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Numerical Tests of Modularity


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1 Mathematics Department, 530 Church Street, University of Michigan, Ann Arbor, MI 48109, United States
     

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We propose some numerical tests for identifying L-functions of automorphic representations of GL(r) over a number field. We then apply the tests to various conjectured automorphic L-functions, providing evidence for their modularity and the associated Riemann hypotheses. Our chief examples are the Hasse–Weil L-functions attached to curves of genus 2 over Q and to elliptic curves over Q( √ −1).We discuss also three miscellaneous applications. The first two include the L-functions of high symmetric powers of Ramanujan’sand the modular form in S2(Γ0(11)). The third application is an even 2-dimensional icosahedral Galois representation over Q, which conjecturally corresponds to a Maass form of eigenvalue 1/4.
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  • Numerical Tests of Modularity

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Authors

Andrew R. Booker
Mathematics Department, 530 Church Street, University of Michigan, Ann Arbor, MI 48109, United States

Abstract


We propose some numerical tests for identifying L-functions of automorphic representations of GL(r) over a number field. We then apply the tests to various conjectured automorphic L-functions, providing evidence for their modularity and the associated Riemann hypotheses. Our chief examples are the Hasse–Weil L-functions attached to curves of genus 2 over Q and to elliptic curves over Q( √ −1).We discuss also three miscellaneous applications. The first two include the L-functions of high symmetric powers of Ramanujan’sand the modular form in S2(Γ0(11)). The third application is an even 2-dimensional icosahedral Galois representation over Q, which conjecturally corresponds to a Maass form of eigenvalue 1/4.