A Tsang-range high-moment bound for Im L(12+it,χ) under GRH

Abstract

Conditional on the Generalized Riemann Hypothesis for L(s,χ), we prove the Selberg--Tsang high-moment bound for Xχ(t) = Im L(12+it,χ) at fixed squarefree odd conductor q 3 and primitive non-principal character χ. Writing LT = (qT): for every K > 0 there exist constants CK and T0 such that 1T∫T2T |Xχ(t)|2k\,dt (CK\,k\,LT)k for all T T0 and every integer 1 k K LT. The proof ports Selberg's pointwise approximate formula for S(t) to L(s,χ) at fixed conductor under GRH, splits it into three prime-power Dirichlet polynomials, and evaluates their moments via Soundararajan's mean-value lemma. As a corollary, Markov's inequality yields a Gaussian-scale tail (-c V2 / LT) for LT V LT -- a GRH-conditional, fixed-conductor, imaginary-part analogue of the large-deviation upper bounds known for |ζ(12+it)|.