Existence and smoothness of extremizers for convolution with compactly supported measures
Abstract
In this article, we establish various facts about extremizers for Lp-improving convolution operators T Lp → Lq associated with compactly-supported probability measures on either Rd or Td . If σ has positive Fourier decay, we prove that extremizers exist and extremizing sequences are precompact modulo translation for all "non-endpoint" (p,q). These extremizers also satisfy an interesting positivity property and belong to Cloc∞ L∞.
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