Questions tagged [bipartite-graphs]
A bipartite graph is a graph whose vertices can be divided into two disjoint sets such that no two vertices in the same set are adjacent.
97
questions
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votes
1answer
134 views
At most one perfect matching of a bipartite graph
I. Given biadjacency matrix $A$ of a bipartite graph on $2n$ vertices having $n$ vertices of either color on the constraints the graph either has
$0$ perfect matchings
$1$ perfect matchings
is it ...
6
votes
1answer
140 views
Can we construct a dessin of any genus with a cyclic automorphism group of any order?
We consider a dessin d'enfant $D$ as a bipartite graph $D$ on a complex oriented surface $S$, such that the complement $S \backslash D$ is homotopic to a collection of disks.
Definition: Let an ...
2
votes
0answers
28 views
Computing bipartite matching of size $k$?
Given a bipartite graph with $n$ vertices on each side and an integer $k$, how can we compute all bipartite matchings of size $k$?
The problem of computing all perfect matchings is #P-complete. But I ...
1
vote
0answers
67 views
Number of extremal $\{0,1\}$ matrices having permanent $1$ property
Is there a function which describes the number of $\{0,1\}^{n\times n}\cap\mathbb Z^{n\times n}$ matrices having permanent $1$?
I think it might be $\mathsf{poly}(n!)$ bounded.
Is there a function ...
1
vote
1answer
79 views
Unique bipartite perfect matchings and cycles?
Given a graph $G$ which is bipartite and balanced and has unique perfect matching let $G^{e}$ be $G$ without edge $e$. Let $G\cup G_{\pi,\pi'}$ be union of $G$ and $G_{\pi,\pi'}$ where $G_{\pi,\pi'}$ ...
0
votes
0answers
65 views
Is there a bipartite graph whose determinant corresponds to number of perfect matchings?
Let $M\in\{0,1\}^{n\times n}$ be a square integer matrix. If we consider $M$ as biadjacency of a balanced bipartite graph on $2n$ vertices having $n$ vertices of color $1$ and $n$ vertices of color $2$...
1
vote
0answers
94 views
A query on Galvin's theorem for bipartite graphs
The Galvin's theorem is the generalized version of Dinitz conjecture that states that if the maximum degree of any bipartite graph is $\Delta$, then its edges are colorable properly if each of its ...
2
votes
0answers
98 views
Two from cubic subgraph hardness
The Problem
For a given graph $G$, the cubic subgraph problem asks if there is a subgraph where every vertex has degree 3.
The cubic subgraph problem is NP-hard even in bipartite planar graphs with ...
2
votes
0answers
43 views
Counting the number of simple labelled bipartite graphs 𝐺𝑛,𝑚 with 𝑘 edges such that 𝑑1 vertices have degree 1
I have tried to count the number of simple labelled bipartite graphs $G_{n,m}$ with $k$ edges such that $d_1$ vertices have degree 1.
Has this problem been studied?
So far the only related paper I ...
5
votes
2answers
278 views
Conjecture about minimal number of edge crossings in complete bipartite graphs
I am interested in the status of the conjecture about the minimum number of edge crossings $cr(K_{m,n})$ in a drawing of the complete bipartite graph $K_{m,n}$.
The Wikipedia article https://en....
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2answers
210 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 ...
1
vote
0answers
24 views
Optimal preprocessing in the Kuhn-Munkres algorithm
The matrix formulation of the Kuhn-Munkres algorithm for solving the Linear Assignment Problem requires a preprocessing in which the minimal values of a line be subtracted from every value in that ...
5
votes
0answers
216 views
Probability that a random multigraph is simple
Question.
Consider a given sequence of $n$ integers $d_1$, $d_2$, $\cdots$, $d_n$ with $\sum_i d_i$ even and $d_i\le n$ for all $i$. One may sample a random multi-graph having this degree sequence ...
1
vote
2answers
90 views
One part of a bipartite graph has max degree 3. Partition the other part to 3 ~equal subsets s.t. just a fraction of first part see all 3 subsets
Let $d \gg 1$. Let $G:=(U, V, E)$ be some bipartite graph such that deg$(u) \le d$ for all $u\in U$ and deg$(v) \le 3$ for all $v \in V$.
Now, is it possible to color vertices in $U$ with 3 colors ...
4
votes
0answers
56 views
If all 2-faces of a polytope are $2n$-gons, is the edge-graph bipartite?
This question on MSE has not received a satisfying answer. It can be summarized as follows:
Question: Is is true that the edge-graph of a (convex) polytope is bipartite if and only if all 2-faces ...
2
votes
2answers
85 views
Number of subgraphs with matching of size $n$ for a complete bipartite graph
Say we have a $K_{n,n}$ bipartite graph (i.e. a complete bipartite graph with $n$ nodes on each side). We induce a subgraph by deleting some subset of edges. There are $2^{n^2}$ possible subgraphs. ...
1
vote
0answers
19 views
Hadwiger number in vertex collapse in a bipartite graph
If $G=(V,E)$ is a finite graph, let the Hadwiger number $\eta(G)$ equal the largest integer $n$ such that the complete graph $K_n$ is a minor of $G$.
