Low pseudomoments of the Riemann zeta function and its powers

Abstract

The 2 q-th pseudomoment 2q,α(x) of the α-th power of the Riemann zeta function is defined to be the 2 q-th moment of the partial sum up to x of ζα on the critical line. Using probabilistic methods of Harper, we prove upper and lower bounds for these pseudomoments when q 12 and α 1. Combined with results of Bondarenko, Heap and Seip, these bounds determine the size of all pseudomoments with q > 0 and α 1 up to powers of x, where x is the length of the partial sum, and it turns out that there are three different ranges with different growth behaviours. In particular, the results give the order of magnitude of 2 q, 1(x) for all q > 0.