---------- |
| n : int |
| The dimension of the hypercube. |
| The number of nodes in the graph will be ``2 ** n``. |
| |
| Returns |
| ------- |
| NetworkX graph |
| The hypercube graph of dimension *n*. |
| """ |
| dim = n * [2] |
| G = grid_graph(dim) |
| return G |
|
|
|
|
| @nx._dispatchable(graphs=None, returns_graph=True) |
| def triangular_lattice_graph( |
| m, n, periodic=False, with_positions=True, create_using=None |
| ): |
| r"""Returns the $m$ by $n$ triangular lattice graph. |
| |
| The `triangular lattice graph`_ is a two-dimensional `grid graph`_ in |
| which each square unit has a diagonal edge (each grid unit has a chord). |
| |
| The returned graph has $m$ rows and $n$ columns of triangles. Rows and |
| columns include both triangles pointing up and down. Rows form a strip |
| of constant height. Columns form a series of diamond shapes, staggered |
| with the columns on either side. Another way to state the size is that |
| the nodes form a grid of `m+1` rows and `(n + 1) // 2` columns. |
| The odd row nodes are shifted horizontally relative to the even rows. |
| |
| Directed graph types have edges pointed up or right. |
| |
| Positions of nodes are computed by default or `with_positions is True`. |
| The position of each node (embedded in a euclidean plane) is stored in |
| the graph using equilateral triangles with sidelength 1. |
| The height between rows of nodes is thus $\sqrt(3)/2$. |
| Nodes lie in the first quadrant with the node $(0, 0)$ at the origin. |
| |
| .. _triangular lattice graph: http://mathworld.wolfram.com/TriangularGrid.html |
| .. _grid graph: http://www-cs-students.stanford.edu/~amitp/game-programming/grids/ |
| .. _Triangular Tiling: https://en.wikipedia.org/wiki/Triangular_tiling |
| |
| Parameters |
| ---------- |
| m : int |
| The number of rows in the lattice. |
| |
| n : int |
| The number of columns in the lattice. |
| |
| periodic : bool (default: False) |
| If True, join the boundary vertices of the grid using periodic |
| boundary conditions. The join between boundaries is the final row |
| and column of triangles. This means there is one row and one column |
| fewer nodes for the periodic lattice. Periodic lattices require |
| `m >= 3`, `n >= 5` and are allowed but misaligned if `m` or `n` are odd |
| |
| with_positions : bool (default: True) |
| Store the coordinates of each node in the graph node attribute 'pos'. |
| The coordinates provide a lattice with equilateral triangles. |
| Periodic positions shift the nodes vertically in a nonlinear way so |
| the edges don't overlap so much. |
| |
| create_using : NetworkX graph constructor, optional (default=nx.Graph) |
| Graph type to create. If graph instance, then cleared before populated. |
| |
| Returns |
| ------- |
| NetworkX graph |
| The *m* by *n* triangular lattice graph. |
| """ |
| H = empty_graph(0, create_using) |
| if n == 0 or m == 0: |
| return H |
| if periodic: |
| if n < 5 or m < 3: |
| msg = f"m > 2 and n > 4 required for periodic. m={m}, n={n}" |
| raise NetworkXError(msg) |
|
|
| N = (n + 1) // 2 |
| rows = range(m + 1) |
| cols = range(N + 1) |
| |
| H.add_edges_from(((i, j), (i + 1, j)) for j in rows for i in cols[:N]) |
| H.add_edges_from(((i, j), (i, j + 1)) for j in rows[:m] for i in cols) |
| |
| H.add_edges_from(((i, j), (i + 1, j + 1)) for j in rows[1:m:2] for i in cols[:N]) |
| H.add_edges_from(((i + 1, j), (i, j + 1)) for j in rows[:m:2] for i in cols[:N]) |
| |
| from networkx.algorithms.minors import contracted_nodes |
|
|
| if periodic is True: |
| for i in cols: |
| H = contracted_nodes(H, (i, 0), (i, m)) |
| for j in rows[:m]: |
| H = contracted_nodes(H, (0, j), (N, j)) |
| elif n % 2: |
| |
| H.remove_nodes_from((N, j) for j in rows[1::2]) |
|
|
| |
| if with_positions: |
| ii = (i for i in cols for j in rows) |
