Lifting for Arbitrary Gadgets
Abstract
We prove a sensitivity-to-communication lifting theorem for arbitrary gadgets. Given functions f: \0,1\n \0,1\ and g : X× Y \0,1\, denote f g(x,y) := f(g(x1,y1),…,g(xn,yn)). We show that for any f with sensitivity s and any g, \[D(f g) ≥ s· ((D(g))rk(g) - rk(g)),\] where D(·) denotes the deterministic communication complexity and rk(g) is the rank of the matrix associated with g. As a corollary, we get that if D(g) is a sufficiently large constant, D(f g) = (\s,d\· D(g)), where s and d denote the sensitivity and degree of f. In particular, computing the OR of n copies of g requires (n·D(g)) bits.
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