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.
On the number of F ourier coefficients that determine a modular form
2 Pith papers cite this work. Polarity classification is still indexing.
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Hecke eigenforms of level one among Siegel cusp forms of degree two are determined by the second Hecke eigenvalue under assumption and can be distinguished by L-functions.
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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.
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On distinguishing Siegel cusp forms of degree two
Hecke eigenforms of level one among Siegel cusp forms of degree two are determined by the second Hecke eigenvalue under assumption and can be distinguished by L-functions.