A. J. G. Bento^1,2

Copyright © 2000 A. J. G. Bento. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

Let (E0,E1) and (F0,F1) be two Banach couples and let T:E0+E1→F0+F1 be a continuous map such that T:E0→F0 is a Lipschitz compact operator and T:E1→F1 is a Lipschitz operator. We prove that if T:E1→F1 is also compact or E1 is continuously embedded in E0 or F1 is continuously embedded in F0, then T:(E0,E1)θ,q→(F0,F1)θ,q is also a compact operator when 1≤q<∞ and 1<θ<1. We also investigate the behaviour of the measure of non-compactness under real interpolation and obtain best possible compactness results of Lions–Peetre type for non-linear operators. A two-sided compactness result for linear operators is also obtained for an arbitrary interpolation method when an approximation hypothesis on the Banach couple (F0,F1) is imposed.