Is there a bipartite graph $G$ on more than $3$ ...
2
votes
0answers
47 views
How many edges can be in an unbalanced bipartite graph of girth $>6$?
Let $G = (V, E)$ be a bipartite graph with $n, m$ nodes in its bipartition and girth (shortest cycle length) $>6$.
There is a simple counting argument called the Moore Bounds that gives
$$|E| = O\...
1
vote
0answers
42 views
Treewidth related properties of a bipartite graph with bounded local crossing number and diameter
If a bipartite degree at most $3$ graph on $O(n^2)$ vertices with diameter at most $O(\log n)$ has property that every edge intersects at most $O(\log n)$ edges on a planar drawing then does any of ...
3
votes
1answer
79 views
Partitioning vertex set to maximize weights of inter-class edges?
An interesting problem has come up in my work, and I haven't quite been able to find references to it so I thought I'd ask here.
Suppose we have some complete, weighted graph with vertex set $V$. Is ...
1
vote
1answer
73 views
Maximum number of perfect matchings in a graph of genus $g$ balanced $k$-partite graph
What is the maximum number of perfect matchings a genus $g$ balanced $k$-partite graph (number of vertices for each color in all possible $k$-colorings is within a difference of $1$) can have? I am ...
2
votes
0answers
64 views
Statistics of perfect matching and incremental perfect matchings in bipartite planar graphs?
Planar graph permanent can be reduced to determinants and so statistics should be amenable.
Pick a uniformly random bipartite planar graph $G$ with $n$ vertices of each color and choose new additional ...
3
votes
1answer
289 views
Minimum planar bipartite graph to cover all perfect matching count
Given set $\mathcal T_n=\{0,1,\dots,2^n-1\}$ what is the minimum number of vertices $2m$ needed in a planar bipartite balanced graph such that at every $i\in\mathcal T_n$ there is a graph $G\in\...
5
votes
0answers
80 views
+50
Volume interpretation of number of perfect matchings in bipartite planar graphs
Permanent of biadjacency of bipartite graphs is the number of perfect matchings. In the case of planar graphs we can obtain an orientation with sign changes and get away with computing the determinant ...
5
votes
1answer
178 views
“König's theorem” for $T_2$-spaces?
For any topological space $(X,\tau)$ we define a matching to be a collection of non-empty and pairwise disjoint open sets. We define the matching number $\nu(X,\tau)$ to be the smallest cardinal $\...
3
votes
0answers
86 views
Have partition functions of abstract simplicial complexes been examined?
Many complicated probability distributions arising in electrical engineering and machine learning have a simple expression as a sum of products that can also be encoded in a factor graph. The ...
1
vote
1answer
113 views
An variation of an assignment problem in combinatorics: assign items to customers
Suppose we want to assign $n$ items to $m$ customers ($n \geq m$). Each assignment of an item $i$ to a customer $j$ has an associated cost $c(i,j)$. Find an assignment that maximizes the total cost. ...
-1
votes
2answers
72 views
On a condition concerning the number of neighbors in bipartite graphs
For any undirected simple graph $G=(V,E)$ we define for $v\in V$ the set $N(v) = \{w\in V: \{v,w\}\in E\}$.
Suppose $A, B$ are finite, disjoint sets, and $G = (A\cup B, E)$ is a bipartite graph with ...
1
vote
0answers
129 views
Is the partition of bipartite graphs NP-hard?
I wonder if the following problem is NP-hard. Is it?
Given a bipartite graph $G = (U, V, E)$ with weights $w : E \to \mathbb{R}_+$, find a partition of $U$ into $U_1, U_2$ and nonempty disjoint ...
0
votes
1answer
101 views
Maximum partition of bipartite graph
Let $G = (U, V, E)$ be a bipartite graph. Let $w: E \to \mathbb{R}$ be a weight function on the edge set $E$. Given subsets $U_1,\ldots, U_k \subset U, U_i\cap U_j = \emptyset$ and a partition $V_1,\...
1
vote
1answer
440 views
Algorithm to find a $k$-partite graph
Is there any algorithm which finds any $k$-partite graph of a given graph which is known to be a $k$-partite graph?
For example, you are given a graph $G$ with vertices $V$ and edges $E$, and you ...
6
votes
0answers
189 views
Dowker and neighborhood complexes: reference wanted
Let $R$ be a 0-1 matrix whose rows or columns are maximal.
Q1. Is there a name for such a matrix (or, e.g., a corresponding relation)?
From 0-1 matrix corresponding to an abstract simplicial ...
4
votes
1answer
557 views
Combinatorial optimization problem for bipartite graphs
Let $G(V_1\cup V_2, E)$ be a simple bipartite graph having $n$ vertices and $m$ edges, such that $|V_1|=|V_2|$ (which implies that $n$ is an even number). Given any node $i \in V_1\cup V_2$, we denote ...
5
votes
3answers
197 views
How many $40$-vertex cubic bipartite graphs have determinant $\pm 3$?
