Parity Decision Tree Complexity is Greater Than Granularity

Abstract

We prove a new lower bound on the parity decision tree complexity D(f) of a Boolean function f. Namely, granularity of the Boolean function f is the smallest k such that all Fourier coefficients of f are integer multiples of 1/2k. We show that D(f)≥ k+1. This lower bound is an improvement of lower bounds through the sparsity of f and through the degree of f over F2. Using our lower bound we determine the exact parity decision tree complexity of several important Boolean functions including majority and recursive majority. For majority the complexity is n - B(n)+1, where B(n) is the number of ones in the binary representation of n. For recursive majority the complexity is n+12. Finally, we provide an example of a function for which our lower bound is not tight. Our results imply new lower bound of n - B(n) on the multiplicative complexity of majority.