On a restriction problem of de Leeuw type for Laguerre multipliers

Details On a restriction problem of de Leeuw type for Laguerre multipliers On a restriction problem of de Leeuw type for Laguerre multipliers

1994-08-31

arxiv.org/abs/math/9408211v1

Mathematics

Classical Analysis and ODEs

Scientific paper

In 1965 K. de Leeuw \cite{deleeuw} proved among other things in the Fourier transform setting: {\it If a continuous function $m(\xi _1, \ldots ,\xi _n)$ on ${\bf R}^n$ generates a bounded transformation on $L^p({\bf R}^n),\; 1\le p \le \infty ,$ then its trace $\tilde{m}(\xi _1, \ldots ,\xi _m)=m(\xi _1, \ldots ,\xi _m,0,\ldots ,0), \; m

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