L-Functions for Holomorphic Forms on GSp(4) x GL(2) and Their Special Values

Creators: Saha, Abhishek

Abstract

We provide an explicit integral representation for L-functions of pairs (F, g), where F is a holomorphic genus two Siegel newform and g a holomorphic elliptic newform, both of square-free levels and of equal weights. When F, g have level one, this was earlier known by the work of Furusawa. The extension is not straightforward. Our methods involve precise double-coset and volume computations as well as an explicit formula for the Bessel model for GSp(4) in the Steinberg case; the latter is possibly of independent interest. As an application, we prove an algebraicity result for a critical value of L(s, F x g). This is in the spirit of known results on critical values of triple product L-functions, also of degree eight, though there are significant differences.

Additional Information

© The Author 2009. Published by Oxford University Press. Received July 3, 2008; Revised October 16, 2008; Accepted December 31, 2008. Communicated by Prof. Jim Cogdell. The author would like to thank M. Harris for some helpful suggestions (whose importance will be more apparent in the sequel to this article), D. Lanphier for useful discussions, and T. Tsankov for proofreading a part of this article. The author thankfully acknowledges his use of the software MAPLE for performing many of the computations for this article. This work was done while the author was a graduate student at Caltech and it represents a part of his PhD dissertation. The author thanks his advisor Dinakar Ramakrishnan for guidance, support, and many helpful discussions.

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