New upper bound on block sensitivity and certificate complexity in terms of sensitivity

Abstract

Sensitivity CD82,CDR86 and block sensitivity Nisan91 are two important complexity measures of Boolean functions. A longstanding open problem in decision tree complexity, the "Sensitivity versus Block Sensitivity" question, proposed by Nisan and Szegedy Nisan94 in 1992, is whether these two complexity measures are polynomially related, i.e., whether bs(f)=O(s(f)O(1)). We prove an new upper bound on block sensitivity in terms of sensitivity: bs(f) ≤ 2s(f)-1 s(f). Previously, the best upper bound on block sensitivity was bs(f) ≤ (e2π) es(f) s(f) by Kenyon and Kutin KK. We also prove that if \s0(f),s1(f)\ is a constant, then sensitivity and block sensitivity are linearly related, i.e. bs(f)=O(s(f)).