Optimal extension of the Fourier transform and convolution operator on compact groups
arXiv:1906.10349
Abstract
Let $G$ be a compact group (not necessarily abelian) and let $Φ$ be a Young function satisfying the $Î_2$-condition. We determine the optimal domain and the associated extended operator for both Fourier transform and the convolution operator defined on the Orlicz spaces $L^Φ(G).$