Dilation Operators in Besov Spaces over Local Fields
Abstract
We consider a dilation operator on Besov spaces (Bsr,t(K)) over local fields and estimate an operator norm on such a field for s > σr = max(1r -1,~0) which depends on the constant k unlike the case of Euclidean spaces. In Rn, it is independent of constant. A constant k appears for liming case s=0 and s=σr. In case of local fields, the limig case is still open. Further we also estimate the localization property of Besov spaces over local fields.
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