Pseudodifferential operators on prehomogeneous vector spaces
Abstract
Let be a connected, linear algebraic group defined over , acting regularly on a finite dimensional vector space over with -structure . Assume that posseses a Zariski-dense orbit, so that becomes a prehomogeneous vector space over . We consider the left regular representation of the group of -rational points on the Banach space of continuous functions on vanishing at infinity, and study the convolution operators , where is a rapidly decreasing function on the identity component of . Denote the complement of the dense orbit by , and put . It turns out that the restriction of to is a smooth operator. Furthermore, if is reductive, and and are irreducible hypersurfaces, corresponds, on each connected component of , to a totally characteristic pseudodifferential operator. We then investigate the restriction of the Schwartz kernel of to the diagonal. It defines a distribution on given by some power of a relative invariant of and, as a consequence of the fundamental theorem of prehomogeneous vector spaces, its extension to , and the complex -plane, satisfies functional equations. A trace of can then be defined by subtracting the singular contributions of the poles of the meromorphic extension.
Cite
@article{arxiv.math/0402139,
title = {Pseudodifferential operators on prehomogeneous vector spaces},
author = {Pablo Ramacher},
journal= {arXiv preprint arXiv:math/0402139},
year = {2007}
}
Comments
27 pages