Questions about the branch of combinatorics called graph theory (not to be used for questions concerning the graph of a function). This tag can be further specialized via using it in combination with more specialized tags such as extremal-graph-theory, spectral-graph-theory, algebraic-graph-theory, ...

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3
votes
1answer
114 views

chromatic polynomial of G - Join graph

Given a connected graph $G$ with $n$ vertices and given set of $\{m_1,m_2,...,m_n\}$ $n$ integers, we form a new graph $G^{\wedge} $ by considering the complete graph $K_{m_i}$ for each vertex i and '...
-1
votes
1answer
107 views

Subgraphs of $\mathbb{R}^2$ in the Hadwiger-Nelson problem

In the setting of the Hadwiger-Nelson problem, two points of $\mathbb{R}^2$ form an edge if and only if their distance is $1$. The resulting graph $G$ has chromatic number $\chi(G)\in \{4,5,6,7\}$ and ...
1
vote
1answer
104 views

Counting bounded genus non-isomorphic graphs

What is the number of non-isomorphic $2n$ vertex balanced bipartite graphs of degree at most $d$ and genus $g$? I am most interested in $d\leq3$ and $g=0$.
4
votes
1answer
196 views

exact definition of Fiedler vector

For a given N-vertex similarity graph $ G=(V,A) $ the eigenvalues of the unrenormalized (graph) Laplacian may be denoted as $$ 0= \mu_0 \leq \mu_1 \leq ... \leq \mu_N $$ where the corresponding ...
4
votes
2answers
190 views

Non-Cayley expander graphs

When I search about expander graphs in google I see a lot of articles about expander Cayley graphs. Now my questions are as follows: Are all expander regular graphs are Cayley, or there is a special ...
1
vote
0answers
30 views

Expected number of perfect matchings in bounded degree bipartite graphs

Consider collection $\mathcal C_{n,n,\Delta}$ of every $2n$ vertex balanced bipartite graph of average degree $\Delta$. What is the expected number of perfect matching a graph in $\mathcal C_{n,n,\...
2
votes
1answer
94 views

A centralised website for computational attempts in graph theory and metric geometry?

The set of questions below stems from this question. 1) does a website exist that contains (at least links to) code and data files, with the aim to centralise computational results in graph ...
0
votes
0answers
23 views

1-factorizations of complete multigraphs

When is it possible to find a 1-factorization of the complete multigraph $\lambda K_{2k}$ in which any two 1-factors have at most 1 edge in common? In particular, I am interested in whether such a 1-...
1
vote
3answers
132 views

On number of perfect matchings

Consider $2n$ vertex balanced bipartite graph. If total number of edges is $n^2$ then we have $n!$ perfect matchings. Fix $c\in(0,\frac12)$ and consider collection of $2n$ vertex balanced bipartite ...
2
votes
1answer
63 views

Is there any digraph data set that gives all directed graphs satisfying certain requirements?

I'm looking for a digraph dataset that can return all directed graphs satisfying certain requirements. Following are some examples: All tournament with 12 vertices; All connected digraphs with 10 ...
4
votes
2answers
253 views

Are all numbers from $1$ to $n!$ the number of perfect matchings of some bipartite graph?

Let $f(G)$ give the number of perfect matchings of a graph $G$. Consider set $\mathcal N_{2n}=\{0,1,2,\dots,n!-1,n!\}$. Consider collection of all $2n$ vertex balanced bipartite graph to be $\...
2
votes
0answers
80 views

Regularity for a bipartite graph

Let $G$ be a bipartite graph with $2^n$ left vertices and $2^n$ right vertices such that: 1) degree of every vertex is not greater then $2^t$ 2) number of all edges is greater than $2^{n +t - O(\log ...
0
votes
1answer
58 views

Long term behavior of a certain discrete time dynamical system on graphs

Consider the graph $(V,E)$ with vertex set $V=\{v_1,...,v_n\}$ and edge set $E\subset V\times V$. Further, assume that $\forall v_i\in V, (v_i,v_i)\in E$. Assume that each vertex has an $\textit{...
2
votes
1answer
115 views

Graph Isomorphism for Triangle Free graph

Is there any specific computational complexity result of Graph Isomorphism for Triangle Free graphs? Anything close to the subject will help and of course, I have searched Google.
3
votes
1answer
100 views

Covering a graph by trees with depth constraint

Given a graph $G$ and a depth constraint $h$, my question is: what is the complexity to find a tree cover of $G$, denoted as $T=\{T_1, T_2, ..., T_n\}$. For each $T_i$, its depth(height) is no larger ...
1
vote
0answers
47 views

Largest number of perfect matchings in bounded genus graphs

What is the largest number of perfect matchings a genus $g$ bipartite graph on $n+m$ vertices have?
0
votes
0answers
31 views

Similarity metric for labelled weighted graph/minimum spanning tree

I'm looking for a metric to measure similarity of minimum spanning trees of labelled weighted graphs. Each entity to compare has the same nodes (number of nodes and labels identical) but (unlabelled) ...
1
vote
0answers
49 views

Influence of independent variables on boolean functions?

