Real Interpolation of Weighted Lp-Spaces

AND Péter Vértesi Mathematical Institute of the Hungarian Academy of Sciences, 1053 Budapest, Reáltanoda u. 13-15, Hungary Communicated by Paul Nevai

We show how the geometrical properties of uniform convexity and uniformly non-e: are inherited by real interpolation spaces for infinite families. ## Preliminaries Let D denote the unit disc {z E (c: IzI < I} and r its boundary. Let -A = { A d y ) : y E r , d , % } 17\*

## Abstract The author establishes a full real interpolation theorem for inhomogeneous Besov and Triebel‐Lizorkin spaces on spaces of homogeneous type. The corresponding theorem for homogeneous Besov and Triebel‐Lizorkin spaces is also presented. Moreover, as an application, the author gives the re

## Abstract The category of Scott‐domains gives a computability theory for possibly uncountable topological spaces, via representations. In particular, every separable Banach‐space is representable over a separable domain. A large class of topological spaces, including all Banach‐spaces, is represe

## Abstract Necessary and sufficient conditions for the stability of certain collocation methods applied to Cauchy singular integral equations on an interval are presented for weighted **L**__'__ norms. Moreover, the behavior of the approximation numbers, in particular their so‐called __k__ ‐splitt