English

Decomposition theorems and kernel theorems for a class of functional spaces

Functional Analysis 2007-08-07 v1 Mathematical Physics math.MP

Abstract

We prove new theorems about properties of generalized functions defined on Gelfand-Shilov spaces SβS^\beta with 0β<10\le\beta<1. For each open cone URdU\subset\mathbb R^d we define a space Sβ(U)S^\beta(U) which is related to Sβ(Rd)S^\beta(\mathbb R^d) and consists of entire analytic functions rapidly decreasing inside U and having order of growth 1/(1β)\le 1/(1-\beta) outside the cone. Such sheaves of spaces arise naturally in nonlocal quantum field theory, and this motivates our investigation. We prove that the spaces Sβ(U)S^\beta(U) are complete and nuclear and establish a decomposition theorem which implies that every continuous functional defined on Sβ(Rd)S^\beta(\mathbb R^d) has a unique minimal closed carrier cone in Rd\mathbb R^d. We also prove kernel theorems for spaces over open and closed cones and elucidate the relation between the carrier cones of multilinear forms and those of the generalized functions determined by these forms.

Keywords

Cite

@article{arxiv.0708.0806,
  title  = {Decomposition theorems and kernel theorems for a class of functional spaces},
  author = {Michael A. Soloviev},
  journal= {arXiv preprint arXiv:0708.0806},
  year   = {2007}
}

Comments

AMS-LaTeX, 22 pages, no figures

R2 v1 2026-06-21T09:05:13.611Z