On Relations Between Bessel Potential Spaces and Riesz Potential Spaces

We present embedding theorems for certain logarithmic Bessel potential spaces modelled upon generalized Lorentz Zygmund spaces and clarify the role of the logarithmic terms involved in the norms of the space mentioned. In particular, we get refinements of the Sobolev embedding theorems, Trudinger's

## Abstract We introduce generalizations of Bessel potentials by considering operators of the form __φ__[(__I__ – Δ)^–½^] where the functions __φ__ extend the classical power case. The kernel of such an operator is subordinate to a growth function __η__. We explore conditions on __η__ in such a way

## Abstract The purpose of this paper is to present characterizations of the inhomogeneous Hardy‐Bessel potential spaces __F^p^__~α~ (__K__) over the 2‐series field __K__ defined by Littlewood‐Paley type function, magnified image where Δ~0~(__x__) = 1(|x|≥1), = 0(other), Δ~__j__~(__x__) = 2^__j__^