A composition theorem for randomized query complexity via max conflict complexity

Abstract

Let Rε(·) stand for the bounded-error randomized query complexity with error ε > 0. For any relation f ⊂eq \0,1\n × S and partial Boolean function g ⊂eq \0,1\m × \0,1\, we show that R1/3(f gn) ∈ (R4/9(f) · R1/3(g)), where f gn ⊂eq (\0,1\m)n × S is the composition of f and g. We give an example of a relation f and partial Boolean function g for which this lower bound is tight. We prove our composition theorem by introducing a new complexity measure, the max conflict complexity (g) of a partial Boolean function g. We show (g) ∈ (R1/3(g)) for any (partial) function g and R1/3(f gn) ∈ (R4/9(f) · (g)); these two bounds imply our composition result. We further show that (g) is always at least as large as the sabotage complexity of g, introduced by Ben-David and Kothari.