On the average behavior of the Fourier coefficients of jth symmetric power L-function over a certain sequences of positive integers

Abstract

In this paper, we investigate the average behavior of the nth normalized Fourier coefficients of the jth (j ≥ 2 be any fixed integer) symmetric power L-function (i.e., L(s,symjf)), attached to a primitive holomorphic cusp form f of weight k for the full modular group SL(2,Z) over a certain sequences of positive integers. Precisely, we prove an asymptotic formula with an error term for the sum Σa12+a22+a32+a42+a52+a62≤ x(a1,a2,a3,a4,a5,a6)∈Z6λ2symjf(a12+a22+a32+a42+a52+a62), where x is sufficiently large, and L(s,symjf):=Σn=1∞λsymjf(n)ns. When j=2, the error term which we obtain, improves the earlier known result.