The Fundamental Theorem of prehomogeneous vector spaces modulo pm. With an appendix "L-functions of prehomogeneous vector spaces" by Fumihiro Sato
Abstract
For a number field K with ring of integers OK, we prove an analogue over finite rings of the form OK/ Pm of the Fundamental Theorem on the Fourier transform of a relative invariant of prehomogeneous vector spaces, where P is a big enough prime ideal of OK and m>1. In the appendix, F. Sato gives an application of the Theorems A, B and the Theorems A, B, C in J. Denef and A. Gyoja [Character sums associated to prehomogeneous vector spaces, Compos. Math., 113 (1998) 237--346] to the functional equation of L-functions of Dirichlet type associated with prehomogeneous vector spaces.
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