Suppose a simple connected graph $G$ where its vertices are assumed to be independent. An event with uncertainty corresponds to each vertex. My instructor guides me that even though the vertices (...
2
votes
0answers
58 views

When is the graph of cliques isomorphic to the graph itself?

Given a graph $G$ and the set $C_k(G)$ of the $k$-cliques in $G$, one can build a clique graph $H$ whose vertices $c_i\in C_k(G)$ are connected if the vertex sets of $c_i$ and $c_j$ have an ...
14
votes
2answers
388 views

Has there been a computer search for a 5-chromatic unit distance graph?

The existence of a 4-chromatic unit distance graph (e.g., the Moser spindle) establishes a lower bound of 4 for the chromatic number of the plane (see the Nelson-Hadwiger problem). Obviously, it ...
3
votes
1answer
89 views

A modified bipartite assignment problem

Consider the following optimization problem. I have $n$ advisors and $dn$ students. I want to assign each student an advisor so that each advisor has exactly $d$ students. Each advisor/student pair ...
5
votes
2answers
132 views

Finite graph colorings without symmetries

Let $G$ be a connected finite simple graph with vertex set $V$, $F$ a finite set and let $\Delta(G)$ denote the degree of $G$, i.e. $\Delta(G)= \max_{v\in V} \deg(v)$. We say that a coloring $\phi\...
4
votes
3answers
185 views

Relation between diametral path and regularity of a graph

Let $G(V,E)$ be a graph. A path whose length is equal to the diameter of a graph is called a diametral path. In a cycle graph every vertex has $2$ diametral paths. Now I need to prove that this: ...
1
vote
1answer
154 views

What does the higher coefficients of ihara zeta function reveal?

Assume we have a graph $G=(V,E)$. The ihara zeta function $Z(G,u)$ is of form $$\frac1{\displaystyle\sum_{i=0}^{2|E|}c_iu^i}$$ A graph which has $|E|$ edges cannot have a simple cycle of length ...
1
vote
0answers
49 views

How to count the number of shortest paths in a 2x2 grid? [closed]

Say that we have a 2x2 regular grid or network. We label the nodes 0 to 3 row-wise. Then, for each node, we want to compute the number of shortest paths that pass through them. I have a Python code ...
1
vote
0answers
36 views

Infinite graphs with number of common neighbors given for each pair of vertices

This is a follow-up to this question. For any set $X$ we set $[X]^2 = \big\{\{x,y\}: x\neq y \in X\big\}$. If $G=(V,E)$ is a simple undirected graph, and $v\in V$, we set $N(v) = \{w\in V:\{v,w\}\in ...
1
vote
0answers
65 views

Number of rooted spanning forests

Let $G$ be a connected simple graph, and identify two vertices $s$ and $t$. Let $\tau(G)$ be the number of spanning trees of $G$, and let $f(G)$ be the number of spanning forests of $G$ with $2$ ...
1
vote
1answer
78 views
7
votes
1answer
143 views

Can the graph removal lemma be proved directly from the triangle removal lemma?

The Triangle Removal Lemma states that any graph with $o(n^3)$ triangles can be made triangle-free by removing only $o(n^2)$ edges. More generally, the Graph Removal Lemma states that for any graph $...
0
votes
1answer
132 views

Stable marriages for infinite bipartite graphs

Short and informal version: Does the stable marriage problem have a solution if there are $\kappa$ men and $\kappa$ women for any cardinal $\kappa \geq \aleph_0$? Long and formal version: Let $\kappa$...
-2
votes
1answer
63 views

Splitting the vertices of undirected graphs into 2 sparse sets

(A version of this question for undirected graphs.) Let $G=(V,E)$ be a finite, simple, undirected graph. For $v\in V$ set $$ N(v) := \{x\in V: \{x,v\}\in E\}. $$ Is it possible to find a ...
15
votes
5answers
484 views

Cayley graphs of $A_n.$

Consider the Cayley graphs of $A_n,$ with respect to the generating set of all $3$-cycles. Their properties must be quite well-known, but sadly not to me. For example: what is its diameter? Is it an ...
1
vote
1answer
79 views

many 5-list colorings

If a graph is 4-list-colorable, then it is easy to see that it has exponentially many 5-list colorings. This is the first sentence in [Exponentially many 5-list-colorings of planar graphs,JCTB,97 (...
1
vote
1answer
76 views

Partitioning finite directed graphs into 3 “incoming-sparse” sets

Let $G=(V,E)$ be a directed graph. For $v\in V$ set $\text{In}(v)=\{x\in V: (x,v)\in E\}$. Is it possible to find a partition $P_1,P_2,P_3$ of $V$ such that for every $P_i$ and every vertex $v\in ...
8
votes
3answers
301 views

A simplified Art Gallery Problem in a matrix

Let's take a $m \times n$ matrix as an area with $m \times n$ blocks (likes a 2D-version of the world in Minecraft). We have to put some lamps in this matrix to illuminate the whole matrix. Here is ...
1
vote
0answers
42 views

How to estimate the size of balanced biclique in random bipartite graph?

