Questions tagged [hypergraph]
Hypergraphs are generalizations of graphs, where edges can be made of more than two vertices.
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questions
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On a connectivity property of set systems
Let $X\neq \emptyset$ be a set and let ${\cal A}\subseteq {\cal P}(X)$ with $\bigcup {\cal A}=X$. We say that $S\subseteq X$ is indivisible if for all $T\subseteq S$ with $\emptyset \neq T \neq S$ ...
4
votes
1answer
111 views
Coloring the uncountable Lebesgue-measurable sets of $\mathbb{R}$
A hypergraph $H=(V,E)$ consists of a set $V$ and $E\subseteq {\mathcal P}(V)$, that is, $E$ consists of subsets of $V$ of arbitrary size. Obviously, a graph is a special kind of hypergraph.
Let $H=(V,...
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2answers
628 views
n sets, each is large, the intersection of every three is small, what is the size of the union?
Let $A_1, A_2, \ldots, A_n$ be $n$ sets such that:
(1) for each $i\in [n]$, $\frac{n}{3}\leq |A_i|\leq n$;
(2) for any $1\leq i<j<k\leq n$, $|A_i\cap A_j\cap A_k|\leq a$, where $a$ is a constant ...
3
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0answers
80 views
When is it possible to extend several linear orders defined “locally” into a single linear order defined “globally”?
This is a somewhat fuzzy question, so I will try my best to give a formulation which includes everything relevant while excluding everything else. I would like to find out if anyone else has studied ...
7
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1answer
374 views
Strategies for bounding the spectral norm of a tensor?
Let $A$ be a symmetric $k$-tensor over a real or complex vector field $W$. We may define its spectral norm $|A|$ by
$$|A| = \sup_{v\in W} \frac{|\langle A,x^{\otimes k}\rangle|}{|x|_2^k}.$$
(...
3
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0answers
102 views
Spectral norm and “operator norm” for hypergraphs
Consider a $d$-regular, $k$-uniform hypergraph: the elements $S$ of its set $E$ of edges are subsets of $V$ of size $k$, and each vertex $v\in V$ is in $d$ edges. We can then define its adjacency ...
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45 views
Does an $(x, bx)$-biregular graph always contain a $x$-regular bipartite subgraph?
I guess a discrete-mathematics-related question is still welcome in MO since I was new to the community and learned from this amazing past post. The following claim is a simplified and abstract form ...
4
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1answer
158 views
Seven Bridges of Königsberg for hypergraphs
I am teaching a course involving hypergraphs. I would like to have a physical analogy/motivating problem for hypergraphs similarly to how the Seven Bridges of Königsberg motivate graphs. Can you help ...
3
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1answer
163 views
Chromatic number of maximal linear $k$-regular hypergraphs on $\omega$
For any integer $k>1$ we say a hypergraph $H=(\omega,E)$ where $E\subseteq {\cal P}(\omega)$ is $k$-regular if $|e|=k$ for all $e\in E$. Moreover, we say $H$ is linear if $|e_1\cap e_2|\leq 1$ for ...
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1answer
83 views
Fano-like planes on $\omega$
We call $E\subseteq {\cal P}(\omega)$ a Fano-like plane if
for all $x,y\in \omega$ there is $e\in E$ with $\{x,y\}\subseteq e$,
whenever $e_1\neq e_2\in E$ we have $|e_1\cap e_2|=1$, and
$|e|>1$ ...
7
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1answer
100 views
Tameable hypergraphs
Let $H=(V,E)$ be a hypergraph. We say that $I\subseteq V$ is an independent set if $e\not\subseteq I$ for all $e\in E$.
We say that $H$ is tameable if every independent set is contained in a maximal ...
2
votes
1answer
117 views
Chromatic number of rainbow hypergraphs
Let $H=(V,E)$ be a hypergraph, and $\kappa$ be a cardinal. We say that a map $c:V \to \kappa$ is a coloring if the restriction $c\restriction_e$ is non-constant whenever $e\in E$ and $|e|\geq 2$. The ...
