ai-content-maker/.venv/Lib/site-packages/networkx/algorithms/polynomials.py

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"""Provides algorithms supporting the computation of graph polynomials.
Graph polynomials are polynomial-valued graph invariants that encode a wide
variety of structural information. Examples include the Tutte polynomial,
chromatic polynomial, characteristic polynomial, and matching polynomial. An
extensive treatment is provided in [1]_.
.. [1] Y. Shi, M. Dehmer, X. Li, I. Gutman,
"Graph Polynomials"
"""
from collections import deque
import networkx as nx
from networkx.utils import not_implemented_for
__all__ = ["tutte_polynomial", "chromatic_polynomial"]
@not_implemented_for("directed")
def tutte_polynomial(G):
r"""Returns the Tutte polynomial of `G`
This function computes the Tutte polynomial via an iterative version of
the deletion-contraction algorithm.
The Tutte polynomial `T_G(x, y)` is a fundamental graph polynomial invariant in
two variables. It encodes a wide array of information related to the
edge-connectivity of a graph; "Many problems about graphs can be reduced to
problems of finding and evaluating the Tutte polynomial at certain values" [1]_.
In fact, every deletion-contraction-expressible feature of a graph is a
specialization of the Tutte polynomial [2]_ (see Notes for examples).
There are several equivalent definitions; here are three:
Def 1 (rank-nullity expansion): For `G` an undirected graph, `n(G)` the
number of vertices of `G`, `E` the edge set of `G`, `V` the vertex set of
`G`, and `c(A)` the number of connected components of the graph with vertex
set `V` and edge set `A` [3]_:
.. math::
T_G(x, y) = \sum_{A \in E} (x-1)^{c(A) - c(E)} (y-1)^{c(A) + |A| - n(G)}
Def 2 (spanning tree expansion): Let `G` be an undirected graph, `T` a spanning
tree of `G`, and `E` the edge set of `G`. Let `E` have an arbitrary strict
linear order `L`. Let `B_e` be the unique minimal nonempty edge cut of
$E \setminus T \cup {e}$. An edge `e` is internally active with respect to
`T` and `L` if `e` is the least edge in `B_e` according to the linear order
`L`. The internal activity of `T` (denoted `i(T)`) is the number of edges
in $E \setminus T$ that are internally active with respect to `T` and `L`.
Let `P_e` be the unique path in $T \cup {e}$ whose source and target vertex
are the same. An edge `e` is externally active with respect to `T` and `L`
if `e` is the least edge in `P_e` according to the linear order `L`. The
external activity of `T` (denoted `e(T)`) is the number of edges in
$E \setminus T$ that are externally active with respect to `T` and `L`.
Then [4]_ [5]_:
.. math::
T_G(x, y) = \sum_{T \text{ a spanning tree of } G} x^{i(T)} y^{e(T)}
Def 3 (deletion-contraction recurrence): For `G` an undirected graph, `G-e`
the graph obtained from `G` by deleting edge `e`, `G/e` the graph obtained
from `G` by contracting edge `e`, `k(G)` the number of cut-edges of `G`,
and `l(G)` the number of self-loops of `G`:
.. math::
T_G(x, y) = \begin{cases}
x^{k(G)} y^{l(G)}, & \text{if all edges are cut-edges or self-loops} \\
T_{G-e}(x, y) + T_{G/e}(x, y), & \text{otherwise, for an arbitrary edge $e$ not a cut-edge or loop}
\end{cases}
Parameters
----------
G : NetworkX graph
Returns
-------
instance of `sympy.core.add.Add`
A Sympy expression representing the Tutte polynomial for `G`.
Examples
--------
>>> C = nx.cycle_graph(5)
>>> nx.tutte_polynomial(C)
x**4 + x**3 + x**2 + x + y
>>> D = nx.diamond_graph()
>>> nx.tutte_polynomial(D)
x**3 + 2*x**2 + 2*x*y + x + y**2 + y
Notes
-----
Some specializations of the Tutte polynomial:
- `T_G(1, 1)` counts the number of spanning trees of `G`
- `T_G(1, 2)` counts the number of connected spanning subgraphs of `G`
- `T_G(2, 1)` counts the number of spanning forests in `G`
- `T_G(0, 2)` counts the number of strong orientations of `G`
- `T_G(2, 0)` counts the number of acyclic orientations of `G`
Edge contraction is defined and deletion-contraction is introduced in [6]_.
Combinatorial meaning of the coefficients is introduced in [7]_.
Universality, properties, and applications are discussed in [8]_.
Practically, up-front computation of the Tutte polynomial may be useful when
users wish to repeatedly calculate edge-connectivity-related information
about one or more graphs.
References
----------
.. [1] M. Brandt,
"The Tutte Polynomial."
