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Hecke Correspondence for Automorphic Integrals with Infinite Log-Polynomial Periods

Since Hecke first proved his correspondence between Dirichlet series with functional equations and automorphic forms, there have been a great number of generalizations. Of particular interest is a generalization due to Bochner that gives a correspondence between Dirichlet series with any finite number of poles that satisfy the classical functional equation and automorphic integrals with (finite) log-polynomial sum period functions. In this dissertation, we extend Bochner's result to Dirichlet series with finitely many essential singularities. With some restrictions on the underlying group and the weight, we also prove a correspondence for Dirichlet series with infinitely many poles. For this second correspondence, we provide a technique to approximate automorphic integrals with infinite log-polynomial sum period functions by automorphic integrals with finite log-polynomial period functions. / Mathematics

Identiferoai:union.ndltd.org:TEMPLE/oai:scholarshare.temple.edu:20.500.12613/1054
Date January 2012
CreatorsDaughton, Austin James Chinault
ContributorsKnopp, Marvin Isadore, 1933-, Datskovsky, Boris Abramovich, Berhanu, Shiferaw, Mendoza, Gerardo A., Pribitkin, Wladimir
PublisherTemple University. Libraries
Source SetsTemple University
LanguageEnglish
Detected LanguageEnglish
TypeThesis/Dissertation, Text
Format53 pages
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Relationhttp://dx.doi.org/10.34944/dspace/1036, Theses and Dissertations

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