English

Distorted Hankel integral operators

Functional Analysis 2007-05-23 v1 Classical Analysis and ODEs Combinatorics Category Theory Complex Variables

Abstract

For \a,\b>0\a,\b>0 and for a locally integrable function (or, more generally, a distribution) \f\f on (0,\be)(0,\be), we study integral ooperators G\f\a,\b{\frak G}^{\a,\b}_\f on L2(R+)L^2(\R_+) defined by (G\f\a,\bf)(x)=R+\f(x\a+y\b)f(y)dy\big({\frak G}^{\a,\b}_\f f\big)(x)=\int_{\R_+}\f\big(x^\a+y^\b\big)f(y)dy. We describe the bounded and compact operators G\f\a,\b{\frak G}^{\a,\b}_\f and operators G\f\a,\b{\frak G}^{\a,\b}_\f of Schatten--von Neumann class \bSp\bS_p. We also study continuity properties of the averaging projection \Q\a,\b\Q_{\a,\b} onto the operators of the form G\f\a,\b{\frak G}^{\a,\b}_\f. In particular, we show that if \a\b\a\le\b and \b>1\b>1, then G\f\a,\b{\frak G}^{\a,\b}_\f is bounded on \bSp\bS_p if and only if 2\b(\b+1)1<p<2\b(\b1)12\b(\b+1)^{-1}<p<2\b(\b-1)^{-1}.

Keywords

Cite

@article{arxiv.math/0212293,
  title  = {Distorted Hankel integral operators},
  author = {A. B. Aleksandrov and V. V. Peller},
  journal= {arXiv preprint arXiv:math/0212293},
  year   = {2007}
}