The Riemann Hypothesis For Period Polynomials Of Modular Forms
Abstract
The period polynomial rf(z) for an even weight k≥ 4 newform f∈ Sk(0(N)) is the generating function for the critical values of L(f,s). It has a functional equation relating rf(z) to rf(-1Nz). We prove the Riemann Hypothesis for these polynomials: that the zeros of rf(z) lie on the circle |z|=1N . We prove that these zeros are equidistributed when either k or N is large.
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