Equality in Hausdorff-Young for Hypergroups

Abstract

It has been shown in "On the Hausdorff-Young theorem for commutative hypergroups" by Sina Degenfeld-Schonburg, that one can extend the domain of Fourier transform of a commutative hypergroup K to Lp(K) for 1≤ p ≤ 2, and the Hausdorff-Young inequality holds true for these cases. In this article, we examine the structure of non-zero functions in Lp(K) for which equality is attained in the Hausdorff-Young inequality, for 1<p<2, and further provide a characterization for the basic uncertainty principle for commutative hypergroups with non-trivial centre.