# Tagged Questions

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69 views

### Missing count in number of perfect matchings

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 $\...

**4**

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**1**answer

76 views

### Degree of neighbors in a simple graph (friendship paradox variant)

Context: this question is a translation of a common informal phrasing of the friendship paradox ("Most people have fewer friends than most of their friends"). Note that the question is similar to, but ...

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**1**answer

73 views

### Choosing directed subgraph in a triangulation

Consider triangulation $T.$
Is it always possible to choose such a subgraph $H$ of $T$ that has a common edge with every face of $T$ and can be directed in such way that indegrees of all vertices of ...

**3**

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**1**answer

62 views

### Maximal acyclic subgraph

It is well known that the problem of finding a maximal acyclic subgraph of a digraph is NP-complete.
Is this the case also when the digraph is symmetric ,i.e. if $(a,b)$ is a link, then $(b,a)$ is ...

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**0**answers

50 views

### Universal path function for all small trees

Let $f$ be a function $f: [k]^2 \rightarrow [k]$ (Where $[k]$ is the set $
\{0,1,\dots,k-1\}$).
A function $f$ is called $n$-universal path function if for every tree $T$ with $n$ vertices there ...

**0**

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**3**answers

101 views

### How to do a clockwise ordering of a planar graph in order to define its faces?

I am currently making an algorithm for planar graphs that I need to triangulate so they become maximally planar (that is triangulated and planar) given only the lists of neighbors for each node : no ...

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133 views

### Characterizing graphs whose Incidence Matrix has the all ones vector in its row span

Suppose we have a simple connected graph $G=(V,E)$. Then let $A$ be its $|E|\times |V|$ incidence matrix. Here I am considering the unoriented incidence matrix. I want to known when the row span of $A$...

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32 views

### how to study the size of basins of attraction on a graph

I have a certain finite (but huge and without an apparent pattern, so that only numerical studies seem feasible) graph $G = (V,E)$, and a function $f: V \rightarrow \mathbb{R}$. On each edge $e = (u,v)...

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57 views

### bounded degree graph colouring.

I was wondering if anyone could provide references on the following:
Is determining the chromatic number of a bounded degree graph APX-complete?
2.I've seen the result that states it is NP-hard ...

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48 views

### Hypergraph edge colouring

I'm interested in knowing if finding the edge-chromatic number of a $k$-uniform $k$-partite hypergraph is NP-hard for $k\geq 3$ Could anyone provide a reference for the result? By edge-chromatic ...

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81 views

### Choice number of embedded graphs

For given $g$, consider the family of graphs which may be embedded to the compact orientable surface of genus $g$. For this family, consider maximal clique $\alpha(g)$, maximal chromatic number $\chi(...

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67 views

### Connected homogeneous graphs [closed]

Let's call a simple, undirected graph $G=(V,E)$ homogeneous if for every $v,w\in V$ there is a graph isomorphism $\varphi:G\to G$ such that $\varphi(v)=w$.
It is clear that every finite homogeneous ...

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**1**answer

175 views

### A spectral graph theory problem

Let $S$ be a zero-free subset of the group ${\bf Z}_2^n$ and $\Gamma={\rm Cay}({\bf Z}_2^n,S)$ be a bipartite Cayley graph. For some choices of $S$, the graph $\Gamma$ has $4$ distinct eigenvalues, ...

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59 views

### Reference for Turan Density

I am working a 3-graph problem. I convert it to calculate Turan density, that is $lim_{n\to \infty}\frac{ex_3(n,F)}{\binom{n}{3}}$, where F is a3-graph. I'd like to know are there some methods and ...

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97 views

### Behaviour of eigenspaces of adjacency matrices after a single change to the graph

Say I know the eigenvalues and eigenvectors of an adjacency matrix of an unweighted graph. Can I say anything about the eigenvalues and eigenvectors of an adjacency matrix of a graph with one extra ...

