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Nearly Complete Graphs Decomposable into Large Induced Matchings and their Applications

Published 1 Nov 2011 in math.CO, cs.DS, cs.IT, and math.IT | (1111.0253v2)

Abstract: We describe two constructions of (very) dense graphs which are edge disjoint unions of large {\em induced} matchings. The first construction exhibits graphs on $N$ vertices with ${N \choose 2}-o(N2)$ edges, which can be decomposed into pairwise disjoint induced matchings, each of size $N{1-o(1)}$. The second construction provides a covering of all edges of the complete graph $K_N$ by two graphs, each being the edge disjoint union of at most $N{2-\delta}$ induced matchings, where $\delta > 0.058$. This disproves (in a strong form) a conjecture of Meshulam, substantially improves a result of Birk, Linial and Meshulam on communicating over a shared channel, and (slightly) extends the analysis of H{\aa}stad and Wigderson of the graph test of Samorodnitsky and Trevisan for linearity. Additionally, our constructions settle a combinatorial question of Vempala regarding a candidate rounding scheme for the directed Steiner tree problem.

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