Polytopes with Bounded Integral Slack Matrices Have Sub-Exponential Extension Complexity
Abstract
We show that any bounded integral function f : A × B \0,1, …, \ with rank r has deterministic communication complexity O() · r · r, where the rank of f is defined to be the rank of the A × B matrix whose entries are the function values. As a corollary, we show that any n-dimensional polytope that admits a slack matrix with entries from \0,1,…,\ has extension complexity at most (O() · n · n).
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