Generalization on the higher moments of the Fourier coefficients of symmetric power L-functions

Abstract

For an even integer k≥ 2, let f be a primitive holomorphic cusp form of weight k for the full modular group SL(2,Z) and let λsymjf(n) denote the nth normalized Fourier coefficient of the jth symmetric power L-function L(s,symj f). It has been an interesting problem to study the average behaviour of λsymjf(n) and their higher powers, and many researchers in the literature have studied the sum equation* Σn≤ x λsymjl(n), equation* for various values of l and j. In this paper, we improve and generalize previously known results concerning the sum above for positive integers l and j such that lj≥ 4.