On the distribution of positive and negative values of Hardy's Z-function

Abstract

We investigate the distribution of positive and negative values of Hardy's function Z(t) := ζ(1/2+it)(1/2+it)-1/2, ζ(s) = (s)ζ(1-s). In particular we prove that μ(I+(T,T)) \; T\; and μ(I-(T, T)) \; \; T, where μ(·) denotes the Lebesgue measure and align* I+(T,H) &\;=\; \T< t T+H\,:\, Z(t)>0\, I-(T,H) &\;=\; \T< t T+H\,:\, Z(t)<0\. align*