£(p,λ)-spaces and interpolation

We present two characterizations of Lagrange interpolation sets for weak Chebyshev spaces. The first of them is valid for an arbitrary weak Chebyshev space U and is based on an analysis of the structure of zero sets of functions in U extending Stockenberg's theorem. The second one holds for all weak

## Abstract Let __X__ = (__X__, __d__, __μ__)be a doubling metric measure space. For 0 < __α__ < 1, 1 ≤__p__, __q__ < ∞, we define semi‐norms equation image When __q__ = ∞ the usual change from integral to supremum is made in the definition. The Besov space __B~p, q~^α^__ (__X__) is the set of th

Let s ≥ 1 be an integer, φ s → be a compactly supported function, and S φ denote the linear span of φ • -k k ∈ s . We consider the problem of approximating a continuous function f s → on compact subsets of s from the classes S φ h• , h > 0, based on samples of the function at scattered sites in s .

Let T be an operator of weak types (a, b) and ( p, q), where a< p and b<q. The Marcinkiewicz interpolation theorem and its generalizations due to Boyd, Krein Semenov and others show that T maps certain rearrangement invariant spaces E which are ``not too close'' to L a or L p into certain spaces F.