We have a random bipartite graph $G=(V,U,E)$ and $|V|=|U|=n$, in which any vertex pair $<v,u>$ ($v\in V$,$u\in U$) exists an edge with probability $p$. A balanced bipartite complete graph is a ...
1
vote
0answers
59 views

Equivalence between bipartite undirected graph and arbitrary directed graph

Let the adjacency matrix of an undirected bipartite graph be $A = \begin{pmatrix} 0 & B \\ B^T & 0 \end{pmatrix}$ where B is called the biadjacency matrix. Now, by instead interpreting B as ...
-2
votes
1answer
65 views

Degrees and common neighbors

For any simple, finite, undirected graph $G=(V,E)$ and $v\in V$ let $N(v) = \{w\in V:\{v,w\}\in E\}$. Suppose $G, H$ are finite, simple, undirected graphs and there is a bijection between the vertex ...
-6
votes
1answer
97 views

Do degrees determine the chromatic number?

Suppose $G, H$ are finite, simple, undirected graphs and there is a bijection between the vertex sets $\varphi:V(G) \to V(H)$ such that for all $v\in V$ we have $$\text{deg}_G(v) = \deg_H(\varphi(v)).$...
5
votes
0answers
119 views

Complexity of graph isomorphism

Last year, Laszlo Babai proved that the graph isomorphism problem can be solved in time: $$ \exp(O(\log^c n)) $$ where $n$ is the number of vertices. What is the best bound we have for $c$? (The ...
4
votes
2answers
211 views

Algorithms for finding graph isomorphisms

I was wondering if anybody knows where I can find some information about the current (practical) algorithms for finding graph isomorphisms. I've joined the bandwagon and wrote my own which I would ...
3
votes
1answer
74 views

Let $S$ be the nonempty set of strongly regular graphs with given parameters. Must $S$ contain vertex transitive graph?

As the title says, let $S$ be the nonempty set of strongly regular graphs with given parameters. Must $S$ contain vertex transitive graph? I suspect the most likely counterexample would be $|S|=1$.
5
votes
2answers
144 views

“Common-neighbor-regular” graphs

Let $G=(V,E)$ be a finite, simple, undirected graph. For $v\in V$ we set $N(v)=\{w\in V:\{v,w\}\in E\}$. We say that $G$ is $k$-common-neighbor-regular if for all $v\neq w\in V$ we have $|N(v)\cap N(...
3
votes
1answer
84 views

Tournament whose large subtournaments contain no automorphism

For sufficiently large $n$, it is known that most tournaments of size $n$ contains no nontrivial automorphism, though I forgot the reference. For sufficiently large $n$, does there always exist a ...
4
votes
1answer
125 views

Representing a graph's vertices as linear combinations of paths

I have a (directed graded) graph $G=(V,E)$ with two distinguished subsets of $V$: sources and destinations. I am to show that the set of indicator functions of paths starting in a source and ending in ...
5
votes
1answer
194 views

Construction of a graph

To construct a specific kind of undirected graph $G=(V,E)$, which $|V|=n>2$. For convenience, label the vertices with $v_1,v_2,\dots ,v_n\in V$, and $(v_i,v_j)\in E$ means there is a edge between ...
0
votes
0answers
59 views

Tight bound of Turan number for K_{1,t,t}?

I'm looking for a tight bound for Turan number $ex_2(n,K_{1,t,t})$, where $K_{1,t,t}$ is the complete 3-partite graph with parts of size 1, t, and t. The motivation is that we now $ex_2(n,K_{t,t})=O(n^...
0
votes
0answers
36 views

Question about number of faces for regular graphs

I came upon the following problem. Consider a regular 3-graph with faces of degree $2, 3, 4, 5$, 4-graph and faces of degree $2, 3$ and 5-graph with faces of degree $2, 3$. Are there any such graphs ...
3
votes
1answer
96 views

Menger's Theorem for planar triangulations

I was reading the paper "Planar separators" by Alon, Seymour and Thomas (available on the first author's webpage). They consider a planar triangulation, that is, a maximally planar graph $G$ drawn in ...
4
votes
1answer
83 views

The minimum number of Hamiltonian paths in a strongly connected tournament of order $n$

For $n\ge3$ let $a(n)$ be the minimum number of Hamiltonian paths in a strong (i.e., strongly connected) tournament of order $n.$ Where is $a(n)$ discussed in the literature? Is the exact value ...