Oscillations and first-ever negative Fourier coefficients of symmetric square L-functions over sparse set
Abstract
Let sym2 f denote the symmetric square lift of a Hecke eigenform f ∈ Sk(0(N)) with the n th-Fourier coefficients λsym2f(n). In this article, we prove an estimate for the first moment of the sequence \ λsym2f(Q(x))\Q ∈ SD, x ∈ Z2 where SD denotes the set of in-equivalent reduced forms of the discriminant D. More precisely, we establish an estimate for the following sum: equation* split S(sym2f, D; X ) &= ΣQ(x) ≤ X \\ x ∈ Z2 ,~ Q ∈ SD \\ (Q(x),N) =1 λsym2f(Q(x)), split equation* Moreover, we consider a question concerning the behavior of signs of the Fourier coefficients λsym2f(n), supported on the set of integers represented by reduced forms of the discriminant D. We determine the size of nsym2f, D (see definition before ExtMatKLSW), in terms of the conductor of the associated L-functions.
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