On the Kuznetsov-Bruggeman formula for a Hilbert modular surface having one cusp

[B] Bump, D.: Automorphic forms on GL(3, ℝ). (Lect. Notes Math., vol. 1083) Berlin Heidelberg New York: Springer 1984
MATH Google Scholar
[Br1] Bruggeman, R.: “Fourier coefficients of cusp forms”. Invent. Math.45, 1–18 (1978)
Article MATH MathSciNet Google Scholar
[Br2] Bruggeman, R.: Fourier coefficients of automorphic forms. (Lect. Notes Math., vol. 865) Berlin Heidelberg New York: Springer 1981
MATH Google Scholar
[Br3] Bruggeman, R.: “A sum formula forPSL ₂ over some real quadratic fields”. manuscript, 1987
[DI] Deshouillers, J.-M., Iwaniec, H.: “Kloosterman sums and Fourier coefficients of cusp forms”. Invent. Math.70, 219–288 (1982)
Article MATH MathSciNet Google Scholar
[DL] Duflo, M., Labesse, J.-P.: “Sur la formule des traces de Selberg”. Ann. Éc. Norm. [Sup.]4, 193–284 (1971)
MATH MathSciNet Google Scholar
[Ef] Efrat, I.: The Selberg trace formula forPSL(2, ℝ)ⁿ. Mem. Am. Math. Soc. 00, 00–00, 1987
Google Scholar
[EMOT] Erdélyi, A., Magnus, W., Oberhettinger, F., Tricombi, F.: Tables of Integral Transforms, Bateman Manuscript Project. vol. 2, New York: McGraw-Hill 1954
Google Scholar
[GR] Gradshteyn, I., Ryzhik, I., Tables of integrals, series, and products. New York London: Academic Press 1965
Google Scholar
[Kub] Kubota, T.: Elementary theory of Eisenstein series. New York: Wiley 1973
MATH Google Scholar
[Kuz] Kuznetsov, N.: “Petersson’s conjecture for cusp forms ...”. Math. USSR, Sb.39, 299–342 (1981)
Article MATH Google Scholar
[Sa] Saito, H.: Automorphic forms and algebraic extensions of number fields. Lectures in Math., Kyoto Univ., 1975
[Sel] Selberg, A.: “Harmonic analysis and discontinuous groups ...”, J. Indian Math. Soc.20, 4787 (1956)
MathSciNet Google Scholar
[Sh] Shimizu, H.: “On discontinuous groups operating on the product of the upper half planes”. Ann. Math.77, 33–71 (1963)
Article MathSciNet Google Scholar
[Si] Siegel, C.L.: Lectures on advanced analytic number theory. Bombay: Tata Institute 1961
[Ye] Ye, Y.: “Kloosterman integrals and base change”. (preprint) 1986
[Z1] Zagier, D.: “Eisenstein series and the Riemann zeta function”. (In: Automorphic forms. representation theory, and arithmetic). Bombay Colloquium Tata Institute 1979
[Z2] Zagier, D.: “Eisenstein series and the Selberg trace formula”. (In: Automorphic Forms, Representation Theory and Arithmetic). Bombay Colloquium, Tata Institute 1979
[Zo] Zograf, P.: “Selberg trace formula for the Hilbert modular group of a real quadratic algebraic number field”. J. Sov. Math.19, 1637–1652 (1982)
Article MATH Google Scholar

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Department of Mathematics, U.S. Naval Academy, 21402, Annapolis, MD, USA
David Joyner

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David Joyner
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Supported by an NSF fellowship

An erratum to this article is available at http://dx.doi.org/10.1007/BF02571232.

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Joyner, D. On the Kuznetsov-Bruggeman formula for a Hilbert modular surface having one cusp. Math Z 203, 59–104 (1990). https://doi.org/10.1007/BF02570723

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Received: 09 September 1987
Accepted: 20 October 1988
Issue Date: January 1990
DOI: https://doi.org/10.1007/BF02570723

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On the Kuznetsov-Bruggeman formula for a Hilbert modular surface having one cusp

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