TY - JOUR
T1 - Smooth transfer of kloosterman integrals (the archimedean case)
AU - Aizenbud, Avraham
AU - Gourevitch, Dmitry
N1 - BSF; GIF; ISF Center of Excellency; ISF [583/09]; NSF [DMS-0635607]Research of both authors supported in part by a BSF grant, a GIF grant, and an ISF Center of Excellency grant; research of the first author also supported by ISF grant no. 583/09; research of the second author also supported by NSF grant DMS-0635607. Any opinions, findings and conclusions or recommendations expressed in this material are those of the authors and do not necessarily reflect the views of the National Science Foundation.
PY - 2013/2
Y1 - 2013/2
N2 - We establish the existence of a transfer, which is compatible with Kloosterman integrals, between Schwartz functions on GLn(ℝ) and Schwartz functions on the variety of non-degenerate Hermitian forms. Namely, we consider an integral of a Schwartz function on GLn(ℝ) along the orbits of the two sided action of the groups of upper and lower unipotent matrices twisted by a non-degenerate character. This gives a smooth function on the torus. We prove that the space of all functions obtained in such a way coincides with the space that is constructed analogously when GLn(ℝ) is replaced with the variety of non-degenerate hermitian forms. We also obtain similar results for gln(ℝ). The non- Archimedean case was done by H. Jacquet (Duke Math. J., 2003) and our proof is based on the ideas of this work. However we have to face additional difficulties that appear only in the Archimedean case. Those results are crucial for the comparison of the Kuznetsov trace formula and the relative trace formula of GLn with respect to the maximal unipotent subgroup and the unitary group, as done by H. Jacquet, and by B. Feigon, E. Lapid, and O. Offen.
AB - We establish the existence of a transfer, which is compatible with Kloosterman integrals, between Schwartz functions on GLn(ℝ) and Schwartz functions on the variety of non-degenerate Hermitian forms. Namely, we consider an integral of a Schwartz function on GLn(ℝ) along the orbits of the two sided action of the groups of upper and lower unipotent matrices twisted by a non-degenerate character. This gives a smooth function on the torus. We prove that the space of all functions obtained in such a way coincides with the space that is constructed analogously when GLn(ℝ) is replaced with the variety of non-degenerate hermitian forms. We also obtain similar results for gln(ℝ). The non- Archimedean case was done by H. Jacquet (Duke Math. J., 2003) and our proof is based on the ideas of this work. However we have to face additional difficulties that appear only in the Archimedean case. Those results are crucial for the comparison of the Kuznetsov trace formula and the relative trace formula of GLn with respect to the maximal unipotent subgroup and the unitary group, as done by H. Jacquet, and by B. Feigon, E. Lapid, and O. Offen.
UR - http://www.scopus.com/inward/record.url?scp=84873452476&partnerID=8YFLogxK
U2 - 10.1353/ajm.2013.0000
DO - 10.1353/ajm.2013.0000
M3 - مقالة
SN - 0002-9327
VL - 135
SP - 143
EP - 182
JO - American Journal of Mathematics
JF - American Journal of Mathematics
IS - 1
ER -