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GameServerZ / MLPY /Lib /site-packages /networkx /generators /expanders.py

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	"""Provides explicit constructions of expander graphs.

	"""
	import itertools

	import networkx as nx

	__all__ = ["margulis_gabber_galil_graph", "chordal_cycle_graph", "paley_graph"]


	# Other discrete torus expanders can be constructed by using the following edge
	# sets. For more information, see Chapter 4, "Expander Graphs", in
	# "Pseudorandomness", by Salil Vadhan.
	#
	# For a directed expander, add edges from (x, y) to:
	#
	# (x, y),
	# ((x + 1) % n, y),
	# (x, (y + 1) % n),
	# (x, (x + y) % n),
	# (-y % n, x)
	#
	# For an undirected expander, add the reverse edges.
	#
	# Also appearing in the paper of Gabber and Galil:
	#
	# (x, y),
	# (x, (x + y) % n),
	# (x, (x + y + 1) % n),
	# ((x + y) % n, y),
	# ((x + y + 1) % n, y)
	#
	# and:
	#
	# (x, y),
	# ((x + 2*y) % n, y),
	# ((x + (2*y + 1)) % n, y),
	# ((x + (2*y + 2)) % n, y),
	# (x, (y + 2*x) % n),
	# (x, (y + (2*x + 1)) % n),
	# (x, (y + (2*x + 2)) % n),
	#
	@nx._dispatch(graphs=None)
	def margulis_gabber_galil_graph(n, create_using=None):
	r"""Returns the Margulis-Gabber-Galil undirected MultiGraph on `n^2` nodes.

	The undirected MultiGraph is regular with degree `8`. Nodes are integer
	pairs. The second-largest eigenvalue of the adjacency matrix of the graph
	is at most `5 \sqrt{2}`, regardless of `n`.

	Parameters
	----------
	n : int
	Determines the number of nodes in the graph: `n^2`.
	create_using : NetworkX graph constructor, optional (default MultiGraph)
	Graph type to create. If graph instance, then cleared before populated.

	Returns
	-------
	G : graph
	The constructed undirected multigraph.

	Raises
	------
	NetworkXError
	If the graph is directed or not a multigraph.

	"""
	G = nx.empty_graph(0, create_using, default=nx.MultiGraph)
	if G.is_directed() or not G.is_multigraph():
	msg = "`create_using` must be an undirected multigraph."
	raise nx.NetworkXError(msg)

	for x, y in itertools.product(range(n), repeat=2):
	for u, v in (
	((x + 2 * y) % n, y),
	((x + (2 * y + 1)) % n, y),
	(x, (y + 2 * x) % n),
	(x, (y + (2 * x + 1)) % n),
	):
	G.add_edge((x, y), (u, v))
	G.graph["name"] = f"margulis_gabber_galil_graph({n})"
	return G


	@nx._dispatch(graphs=None)
	def chordal_cycle_graph(p, create_using=None):
	"""Returns the chordal cycle graph on `p` nodes.

	The returned graph is a cycle graph on `p` nodes with chords joining each
	vertex `x` to its inverse modulo `p`. This graph is a (mildly explicit)
	3-regular expander [1]_.

	`p` must be a prime number.

	Parameters
	----------
	p : a prime number

	The number of vertices in the graph. This also indicates where the
	chordal edges in the cycle will be created.

	create_using : NetworkX graph constructor, optional (default=nx.Graph)
	Graph type to create. If graph instance, then cleared before populated.

	Returns
	-------
	G : graph
	The constructed undirected multigraph.

	Raises
	------
	NetworkXError

	If `create_using` indicates directed or not a multigraph.

	References
	----------

	.. [1] Theorem 4.4.2 in A. Lubotzky. "Discrete groups, expanding graphs and
	invariant measures", volume 125 of Progress in Mathematics.
	Birkhäuser Verlag, Basel, 1994.

	"""
	G = nx.empty_graph(0, create_using, default=nx.MultiGraph)
	if G.is_directed() or not G.is_multigraph():
	msg = "`create_using` must be an undirected multigraph."
	raise nx.NetworkXError(msg)

	for x in range(p):
	left = (x - 1) % p
	right = (x + 1) % p
	# Here we apply Fermat's Little Theorem to compute the multiplicative
	# inverse of x in Z/pZ. By Fermat's Little Theorem,
	#
	# x^p = x (mod p)
	#
	# Therefore,
	#
	# x * x^(p - 2) = 1 (mod p)
	#
	# The number 0 is a special case: we just let its inverse be itself.
	chord = pow(x, p - 2, p) if x > 0 else 0
	for y in (left, right, chord):
	G.add_edge(x, y)
	G.graph["name"] = f"chordal_cycle_graph({p})"
	return G


	@nx._dispatch(graphs=None)
	def paley_graph(p, create_using=None):
	r"""Returns the Paley $\frac{(p-1)}{2}$ -regular graph on $p$ nodes.

	The returned graph is a graph on $\mathbb{Z}/p\mathbb{Z}$ with edges between $x$ and $y$
	if and only if $x-y$ is a nonzero square in $\mathbb{Z}/p\mathbb{Z}$.

	If $p \equiv 1 \pmod 4$, $-1$ is a square in $\mathbb{Z}/p\mathbb{Z}$ and therefore $x-y$ is a square if and
	only if $y-x$ is also a square, i.e the edges in the Paley graph are symmetric.

	If $p \equiv 3 \pmod 4$, $-1$ is not a square in $\mathbb{Z}/p\mathbb{Z}$ and therefore either $x-y$ or $y-x$
	is a square in $\mathbb{Z}/p\mathbb{Z}$ but not both.

	Note that a more general definition of Paley graphs extends this construction
	to graphs over $q=p^n$ vertices, by using the finite field $F_q$ instead of $\mathbb{Z}/p\mathbb{Z}$.
	This construction requires to compute squares in general finite fields and is
	not what is implemented here (i.e `paley_graph(25)` does not return the true
	Paley graph associated with $5^2$).

	Parameters
	----------
	p : int, an odd prime number.

	create_using : NetworkX graph constructor, optional (default=nx.Graph)
	Graph type to create. If graph instance, then cleared before populated.

	Returns
	-------
	G : graph
	The constructed directed graph.

	Raises
	------
	NetworkXError
	If the graph is a multigraph.

	References
	----------
	Chapter 13 in B. Bollobas, Random Graphs. Second edition.
	Cambridge Studies in Advanced Mathematics, 73.
	Cambridge University Press, Cambridge (2001).
	"""
	G = nx.empty_graph(0, create_using, default=nx.DiGraph)
	if G.is_multigraph():
	msg = "`create_using` cannot be a multigraph."
	raise nx.NetworkXError(msg)

	# Compute the squares in Z/pZ.
	# Make it a set to uniquify (there are exactly (p-1)/2 squares in Z/pZ
	# when is prime).
	square_set = {(x2) % p for x in range(1, p) if (x2) % p != 0}

	for x in range(p):
	for x2 in square_set:
	G.add_edge(x, (x + x2) % p)
	G.graph["name"] = f"paley({p})"
	return G