1
vote
1answer
78 views
Minimizing the set of monochromatic edges
For sets $A, B$ we write $B^A$ for the set of all functions $f:A\to B$.
Let $H = (V,E)$ be a hypergraph such that $V,E\neq\varnothing$ and $|e| \geq 2$ for all $e\in E$. Let $\kappa>1$ be a ...
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0answers
75 views
What is known about chromatic polynomial of hypergraph at $-1$
Let $H$ be a hypergraph and let $P_H$ denote its chromatic polynomial. I am interested in the best results interpreting $P_H(-1)$. I am interested both in the general case (which I think is hard) as ...
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0answers
139 views
The list reaping number?
My question is inspired by a question of Dominic van der Zypen. Let $[\omega]^\omega$ denote the set of all infinite subsets of $\omega$.
The reaping number, denoted by $\mathfrak r$, is the minimum ...
3
votes
1answer
159 views
A sequence of cardinal characteristics constructed with hypergraph coloring
Let $[\omega]^\omega$ denote the collection of infinite subsets of $\omega$.
A hypergraph $H=(V,E)$ consists of a set $V$ and a collection of subsets $E \subseteq {\cal P}(V)$. A coloring is a map $c: ...
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0answers
56 views
Generalization of Moore graphs — not geometries
I was thinking about the following problem: Suppose you have a $k$-uniform hyper graph (simplicial complex of dimension $k$) with a complete $(k-1)$-skeleton, and some form of regularity (e.g. every ...
5
votes
2answers
212 views
Triangle coloring in random graph
Given $m$ persons (men and women) and $n$ balls, each person randomly selects $3$ balls. Once all of them complete the selection process, we color the balls with $2$ colors, white and black, such that ...
3
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1answer
70 views
Injective choice function for finite Fano planes
Let $H=(V,E)$ be a hypergraph that is a finite Fano plane, that is, $V$ is a finite set and $E$ has the following properties:
for $e_1\neq e_2\in E$ we have $|e_1|=|e_2|$, as well as $|e_1\cap e_2|=1$...
2
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1answer
228 views
VC dimension of vector spaces
Does the collection of all subspaces of a fixed finite-dimensional vector space have bounded VC dimension?
Could someone please provide references for this question?
3
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2answers
153 views
Relationship between minimum vertex cover and matching width
Let $H$ be a 3-partite 3-uniform hypergraph with minimum vertex cover number $\tau(H)$ (i.e. $\tau(H)=\min\{|Q|: Q\subseteq V(H), e\cap Q\neq \emptyset \text{ for all } e\in E(H)\}$).
Question: Is $\...
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1answer
104 views
Can every number be realised as the chromatic number of a countable hypergraph?
If $H=(V,E)$ is a hypergraph and $\kappa$ is a cardinal,we say a map $c:V\to\kappa$ is a coloring if the restriction $c\restriction_e$ of $c$ to $e$ is non-constant whenever $e\in E$ and $|e|>1$. ...
6
votes
1answer
262 views
Singular cardinal $\kappa$ with projective plane such that all edges have cardinality $<\kappa$
Is there an infinite singular cardinal $\kappa$ such that there is a set $E\subseteq{\cal P}(\kappa)$ with the following properties?
$|e| < \kappa$ for all $e\in E$,
whenever $\alpha\neq\beta\in \...
0
votes
1answer
40 views
Non-pencil infinite projective plane with edges of different cardinalities
A projective plane is a hypergraph $H=(V,E)$ such that
if $e_1\neq e_2 \in E$ then $|e_1\cap e_2| = 1$, and
for $v,w\in V$ there is $e\in E$ such that $\{v,w\}\subseteq e$.
Is there a projective ...
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59 views
$1$-factorizability for linear hypergraphs with infinite edges on $\omega$
Let $H=(V,E)$ be a hypergraph. We say that $M\subseteq E$ is a matching if the members of $M$ are pairwise disjoint, and $M$ is said to be perfect if $\bigcup M = E$. Moreover, $H$ is $1$-factorizable ...
