Summability Kernels for Lp Multipliers
Abstract
In this paper we have characterized the space of summability kernels for the case p=1 and p=2. For other values of p we give a necessary condition for a function to be a summability kernel. For the case p=1, we have studied the properties of measures which are transferred from M( Z) to M( R) through summability kernels. Further, we have extended every lp( Z) sequences to Lq( R) multipliers for certain values of p and q.
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