An XOR Lemma for Deterministic Communication Complexity
Abstract
We prove a lower bound on the communication complexity of computing the n-fold xor of an arbitrary function f, in terms of the communication complexity and rank of f. We prove that D(f n) ≥ n · ((D(f)) rk(f) - rk(f) ), where here D(f), D(f n) represent the deterministic communication complexity, and rk(f) is the rank of f. Our methods involve a new way to use information theory to reason about deterministic communication complexity.
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