Lipschitz bijections between boolean functions

Abstract

We answer four questions from a recent paper of Rao and Shinkar on Lipschitz bijections between functions from \0,1\n to \0,1\. (1) We show that there is no O(1)-bi-Lipschitz bijection from Dictator to XOR such that each output bit depends on O(1) input bits. (2) We give a construction for a mapping from XOR to Majority which has average stretch O(n), matching a previously known lower bound. (3) We give a 3-Lipschitz embedding φ : \0,1\n \0,1\2n+1 such that XOR(x) = Majority(φ(x)) for all x ∈ \0,1\n. (4) We show that with high probability there is a O(1)-bi-Lipschitz mapping from Dictator to a uniformly random balanced function.