A multiplier related to symmetric stable processes

Yıl 2017, Cilt: 46 Sayı: 2, 217 - 228, 01.04.2017

Deniz Karlı

Öz

In two recent papers [5] and [6], we generalized some classical results of Harmonic Analysis using probabilistic approach by means of a $d$-
dimensional rotationally symmetric stable process. These results allow one to discuss some boundedness conditions with weaker hypotheses.
In this paper, we study a multiplier theorem using these more general results. We consider a product process consisting of a $d$-dimensional
symmetric stable process and a 1-dimensional Brownian motion, and use properties of jump processes to obtain bounds on jump terms and
the $L^p(\mathbb{R}^d)$-norm of a new operator.

Anahtar Kelimeler

symmetric stable process, Fourier multiplier, harmonic extension, bounded operator

Kaynakça

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