Talking About Combinatorial Objects Seminar, 2015
https://math.berkeley.edu/~brandtm/talks/tutte.pdf
.. [2] A. Björklund, T. Husfeldt, P. Kaski, M. Koivisto,
"Computing the Tutte polynomial in vertex-exponential time"
49th Annual IEEE Symposium on Foundations of Computer Science, 2008
https://ieeexplore.ieee.org/abstract/document/4691000
.. [3] Y. Shi, M. Dehmer, X. Li, I. Gutman,
"Graph Polynomials," p. 14
.. [4] Y. Shi, M. Dehmer, X. Li, I. Gutman,
"Graph Polynomials," p. 46
.. [5] A. Nešetril, J. Goodall,
"Graph invariants, homomorphisms, and the Tutte polynomial"
https://iuuk.mff.cuni.cz/~andrew/Tutte.pdf
.. [6] D. B. West,
"Introduction to Graph Theory," p. 84
.. [7] G. Coutinho,
"A brief introduction to the Tutte polynomial"
Structural Analysis of Complex Networks, 2011
https://homepages.dcc.ufmg.br/~gabriel/seminars/coutinho_tuttepolynomial_seminar.pdf
.. [8] J. A. Ellis-Monaghan, C. Merino,
"Graph polynomials and their applications I: The Tutte polynomial"
Structural Analysis of Complex Networks, 2011
https://arxiv.org/pdf/0803.3079.pdf
"""
import sympy
x = sympy.Symbol("x")
y = sympy.Symbol("y")
stack = deque()
stack.append(nx.MultiGraph(G))
polynomial = 0
while stack:
G = stack.pop()
bridges = set(nx.bridges(G))
e = None
for i in G.edges:
if (i[0], i[1]) not in bridges and i[0] != i[1]:
e = i
break
if not e:
loops = list(nx.selfloop_edges(G, keys=True))
polynomial += x ** len(bridges) * y ** len(loops)
else:
# deletion-contraction
C = nx.contracted_edge(G, e, self_loops=True)
C.remove_edge(e[0], e[0])
G.remove_edge(*e)
stack.append(G)
stack.append(C)
return sympy.simplify(polynomial)
@not_implemented_for("directed")
def chromatic_polynomial(G):
r"""Returns the chromatic polynomial of `G`
This function computes the chromatic polynomial via an iterative version of
the deletion-contraction algorithm.
The chromatic polynomial `X_G(x)` is a fundamental graph polynomial
invariant in one variable. Evaluating `X_G(k)` for an natural number `k`
enumerates the proper k-colorings of `G`.
There are several equivalent definitions; here are three:
Def 1 (explicit formula):
For `G` an undirected graph, `c(G)` the number of connected components of
`G`, `E` the edge set of `G`, and `G(S)` the spanning subgraph of `G` with
edge set `S` [1]_:
.. math::
X_G(x) = \sum_{S \subseteq E} (-1)^{|S|} x^{c(G(S))}
Def 2 (interpolating polynomial):
For `G` an undirected graph, `n(G)` the number of vertices of `G`, `k_0 = 0`,
and `k_i` the number of distinct ways to color the vertices of `G` with `i`
unique colors (for `i` a natural number at most `n(G)`), `X_G(x)` is the
unique Lagrange interpolating polynomial of degree `n(G)` through the points
`(0, k_0), (1, k_1), \dots, (n(G), k_{n(G)})` [2]_.
Def 3 (chromatic recurrence):
For `G` an undirected graph, `G-e` the graph obtained from `G` by deleting
edge `e`, `G/e` the graph obtained from `G` by contracting edge `e`, `n(G)`
the number of vertices of `G`, and `e(G)` the number of edges of `G` [3]_:
.. math::
X_G(x) = \begin{cases}
x^{n(G)}, & \text{if $e(G)=0$} \\
X_{G-e}(x) - X_{G/e}(x), & \text{otherwise, for an arbitrary edge $e$}
\end{cases}
This formulation is also known as the Fundamental Reduction Theorem [4]_.
Parameters
----------
G : NetworkX graph
Returns
-------
instance of `sympy.core.add.Add`
A Sympy expression representing the chromatic polynomial for `G`.
Examples
--------
>>> C = nx.cycle_graph(5)
>>> nx.chromatic_polynomial(C)
x**5 - 5*x**4 + 10*x**3 - 10*x**2 + 4*x
>>> G = nx.complete_graph(4)
>>> nx.chromatic_polynomial(G)
x**4 - 6*x**3 + 11*x**2 - 6*x
Notes
-----
Interpretation of the coefficients is discussed in [5]_. Several special
cases are listed in [2]_.
The chromatic polynomial is a specialization of the Tutte polynomial; in
particular, `X_G(x) = `T_G(x, 0)` [6]_.
The chromatic polynomial may take negative arguments, though evaluations
may not have chromatic interpretations. For instance, `X_G(-1)` enumerates
the acyclic orientations of `G` [7]_.
References
----------
.. [1] D. B. West,
"Introduction to Graph Theory," p. 222
.. [2] E. W. Weisstein
"Chromatic Polynomial"
MathWorld--A Wolfram Web Resource
https://mathworld.wolfram.com/ChromaticPolynomial.html
.. [3] D. B. West,
"Introduction to Graph Theory," p. 221
.. [4] J. Zhang, J. Goodall,
"An Introduction to Chromatic Polynomials"
https://math.mit.edu/~apost/courses/18.204_2018/Julie_Zhang_paper.pdf
.. [5] R. C. Read,
"An Introduction to Chromatic Polynomials"
Journal of Combinatorial Theory, 1968
https://math.berkeley.edu/~mrklug/ReadChromatic.pdf
.. [6] W. T. Tutte,
"Graph-polynomials"
Advances in Applied Mathematics, 2004
https://www.sciencedirect.com/science/article/pii/S0196885803000411
.. [7] R. P. Stanley,
"Acyclic orientations of graphs"
Discrete Mathematics, 2006
https://math.mit.edu/~rstan/pubs/pubfiles/18.pdf
"""
import sympy
x = sympy.Symbol("x")
stack = deque()
stack.append(nx.MultiGraph(G, contraction_idx=0))
polynomial = 0
while stack:
G = stack.pop()
edges = list(G.edges)
if not edges:
polynomial += (-1) ** G.graph["contraction_idx"] * x ** len(G)
else:
e = edges[0]
C = nx.contracted_edge(G, e, self_loops=True)
C.graph["contraction_idx"] = G.graph["contraction_idx"] + 1
C.remove_edge(e[0], e[0])
G.remove_edge(*e)
stack.append(G)
stack.append(C)
return polynomial