Sparse Distribution of Coefficients of -fold Product L-functions at Integers Represented by Quadratic Forms

Abstract

Let f ∈ Sk(0(N)) be a normalized Hecke eigenform. We study the Fourier coefficients λf ·s f(n) of the -fold product L-function for odd 3. Our focus is the distribution of this sequence over the sparse set of integers represented by a primitive, positive-definite binary quadratic form Q of a fixed discriminant D. We establish an explicit upper bound for the summatory function of these coefficients, with dependencies on the weight, level, and discriminant. As a key application, we provide a bound for the first sign change of the sequence in this setting. We also generalize this result to find the first sign change among integers represented by any of the h(D) forms of discriminant D, showing the bound improves as the class number increases.