Abstract
In this paper, we show how one can use the theory of lifting of automorphic forms in order to obtain formulas of branching rules in complex groups. We also use this technique to give formulas for certain functionals which are defined on unramified representations.
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W. Casselman and J. Shalika, The unramified principal series of p-adic groups. II. The Whittaker function, Compositio Mathematica 41 (1980), 207–231.
R. Howe, E. Tan and J. Willenbring, Stable branching rules for classical symmetric pairs, Transactions of the American Mathematical Society 357 (2005), 1601–1626.
D. Ginzburg, On standard L-functions for E 6and E 7, Journal für die Reine und Angewandte Mathematik 465 (1995), 101–131.
D. Ginzburg, On spin L-functions for orthogonal groups, Duke Mathematical Journal 77 (1995), 753–798.
D. Ginzburg and D. Jiang, Periods and Liftings: From G 2to C 3, Israel Journal of Mathematics 123 (2001), 29–59.
D. Ginzburg, S. Rallis and D. Soudry, Cubic correspondence arising from G 2, American Journal of Mathematics 119 (1997), 251–335.
D. Ginzburg, S. Rallis and D. Soudry Periods, poles of L-functions and symplecticorthogonal theta lifts, Journal für die Reine und Angewandte Mathematik 487 (1997), 85–114.
D. Ginzburg, S. Rallis and D. Soudry On the automorphic theta representation for simply laced groups, Israel Journal of Mathematics 100 (1997), 61–116.
R. Gaskell and R. T. Sharp Generating functions for G2 characters and subgroup branching rules, Journal of Mathematical Physics 22 (1981), 2736–2739.
S. Kato, A. Murase and T. Sugano, Whittaker-Shintani functions for orthogonal groups, The Tohoku Mathematical Journal. Second Series 55 (2003), 1–64.
W. McGovern, A Branching Law from Spin(C, 7) → G 2and its applications to Unipotent Representations, Journal of Algebra 130 (1990), 166–175.
S. Rallis, On the Howe duality conjecture, Compositio Mathematica 51 (1984), 333–399.
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Ginzburg, D. Branching rules obtained from explicit correspondences of automorphic representations. Isr. J. Math. 172, 29–50 (2009). https://doi.org/10.1007/s11856-009-0061-6
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DOI: https://doi.org/10.1007/s11856-009-0061-6