English

Ordered Biclique Partitions and Communication Complexity Problems

Computational Complexity 2013-12-30 v2 Discrete Mathematics Combinatorics

Abstract

An ordered biclique partition of the complete graph KnK_n on nn vertices is a collection of bicliques (i.e., complete bipartite graphs) such that (i) every edge of KnK_n is covered by at least one and at most two bicliques in the collection, and (ii) if an edge ee is covered by two bicliques then each endpoint of ee is in the first class in one of these bicliques and in the second class in other one. In this note, we give an explicit construction of such a collection of size n1/2+o(1)n^{1/2+o(1)}, which improves the O(n2/3)O(n^{2/3}) bound shown in the previous work [Disc. Appl. Math., 2014]. As the immediate consequences of this result, we show (i) a construction of n×nn \times n 0/1 matrices of rank n1/2+o(1)n^{1/2+o(1)} which have a fooling set of size nn, i.e., the gap between rank and fooling set size can be at least almost quadratic, and (ii) an improved lower bound (2o(1))logN(2-o(1)) \log N on the nondeterministic communication complexity of the clique vs. independent set problem, which matches the best known lower bound on the deterministic version of the problem shown by Kushilevitz, Linial and Ostrovsky [Combinatorica, 1999].

Keywords

Cite

@article{arxiv.1311.6192,
  title  = {Ordered Biclique Partitions and Communication Complexity Problems},
  author = {Manami Shigeta and Kazuyuki Amano},
  journal= {arXiv preprint arXiv:1311.6192},
  year   = {2013}
}

Comments

8 pages; the version submitted to a journal

R2 v1 2026-06-22T02:14:01.166Z