Embeddings in Spaces of Lipschitz Type, Entropy and Approximation Numbers, and Applications

## Abstract In this paper we deal with compact embeddings of weighted function spaces of Besov and Triebel‐Lizorkin type with weights of logarithmic growth near infinity. We obtain the exact estimates for the asymptotic behaviour of Gelfand, Kolmogorov and Weyl numbers of the embeddings. As an appl

## Abstract Let __I__ = [__a__ , __b__ ] ⊂ ℝ, let 1 < __q__ ≤ __p__ < ∞, let __u__ and __v__ be positive functions with __u__ ∈ __L__ ~__p__ ′~ (__I__ ) and __v__ ∈ __L__ ~__q__~ (__I__ ), and let __T__ : __L__ ~__p__~ (__I__ ) → __L__ ~__q__~ (__I__ ) be the Hardy‐type operator given by equation

## Abstract An abstract version of Besov spaces is introduced by using the resolvent of nonnegative operators. Interpolation inequalities with respect to abstract Besov spaces and generalized Lorentz spaces are obtained. These inequalities provide a generalization of Sobolev inequalities of logarit