The Power of Many Samples in Query Complexity

Abstract

The randomized query complexity R(f) of a boolean function f\0,1\n\0,1\ is famously characterized (via Yao's minimax) by the least number of queries needed to distinguish a distribution D0 over 0-inputs from a distribution D1 over 1-inputs, maximized over all pairs (D0,D1). We ask: Does this task become easier if we allow query access to infinitely many samples from either D0 or D1? We show the answer is no: There exists a hard pair (D0,D1) such that distinguishing D0∞ from D1∞ requires (R(f)) many queries. As an application, we show that for any composed function f g we have R(f g) ≥ (fbs(f)R(g)) where fbs denotes fractional block sensitivity.