English

Pseudodifferential operators on prehomogeneous vector spaces

Representation Theory 2007-05-23 v1

Abstract

Let G\CG_\C be a connected, linear algebraic group defined over R\R, acting regularly on a finite dimensional vector space V\CV_\C over \C\C with R\R-structure VRV_\R. Assume that V\CV_\C posseses a Zariski-dense orbit, so that (G\C,ρ,V\C)(G_\C,\rho,V_\C) becomes a prehomogeneous vector space over R\R. We consider the left regular representation π\pi of the group of R\R-rational points GRG_\R on the Banach space \Cvan(VR)\Cvan(V_\R) of continuous functions on VRV_\R vanishing at infinity, and study the convolution operators π(f)\pi(f), where ff is a rapidly decreasing function on the identity component of GRG_\R. Denote the complement of the dense orbit by S\CS_\C, and put SR=S\CVRS_\R=S_\C\cap V_\R. It turns out that the restriction of π(f)\pi(f) to VRSRV_\R-S_\R is a smooth operator. Furthermore, if G\CG_\C is reductive, and S\CS_\C and SRS_\R are irreducible hypersurfaces, π(f)\pi(f) corresponds, on each connected component of VRSRV_\R-S_\R, to a totally characteristic pseudodifferential operator. We then investigate the restriction of the Schwartz kernel of π(f)\pi(f) to the diagonal. It defines a distribution on VRSRV_\R-S_\R given by some power p(m)s|p(m)|^s of a relative invariant p(m)p(m) of (G\C,ρ,V\C)(G_\C,\rho,V_\C) and, as a consequence of the fundamental theorem of prehomogeneous vector spaces, its extension to VRV_\R, and the complex ss-plane, satisfies functional equations. A trace of π(f)\pi(f) can then be defined by subtracting the singular contributions of the poles of the meromorphic extension.

Keywords

Cite

@article{arxiv.math/0402139,
  title  = {Pseudodifferential operators on prehomogeneous vector spaces},
  author = {Pablo Ramacher},
  journal= {arXiv preprint arXiv:math/0402139},
  year   = {2007}
}

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27 pages