Anisotropic Spaces I. (Interpolation of Abstract Spaces and Function Spaces)

Anisotropic Spaces. 11. (Equivalent Norms for Abstract Spaces, Function Spaces with Weights of SOBOLEV-BESOV type) By HANS-JURGEN SCHMEISSER (Jena) (Eingegangen am 30.5. 1975) This paper is the continuation of [7].

## 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

In L 2 ((0, 1) 2 ) infinitely many different biorthogonal wavelet bases may be introduced by taking tensor products of one-dimensional biorthogonal wavelet bases on the interval (0, 1). Most well-known are the standard tensor product bases and the hyperbolic bases. In further biorthogonal wavelet b