Monte Carlo to Las Vegas for Recursively Composed Functions

Abstract

For a (possibly partial) Boolean function f\0,1\n\0,1\ as well as a query complexity measure M which maps Boolean functions to real numbers, define the composition limit of M on f by M*(f)=k∞ M(fk)1/k. We study the composition limits of general measures in query complexity. We show this limit converges under reasonable assumptions about the measure. We then give a surprising result regarding the composition limit of randomized query complexity: we show R0*(f)=\R*(f),C*(f)\. Among other things, this implies that any bounded-error randomized algorithm for recursive 3-majority can be turned into a zero-error randomized algorithm for the same task. Our result extends also to quantum algorithms: on recursively composed functions, a bounded-error quantum algorithm can be converted into a quantum algorithm that finds a certificate with high probability. Along the way, we prove various combinatorial properties of measures and composition limits.