To get some feel for the size of a particular computation, I would like to know the approximate number of (pairwise-nonisomorphic) cubic bipartite graphs on $40$ vertices whose bipartite adjacency ...
2
votes
1answer
132 views
Existence of bipartite subgraphs satisfying degree and edge cardinality constraints
How can we prove the following conjecture?
Given any simple unweighted bipartite graph $G(V_1, V_2, E)$, there always exists a subgraph $G'(V_1, V_2, E')$ of $G$ such that the two following ...
0
votes
1answer
73 views
Canonical form for a bipartite graph
I have a bipartite graph, including V1 and V2 vertices, and I would like to convert it to a canonical form. One simple method is converting this graph to a general graph by expanding its adjacency ...
1
vote
2answers
229 views
Hamiltonicity and minimal degree in bipartite graphs
Given an integer $k>1$, is there a connected bipartite graph $\Gamma = (A, B, E)$ where $A\cap B = \emptyset$ and $E \subseteq \big\{\{a, b\}:a\in A, b\in B\big\}$ such that
$|A| = |B|$,
$\text{...
1
vote
3answers
484 views
Hamiltonian paths in bipartite graphs with 2 sets of “almost” same cardinality
Suppose we have two finite disjoint sets $A, B \neq \emptyset$ such that $|A|$ and $|B|$ differ by at most $1$, and let $\Gamma = (A\cup B, E)$ where $E\subseteq \big\{\{a,b\}: a\in A, b\in B\big\}$ ...
7
votes
1answer
630 views
Graph to Bipartite conversion preserving number of perfect matchings
Given a graph $G$ on $n$ vertices is there a technique to convert to a balanced bipartite graph $B$ with $O(n^c)$ vertices at some fixed $0<c$ in $O(n^{c'})$ time at some fixed $0<c'$ such that ...
2
votes
0answers
159 views
Minimal size of the maximum biclique
We examine a bipartite graph with two sides $R$ and $L$, and denote by $|L|$ and $|R|$ the number of nodes in each side. We know only that each vertex on side $R$ is connected to $k$ vertices on side $...
3
votes
1answer
145 views
Minimal size of the maximal biclique
We examine a bipartite graph with two sides $R$ and $L$, and denote by $|L|$ and $|R|$ the number of nodes in each side. We know only that each node on side $R$ is connected to $k$ nodes on side $L$, ...
5
votes
0answers
67 views
Moving subsets of bipartite graph
I am dealing with a bipartite graph $G = (L\cup R, E)$. The left and right sets are both assumed to be regular with degrees $d_L$ and $d_R$. Assume $|L| > |R|$ and hence $d_L < d_R$.
Let $S \...
3
votes
1answer
134 views
Is bipartite graph genus bound by $O(\mbox{max deg})$?
We know that planar graphs have $O(1)$ degree.
We know balanced (each color has same number of vertices) complete bipartite graphs have genus $O(n^2)$.
If maximum and average degree are $O(n^\alpha)$ ...
6
votes
1answer
71 views
Looking for the name or reference regarding a bipartite graph parameter
I'm writing a paper about a math puzzle and the thing I'm studying ends up equivalent to finding the following parameter of a bipartite graph G with parts X and Y:
The largest $k$ such that any $k$ ...
3
votes
2answers
762 views
Applications of Hafnians
I am learning about Hafnians but I am struggling to find real-world applications of them. I understand the applications of determinants, permanents, and even pfaffians but I am at a loss for Hafnians. ...
1
vote
0answers
59 views
Cut norm and biclique gap?
Given real $\pm1$ matrix $M\in\Bbb R^{n\times m}$ we have that cut-norm is given by $$\|M\|_C=\max_{\mathcal I\subseteq[n],\mathcal J\subseteq[m]}\Big|\sum_{(i,j)\in\mathcal I\times\mathcal J}M_{ij}\...
4
votes
0answers
141 views
Maximality with respect to having no marriage
Let $A,B\neq \emptyset$ be disjoint and suppose $G = (A\cup B, E)$ is bipartite where for all $e\in E$ we have $e\cap A \neq \emptyset\neq e\cap B$. For $a\in A$ we set $N_G(a) = \{b\in B: (\exists e\...
-1
votes
1answer
318 views
Marriages in infinite bipartite graphs with many neighbors
Let $A,B\neq \emptyset$ be disjoint and suppose $G = (A\cup B, E)$ is bipartite where for all $e\in E$ we have $e\cap A \neq \emptyset\neq e\cap B$. For $a\in A$ we set $N_G(a) = \{b\in B: (\exists e\...
2
votes
1answer
89 views
Minimum number of edges to add in order to have a biclique cover
Given a bipartite graph G and a number N, what's the minimum number of edges I have to add to G in order to be able to cover the resulting graph with no more than N complete bipartite subgraphs?
For ...
1
vote
2answers
886 views
Rank adjacency matrix bipartite graph
I am interested to know what kind of characterizations are known of the rank of bipartite graphs $G(n,m)$ ($n$ vertices on one side, $m$ on the other, $n \leq m$).
When is the incidence matrix full ...
