JIPAM - Journal of Inequalities in Pure and Applied Mathematics

Let $\varphi\left( y_{1},y_{2}\right) =y_{2}^{l}P\left( y_{1},y_{2}\right)$ where is a polynomial function of degree such that $P\left( 1,0\right) \neq0$ . Let $\mu_{\delta}$ be the Borel measure on $\mathbb{R}^{3}$ defined by $\mu_{\delta}\left( E\right) =\int_{V_{\delta}}\chi _{E}\left( x,\varphi\left( x\right) \right) dx$ where

$\displaystyle V_{\delta}=\left\{ x=\left( x_{1},x_{2}\right) \in\mathbb{R}^{2}:... ...and }\left\vert x_{1}\right\vert \leq\delta\left\vert x_{2}\right\vert \right\}$

and let $T_{\mu_{\delta}}$ be the convolution operator with the measure $\mu_{\delta}.$ In this paper we explicitly describe the type set

$\displaystyle E_{\mu_{\delta}}:=\left\{ \left( \frac{1}{p},\frac{1}{q}\right) \... ...eft[ 0,1\right] :\left\Vert T_{\mu_{\delta}}\right\Vert _{p,q}<\infty\right\} ,$

for $\delta$ small enough.

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