On the coefficients of -fold product L-function

Abstract

Let f ∈ Sk(SL2(Z)) be a normalized Hecke eigenforms of integral weight k for the full modular group. In the article, we study the average behaviour of Fourier coefficients of -fold product L-function. More precisely, we establish the asymptotics of power moments associated to the sequence \λf f ·s f(n)\n- squarefree where f f ·s f denotes the -fold product of f. As a consequence, we prove results concerning the behaviour of sign changes associated to these sequences for odd -fold product L-function. A similar result also holds for the sequence \λf f ·s f(n)\n ∈ N.