The Möbius Function, Variations Ranks, and Theta(n)--Bounds on the Modular Communication Complexity of the Undirected Graph Connectivity Problem

Christoph Meinel; Stephan Waack

Electronic Colloquium on Computational Complexity

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Paper:

TR94-022 | 12th December 1994 00:00

The Möbius Function, Variations Ranks, and Theta(n)--Bounds on the Modular Communication Complexity of the Undirected Graph Connectivity Problem

TR94-022 Authors: Christoph Meinel, Stephan Waack
Publication: 12th December 1994 00:00
Downloads: 2280

Keywords:

communication protocols, Computational Complexity, Modular Acception Modes, Undirected Graph Connectivity

Abstract:

We prove that the modular communication complexity of the
undirected graph connectivity problem UCONN equals Theta(n),
in contrast to the well-known Theta(n*log n) bound in the
deterministic case, and to the Omega(n*loglog n) lower bound
in the nondeterministic case, recently proved by Raz and Spieker.
We obtain our result by combining M"obius function techniques
due to Lovasz and Saxe with rank and projection reduction arguments.

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