Abhishek Saha
Published 2009-04-25, updated 2009-10-02Version 2
Let F be a genus two Siegel newform and g a classical newform, both of squarefree levels and of equal weight l. We prove a pullback formula for certain Eisenstein series -- thus generalizing a construction of Shimura -- and use this to derive an explicit integral representation for the degree eight L-function L(s, F X g). This integral representation involves the pullback of a simple Siegel-type Eisenstein series on the unitary group GU(3,3). As an application, we prove a reciprocity law -- predicted by Deligne's conjecture -- for the critical special values L(m, F X g) where m is an integer, 2 <= m <= l/2-1.
Comments: 45 pages; Some notational changes made, inaccuracies eliminated and typos fixed in accordance with an anonymous referee's helpful comments. To appear in the Pacific Journal of Mathematics
New arithmetical proof of the reciprocity law for Dedekind sums
L-functions for holomorphic forms on GSp(4) x GL(2) and their special values
Reciprocity laws for Dedekind symbols and the Euler class
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