JIPAM - Journal of Inequalities in Pure and Applied Mathematics

JIPAM

$L^p-$Improving Properties for Measures on $\mathbb{R}^{4}$ Supported on Homogeneous Surfaces in Some Non Elliptic Cases


	Authors:	E. Ferreyra, T. Godoy, M. Urciuolo,
	Keywords:	Singular Measures, $L^p$-Improving, Convolution Operators.
	Date Received:	08/01/01
	Date Accepted:	05/06/01
	Subject Codes:	42B20,42B10.
	Editors:	Lubos Pick,


	Abstract:	In this paper we study convolution operators $T_{mu}$ with measures in $mathbb{R}^{4}$ of the form $muleft( Eright) =int_{B}chi_{E}left(x,varphileft( xright) right) dx,$ where is the unit ball of $mathbb{R}^{2}$ , and is a homogeneous polynomial function. If $inf_{hin S^{1}}leftvert detleft( d_{x}^{2}varphileft( h,.right) right)rightvert$ vanishes only on a finite union of lines, we prove that $T_{mu}$ is bounded from $L^{p}$ into $L^{q}$ if $left( frac{1}{p},frac{1}{q}right)$ belongs to certain explicitly described trapezoidal region.;

This article was printed from JIPAM
http://jipam.vu.edu.au

The URL for this article is:
http://jipam.vu.edu.au/article.php?sid=351