2
votes
1answer
83 views
making a random uniform hypergraph linear
Let $\mathcal{H}_{n,p,h}=(V,E)$ be a random $h$-uniform hypergraph on $[n]$, sampled according to the usual binomial distribution. We known that with high probability, the number of edges in $\mathcal{...
3
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1answer
42 views
$1$-factorizability for “complete” finite hypergraphs
Let $H=(V,E)$ be a hypergraph such that $V\neq \varnothing$ and $\varnothing \notin E$. A matching is a subset $M\subseteq E$ such that $m_1\neq m_2 \in M$ implies $m_1\cap m_2 = \varnothing$, and $M$ ...
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0answers
43 views
Birkhoff's theorem for hypergraphs
Birkhoff's theorem says that, in a bipartite graph $G$ in which both sides have size $n$, any fractional matching of size $n$ can be presented as a convex combination of integral matchings of size $n$ ...
3
votes
1answer
68 views
Hyper-degree sequences: How to count them and how to construct hyper-graphs from them?
From an answer to this question I have learned how to ask this question properly.
Consider a $k$-uniform hypergraph on $n$ nodes, i.e. a family of $k$-subsets of $[n]= \{1,2,\dots,n\}$ (the hyperedges)...
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1answer
264 views
Does every maximal almost disjoint family have the same chromatic number?
If $H=(V,E)$ is a hypergraph such that $V\neq\varnothing\neq E$ and $|e| > 1$ for all $e\in E$, and $\kappa\neq\varnothing$ is a cardinal, we say that a map $c:V\to\kappa$ is a coloring if the ...
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0answers
80 views
What characterizes the incidence matrix of a tripartite hypergraph?
The incidence matrix of a graph $G = (V,E)$ is a matrix with $|V|$ rows and $|E|$ columns, in which element $v,e$ is $1$ if node $v$ is incident to edge $e$, and $0$ otherwise.
In bipartite graphs, ...
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0answers
30 views
Forbidden structures for generalized hypertree width
Generalized hypertree width is a tree-width-like parameter for hypergraphs, which plays an important role in the study of constraint satisfaction problems and related areas. For its more well-known ...
3
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1answer
106 views
Weisfeiler-Lehman test for hypergraphs
The Weisfeiler-Lehman test for graph isomorphism is based on iterative graph recoloring and works for almost all graphs, in the probabilistic sense. If we extend the domain to general hypergraphs, ...
2
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1answer
97 views
Isomorphic hypergraphs of dense sets of Hausdorff spaces
If $H_i = (V_i, E_i)$ are hypergraphs for $i = 1,2$ , we say that they are isomorphic if there is a bijection $f:V_1 \to V_2$ such that for all $e\subseteq V_1$ we have $e\in E_1$ if and only if $f(e)\...
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0answers
92 views
Perfect matching in hypergraphs: tripartite, regular and unbalanced
In a balanced bipartite graph - where both sides have the same size - a sufficient condition for the existence of a perfect matching is that the graph is regular - all vertices have the same degree.
...
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0answers
57 views
From fractional matching to integral matching in tripartite hypergraphs
Let $G = (X\cup Y, E)$ by a bipartite graph with $n = |X|\leq |Y|$.
A fractional matching is a function assigning a non-negative weight to every edge in $E$, such that the sum of weights near each ...
0
votes
1answer
49 views
Maximum number of edges in “square” hypergraph
For any set $X$ and any cardinal $\kappa$, let $[X]^\kappa$ denote the subsets of $X$ having cardinality $\kappa$.
A linear hypergraph is a hypergraph such that for all $e\neq e_1 \in E$ we have $|e\...
1
vote
2answers
195 views
What is a bipartite hypergraph?
Bipartite graphs are very useful, and I am looking for a generalization of this concept to hypergraphs. I found two different definitions of bipartite hypergraphs:
In the Wikipedia page Hypergraph, a ...
4
votes
1answer
104 views
Chromatic number of regular linear hypergraphs on $\omega$
For any cardinal $\alpha \in \omega\cup \{\omega\}$, let $[\omega]^\alpha$ denote the collection of subsets of $\omega$ having cardinality $\alpha$.
