Derives lower bound for Dirichlet density of v with |a_v(π1)| > |a_v(π2)| for non-twist-equivalent unitary cuspidal automorphic representations of GL(2), improving bound for inequality of absolute values.
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Refined strong multiplicity one theorems for paramodular cusp forms are established with an application to distinguishing eigenforms by twisted central values of spinor L-functions.
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Comparing Hecke eigenvalues for pairs of automorphic representations for GL(2)
Derives lower bound for Dirichlet density of v with |a_v(π1)| > |a_v(π2)| for non-twist-equivalent unitary cuspidal automorphic representations of GL(2), improving bound for inequality of absolute values.
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Some remarks on strong multiplicity one for paramodular forms
Refined strong multiplicity one theorems for paramodular cusp forms are established with an application to distinguishing eigenforms by twisted central values of spinor L-functions.