| jj = (j for i in cols for j in rows) |
| xx = (0.5 * (j % 2) + i for i in cols for j in rows) |
| h = sqrt(3) / 2 |
| if periodic: |
| yy = (h * j + 0.01 * i * i for i in cols for j in rows) |
| else: |
| yy = (h * j for i in cols for j in rows) |
| pos = {(i, j): (x, y) for i, j, x, y in zip(ii, jj, xx, yy) if (i, j) in H} |
| set_node_attributes(H, pos, "pos") |
| return H |
|
|
|
|
| @nx._dispatchable(graphs=None, returns_graph=True) |
| def hexagonal_lattice_graph( |
| m, n, periodic=False, with_positions=True, create_using=None |
| ): |
| """Returns an `m` by `n` hexagonal lattice graph. |
| |
| The *hexagonal lattice graph* is a graph whose nodes and edges are |
| the `hexagonal tiling`_ of the plane. |
| |
| The returned graph will have `m` rows and `n` columns of hexagons. |
| `Odd numbered columns`_ are shifted up relative to even numbered columns. |
| |
| Positions of nodes are computed by default or `with_positions is True`. |
| Node positions creating the standard embedding in the plane |
| with sidelength 1 and are stored in the node attribute 'pos'. |
| `pos = nx.get_node_attributes(G, 'pos')` creates a dict ready for drawing. |
| |
| .. _hexagonal tiling: https://en.wikipedia.org/wiki/Hexagonal_tiling |
| .. _Odd numbered columns: http://www-cs-students.stanford.edu/~amitp/game-programming/grids/ |
| |
| Parameters |
| ---------- |
| m : int |
| The number of rows of hexagons in the lattice. |
| |
| n : int |
| The number of columns of hexagons in the lattice. |
| |
| periodic : bool |
| Whether to make a periodic grid by joining the boundary vertices. |
| For this to work `n` must be even and both `n > 1` and `m > 1`. |
| The periodic connections create another row and column of hexagons |
| so these graphs have fewer nodes as boundary nodes are identified. |
| |
| with_positions : bool (default: True) |
| Store the coordinates of each node in the graph node attribute 'pos'. |
| The coordinates provide a lattice with vertical columns of hexagons |
| offset to interleave and cover the plane. |
| Periodic positions shift the nodes vertically in a nonlinear way so |
| the edges don't overlap so much. |
| |
| create_using : NetworkX graph constructor, optional (default=nx.Graph) |
| Graph type to create. If graph instance, then cleared before populated. |
| If graph is directed, edges will point up or right. |
| |
| Returns |
| ------- |
| NetworkX graph |
| The *m* by *n* hexagonal lattice graph. |
| """ |
| G = empty_graph(0, create_using) |
| if m == 0 or n == 0: |
| return G |
| if periodic and (n % 2 == 1 or m < 2 or n < 2): |
| msg = "periodic hexagonal lattice needs m > 1, n > 1 and even n" |
| raise NetworkXError(msg) |
|
|
| M = 2 * m |
| rows = range(M + 2) |
| cols = range(n + 1) |
| |
| col_edges = (((i, j), (i, j + 1)) for i in cols for j in rows[: M + 1]) |
| row_edges = (((i, j), (i + 1, j)) for i in cols[:n] for j in rows if i % 2 == j % 2) |
| G.add_edges_from(col_edges) |
| G.add_edges_from(row_edges) |
| |
| G.remove_node((0, M + 1)) |
| G.remove_node((n, (M + 1) * (n % 2))) |
|
|
| |
| from networkx.algorithms.minors import contracted_nodes |
|
|
| if periodic: |
| for i in cols[:n]: |
| G = contracted_nodes(G, (i, 0), (i, M)) |
| for i in cols[1:]: |
| G = contracted_nodes(G, (i, 1), (i, M + 1)) |
| for j in rows[1:M]: |
| G = contracted_nodes(G, (0, j), (n, j)) |
| G.remove_node((n, M)) |
|
|
| |
| ii = (i for i in cols for j in rows) |
| jj = (j for i in cols for j in rows) |
| xx = (0.5 + i + i // 2 + (j % 2) * ((i % 2) - 0.5) for i in cols for j in rows) |
| h = sqrt(3) / 2 |
| if periodic: |
| yy = (h * j + 0.01 * i * i for i in cols for j in rows) |
| else: |
| yy = (h * j for i in cols for j in rows) |
| |
| pos = {(i, j): (x, y) for i, j, x, y in zip(ii, jj, xx, yy) if (i, j) in G} |
| set_node_attributes(G, pos, "pos") |
| return G |
|
|