A linear hypergraph $H=(V,E)$ is a hypergraph such ...
0
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1answer
76 views
Maximum-weight perfect matching in a 3-regular, complete, 3-partite hypergraph
Let $H=(V, E)$ be a weighted hypergraph such that $V=A\cup B \cup C$, where $A,B,C$ are disjoint sets of size $n$, and $E=A\times B\times C$. In my particular case, $\forall e\in E$, $ wt(e)\in\{0,\pm ...
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0answers
49 views
Hypergraph coloring in linear hypergraphs
Let $H=(V,E)$ be a hypergraph with $V\neq\varnothing$ and $E \neq \varnothing$ such that
for all $e\in E$ we have $|e|\geq 2$, and
for all $e\neq e_1 \in E$ we have $|e\cap e_1|\leq 1$.
Is there a ...
1
vote
1answer
33 views
Chromatic self-maps on finite complete linear hypergraphs
Let $X\neq\varnothing$ be a set and let ${\cal E}\subseteq {\cal P}(X)\setminus\{\varnothing\}$ be a collection of non-empty subset. We say that a map $f: {\cal E}\to X$ is a chromatic self-map if
$f(...
2
votes
1answer
104 views
Intersecting subsets of $\{1,\ldots,n\}$
Is there $n\in\mathbb{N}$ and a collection ${\cal C}$ of subsets of $\{1,\ldots,n\}$ with the following properties?
$|{\cal C}| = n$,
$|c| > 1$ for all $c\in {\cal C}$,
$c\neq d \in {\cal C} \...
3
votes
2answers
135 views
Are complete regular linear hypergraphs on $\omega$ isomorphic?
If $H_i = (V_i, E_i)$ are hypergraphs for $i=1,2$ then we say they are isomorphic if there is a bijection $f: V_1 \to V_2$ such that for $A \subseteq V_1$ we have $$A\in E_1 \text{ if and only if } f(...
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votes
1answer
79 views
Infinite complete linear hypergraphs with edges of different sizes
Is there an infinite cardinal $\kappa$ with a collection of subsets ${\cal E}$ of $\kappa$ with the following properties?
$\bigcup {\cal E} = \kappa$,
$e \neq f \in {\cal E}$ implies $|e \cap f|=1$
$|...
4
votes
1answer
267 views
Simple way to calculate the eigenvalues of a $2 \times 2 \times 2$ tensor
I am working with hypergraphs. The various matrices associated with hypergraphs are hypermatrix or tensors. I am interested in spectral aspects. In particular, I want to find all the eigenvalues ...
3
votes
0answers
49 views
Maximum partite subset of edges of a hypergraph
If $X\neq \varnothing$ is a set we say that ${\frak P} \subseteq {\cal P}(X)$ is a partition of $X$ if
$\bigcup{\frak P} = X$, and
$P\neq Q \in {\frak P} \implies P\cap Q = \varnothing$.
Let $H = (V,...
4
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0answers
150 views
Does $\mathbb{R}$ have a partite subbase?
If $X\neq \varnothing$ is a set we say that ${\frak P} \subseteq {\cal P}(X)$ is a partition of $X$ if
$\bigcup{\frak P} = X$, and
$P\neq Q \in {\frak P} \implies P\cap Q = \varnothing$.
Let $H = (V,...
4
votes
1answer
171 views
Turan numbers of r-partite hypergraphs
Let $H$ be a balanced $r$-partite $r$-uniform hypergraph with $nr$ vertices. (Each part of this hypergraph consists of $n$ vertices; every hyperedge has exactly one vertex in each part.) Denote a ...
2
votes
0answers
110 views
3-uniform hypergraphs and their circuit space
So, I'll break this post into two questions. Both concern 3-uniform hypergraphs. A 3-uniform hypergraph $H=(V,E)$ consists of a set of vertices $V$ and a set of edges $E$, where each edge $e\in E$ is ...
