Shifted convolution sums of coefficients of symmetric power L-functions with k-full kernels over sums of squares in arithmetic progressions

Abstract

Let q be an integer and let f be a normalised Hecke eigenform of integral weight for the full modular group. Let L(s,symj f) denote the j-th symmetric power L-function associated to f, and let λsymj f(n) denote its n-th coefficient. We study the behaviour of the partial sum of λsymj f(n), and of its second moment, taken over those sums of m squares that are congruent to 1 modulo q. As an application, we investigate the shifted convolution sum of λsymj f(n) against a k-full kernel function, for any k ≥ 2. We also study the number of sign changes of λsymj f(n) twisted with a k-full kernel function, again over sums of m squares. Throughout, m is even with m ∈ \2,4,6,8,10,12\.