Sign changes in Fourier coefficients of the symmetric power L-functions on sums of two squares

Abstract

Let f be a normalized primitive Hecke eigen cusp form of even integral weight k for the full modular group SL(2,Z). For integers j ≥ 2, let λsymj f(m) denote the mth Fourier coefficient of the jth symmetric power L-function associated with f. We give a quantitative result on the number of sign changes of λsymj f(m) for the indices m that are the sum of two squares in the interval [1,x] for sufficiently large x.

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