Approximating the Influence of a monotone Boolean function in O(n) query complexity

Abstract

The Total Influence ( Average Sensitivity) of a discrete function is one of its fundamental measures. We study the problem of approximating the total influence of a monotone Boolean function =1 f: \1\n \1\, f: n , which we denote by I[f]. We present a randomized algorithm that approximates the influence of such functions to within a multiplicative factor of (1 ) by performing O(n nI[f] (1/)) queries. % D: say something about technique? We also prove a lower bound of % (n/ nI[f]) (n n · I[f]) on the query complexity of any constant-factor approximation algorithm for this problem (which holds for I[f] = (1)), % and I[f] = O(n/ n)), hence showing that our algorithm is almost optimal in terms of its dependence on n. For general functions we give a lower bound of (nI[f]), which matches the complexity of a simple sampling algorithm.