English

Minimum k-critical bipartite graphs

Combinatorics 2021-09-06 v4 Data Structures and Algorithms Number Theory

Abstract

We study the problem of Minimum kk-Critical Bipartite Graph of order (n,m)(n,m) - MkkCBG-(n,m)(n,m): to find a bipartite G=(U,V;E)G=(U,V;E), with U=n|U|=n, V=m|V|=m, and n>m>1n>m>1, which is kk-critical bipartite, and the tuple (E,ΔU,ΔV)(|E|, \Delta_U, \Delta_V), where ΔU\Delta_U and ΔV\Delta_V denote the maximum degree in UU and VV, respectively, is lexicographically minimum over all such graphs. GG is kk-critical bipartite if deleting at most k=nmk=n-m vertices from UU creates GG' that has a complete matching, i.e., a matching of size mm. We show that, if m(nm+1)/nm(n-m+1)/n is an integer, then a solution of the MkkCBG-(n,m)(n,m) problem can be found among (a,b)(a,b)-regular bipartite graphs of order (n,m)(n,m), with a=m(nm+1)/na=m(n-m+1)/n, and b=nm+1b=n-m+1. If a=m1a=m-1, then all (a,b)(a,b)-regular bipartite graphs of order (n,m)(n,m) are kk-critical bipartite. For a<m1a<m-1, it is not the case. We characterize the values of nn, mm, aa, and bb that admit an (a,b)(a,b)-regular bipartite graph of order (n,m)(n,m), with b=nm+1b=n-m+1, and give a simple construction that creates such a kk-critical bipartite graph whenever possible. Our techniques are based on Hall's marriage theorem, elementary number theory, linear Diophantine equations, properties of integer functions and congruences, and equations involving them.

Keywords

Cite

@article{arxiv.1907.04844,
  title  = {Minimum k-critical bipartite graphs},
  author = {Sylwia Cichacz and Karol Suchan},
  journal= {arXiv preprint arXiv:1907.04844},
  year   = {2021}
}
R2 v1 2026-06-23T10:17:45.134Z