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51 views

### Hamiltonian path in countable connected graph such that $\text{deg}(v)=\omega$ for all $v$ [closed]

Is there a countable connected graph $G=(\omega, E)$ such that $\text{deg}(v)=\omega$ for all $v\in\omega$, but there is no Hamiltonian path in $G$?

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572 views

### Which paths in a graph are orthogonal to all cycles?

Start with some standard stuff. Suppose we have a directed graph $\Gamma$. I'll write $e : v \to w \,$ when $e$ is an edge going from the vertex $v$ to the vertex $w$. We get a vector space of 0-...

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108 views

### What is the densest bipartite graph with unique Hamiltonian cycle?

In a prior post regarding perfect matching, it was stated that the densest graph with a unique perfect matching cannot have more than $n^2$ edges, if graph has $2n$ vertices.
Analogously, what is the ...

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**1**answer

133 views

### Number of eigenvalues of a Cayley graph

Let $G=Z_2^n$ and $S\subset G$. Is there any relation for number of distinct eigenvalues of $\Gamma=Cayley(G,S)$ graph depending on $n$ and $|S|$, or at least diameter of $\Gamma$? If you have any ...

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132 views

### Alternative parallel paths

There are $n$ non-intersecting strings (with ends $x_1,\dots, x_n$ and $y_1,\dots, y_n$). An additional string intersects the first $n$ strings somehow. All the intersections are simple (vertices of ...

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**1**answer

103 views

### Size of connected components of a graph via its spectrum

I know that we can determine the number of connected components of a graph from the eigenvalues of its Laplacian matrix. My question is:
Is there a way to understand the size of each connected ...

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votes

**1**answer

285 views

### Choosing two-colorable subgraph in a triangulation

Consider a planar graph $G$ which is a triangulation.
Is it possible to find a two-colorable subgraph $H$ of $G$ which has a common edge with every face of $G$?
It is known that it is not always ...

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**2**answers

90 views

### Shortest path in a weighted graph with coloured edges

I have a weighted undirected graph with $N$ veritces and $M$ edges with 10 different colours in the whole graph. Each time I pass edges of different colour I have to pay additional fee equal to $K$. ...

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102 views

### Which graphs embedded in surfaces have symmetries acting transitively on vertex-edge flags?

A vertex-edge flag in a graph is a vertex together with an edge incident to that vertex. Given a graph $\Gamma$ embedded in a compact oriented surface $S$, when does the group of homeomorphisms of $S$...

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189 views

### Self-containing trees

Suppose that $r^2-r-1=0$ and that $T$ is the tree with root $1$ such that the children of each node $x$ are $rx$ and $x+1$. Remove all duplicates as they occur, and let $T(r)$ denote the remaining ...

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85 views

### Maximum number of $4$-cycles

Suppose we have a balanced bipartite planar maximum degree $k$ graph.
How many such graphs on $2n$ vertices have at most $f(n)$ maximum number of $4$ cycles for a given function $f:\Bbb R^+\...

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80 views

### Is there an efficient algorithm to find all the maximum matching in any tree?

A matching in a graph (G) is a set of mutually non-adjacent edges of (G). A maximum matching is a matching of maximal cardinality. A tree is an acyclic connected graph.
Is there an efficient ...

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79 views

### maximal sets of vertices that avoids a clique

I am looking for some known algorithm that finds, for a given graph, all the maximal sets of vertices that avoid a clique of some given size $k$. I'd prefer one written in MATLAB, but other languages ...

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111 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 '...

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106 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 ...

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**1**answer

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 $g=0$.

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190 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**

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**2**answers

187 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 ...

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29 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,\...

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**1**answer

92 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 ...

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22 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**

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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 ...

**1**

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**1**answer

56 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 ...

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251 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**

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**0**answers

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**

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**1**answer

55 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{...

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**1**answer

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**

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**1**answer

98 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 ...

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44 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**

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**0**answers

29 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) ...

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44 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 (...

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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 ...

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374 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 ...

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votes

**1**answer

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 ...

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**2**answers

130 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\...