Function Spaces and Potential Theory

Abstract: Softcover reprint of the hanlcover lst edition 1996 Cover design: MetaDesign plus GmbH, Berlin Photocomposed from the authors' TEX files after editing and reformatting by Kurt Mattes, Heidelberg, using the MathTime fonts and a Springer TEX macro-package Printed on acid-free paper SPIN: ]]304074 41/3111 -5432. 1 Preface Function spaces, especially those spaces that have become known as Sobolev spaces, and their natural extensions, are now a central concept in analysis. In particular, they play a decisive role i… Show more

“…, and moreover µ K (E) ≤ Cap 1, q q−p+1 (E) for all compact (and Borel) sets E. Here the last property follows, e.g., from [1,Proposition 6.3.13] and the capacitability of Borel sets.…”

Nonlinear Muckenhoupt–Wheeden type bounds on Reifenberg flat domains, with applications to quasilinear Riccati type equations

“…, and moreover µ K (E) ≤ Cap 1, q q−p+1 (E) for all compact (and Borel) sets E. Here the last property follows, e.g., from [1,Proposition 6.3.13] and the capacitability of Borel sets.…”

Nonlinear Muckenhoupt–Wheeden type bounds on Reifenberg flat domains, with applications to quasilinear Riccati type equations

“…See [1,Theorem 4.1.3] and [28,Chapter 3]. It is easy to see that every Lipschitz function with compact support belongs to B p (R n ).…”

Strong $A_{\infty}$-weights and scaling invariant Besov capacities

“…Since (1), (2) and the left equivalence of (3) are contained in [7, Theorems 3.2&3.3] whose proofs depend on Lemma 2.1, it is enough to check the right equivalence of (3). Our approach is a fractional heat potential analogue of the Riesz potential treatment carried in [6, Theorem 2.1].…”

A tracing of the fractional temperature field