Modular Forms with Only Nonnegative Coefficients
Abstract
We study modular forms for SL2(Z) with no negative Fourier coefficients. Let A(k) be the positive integer where if the first A(k) Fourier coefficients of a modular form of weight k for SL2(Z) are nonnegative, then all of its Fourier coefficients are nonnegative, so that A(k) can be interpreted as a ``nonnegativity Sturm bound''. We give upper and lower bounds for A(k), as well as an upper bound on the nth Fourier coefficient of any form with no negative Fourier coefficients.
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