Remarks on Chemin's space of homogeneous distributions

Abstract

This article focuses on Chemin's space S'h of homogeneous distributions, which was introduced to serve as a basis for realizations of subcritical homogeneous Besov spaces. We will discuss how this construction fails in multiple ways for supercritical spaces. In particular, we study its intersection Xh := S'h X with various Banach spaces X, namely supercritical homogeneous Besov spaces and the Lebesgue space L∞. For each X, we find out if the intersection Xh is dense in X. If it is not, then we study its closure C = clos(Xh) and prove that the quotient X/C is not separable and that C is not complemented in X.

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