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Results tagged with graph-theory
Search options questions only
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user 9025
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, topological-graph-theory, random-graphs, graph-colorings and several others.
8
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0
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Hamiltonian paths in the prime sum graph
The following is a generalization of this old question .
Let $n\ge 2$, $[n]=\{1,\ldots,n\}$. For which distinct $a,b\in[n]$ is it possible to list $[n]$ in some order $x_1,\ldots,x_n$ such that $x_1=a …
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5
votes
1
answer
118
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Existence of regular factors in dense graphs
All graphs here are finite and simple.
A $d$-factor of a graph is a spanning regular subgraph of degree $d$.
Where can I find theorems of this nature, for constants $a,b,c\gt 0$: If $G$ is a graph w …
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6
votes
2
answers
431
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Measurable maximal independent set in infinite graph of bounded degree
We have a graph $G$. The vertices of $G$ are a measurable subset of $\mathbb{R}^n$ for some $n$. The degree of each vertex is bounded by some absolute finite constant $K$.
Q1. Does $G$ have a maxim …
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5
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1
answer
206
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A simple requirement for a degree sequence to be graphical
The following theorem about the degree sequences of finite simple graphs is quite easy to prove from the Erdos-Gallai theorem.
Let $0 \lt \alpha \le \beta \lt n$ be integers. Call $(\alpha,\beta,n …
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6
votes
0
answers
69
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Digraph weak connectivity in $O(V)$ space and $O(V+E)$ time
A digraph is called weakly connected if its underlying undirected graph is connected.
You are given a digraph $G$ with $V$ vertices and $E$ edges as a read-only data structure consisting of lists of …
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2
votes
0
answers
92
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Counting labelled graphs according to sets of size 3
In this question we are counting labelled simple graphs. No concept of isomorphism is involved.
Let $G(n,e,t)$ be the number of labelled simple graphs with $n$ vertices, $e$ edges, and $t$ sets of th …
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3
votes
0
answers
98
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Reconstructing a function from its variants that negate one argument
Call two functions $g(x_1,\ldots,x_n)$ and $h(x_1,\ldots,x_n)$ from complex numbers to complex numbers equivalent if they are the same up to the order of their arguments. Formally: there is a permuta …
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11
votes
0
answers
309
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How many n/2-cycles can a cubic graph have
Given a simple cubic graph with $n$ vertices (which implies that $n$ is even), what is a good upper bound on the number of cycles of length $n/2$ it can have?
A random cubic graph has $\Theta((4/3)^n …
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17
votes
0
answers
505
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Maximum automorphism group for a 3-connected cubic graph
The following arose as a side issue in a project on graph reconstruction.
Problem: Let $a(n)$ be the greatest order of the automorphism group of a 3-connected cubic graph with $n$ vertices. Find a g …
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7
votes
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181
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How quickly can we test if a graph is distance-regular?
A (simple, finite, connected) graph $G$ is distance regular if there exist integers $b_i,c_i,i=0,...,D$ such that for any two vertices $x,y$ in $G$ and distance $i=d(x,y)$, there are exactly $c_i$ nei …
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8
votes
2
answers
1k
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Spanning trees of plane graphs containing an edge of every face
I feel sure this must be known, but can I find it??
Which connected plane graphs (graphs drawn in the plane without crossings) have a spanning tree such that at least one edge of each face is in the …
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10
votes
1
answer
581
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Maximal subgroups of a certain finite 2-group
The following came up in a problem on reconstruction of digraphs. I determined enough about the answer to satisfy the application completely, but still I am curious to know what the complete solution …
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8
votes
1
answer
728
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6-regular bipartite graphs with no 8-cycles
I'm looking for simple 6-regular bipartite graphs with no 8-cycles, as small as possible. It doesn't matter if there are 4-cycles or 6-cycles, provided there are no 8-cycles. Such graphs must exist …
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22
votes
2
answers
2k
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Largest graphs of girth at least 6
Let $e_6(n)$ be the greatest number of edges in a simple graph with $n$ vertices and girth at least 6.
Let $G_6(n)$ be the set of simple graphs of order $n$ with girth at least 6 and $e_6(n)$ edges.
…
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10
votes
1
answer
410
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Network flows with capacities on pairs of edges
Take a standard network flow problem: a directed graph with nonnegative capacities on each edge, a source $s$, a sink $t$. We all know how to find the maximum flow from $s$ to $t$.
Now add edge-pair …
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