Jacquet–Langlands–Shimizu correspondence for theta lifts to $GSp(2)$ and its inner forms II: An explicit formula for Bessel periods and the non-vanishing of theta lifts
- 1 January 2021
- journal article
- research article
- Published by Mathematical Society of Japan (Project Euclid) in Journal of the Mathematical Society of Japan
- Vol. 73 (1), 125-159
- https://doi.org/10.2969/jmsj/81168116
Abstract
Project Euclid - mathematics and statistics onlineKeywords
This publication has 21 references indexed in Scilit:
- L-functions and theta correspondence for classical groupsInventiones Mathematicae, 2013
- Inequalities for Jacobi polynomialsThe Ramanujan Journal, 2013
- Yoshida lifts and simultaneous non-vanishing of dihedral twists of modular L -functionsJournal of the London Mathematical Society, 2013
- The local Langlands conjecture for GSp(4)Annals of Mathematics, 2011
- Commutation relations of Hecke operators for Arakawa liftingTohoku Mathematical Journal, 2008
- The explicit duality correspondence of (Sp(p,q),O∗(2n))Journal of Functional Analysis, 2003
- Arithmetic automorphic forms for the nonholomorphic discrete series of GSp(2)Duke Mathematical Journal, 1992
- On automorphic forms on the unitary symplectic group Sp(n) andSL 2(R)Mathematische Annalen, 1987
- on l-adic representations attached to modular forms IIGlasgow Mathematical Journal, 1985
- Zur Zahlentheorie der Quaternionen-Algebren.Journal für die reine und angewandte Mathematik (Crelles Journal), 1955