Embeddings of decomposition spaces / Felix Voigtlaender.

Format:

Book

Author/Creator:

Voigtlaender, Felix, author.

Series:

Memoirs of the American Mathematical Society ; 1426.

Memoirs of the American Mathematical Society, 0065-9266 ; number 1426.

Language:

English

Subjects (All):

Decomposition (Mathematics).

Harmonic analysis.

Physical Description:

vi, 255 pages ; 26 cm.

Place of Publication:

Providence, RI : American Mathematical Society, 2023.

Summary:

"Many smoothness spaces in harmonic analysis are decomposition spaces. In this paper we ask: Given two such spaces, is there an embedding between the two? A decomposition space [equation] is determined by a covering [equation] of the frequency domain, an integrability exponent p, and a sequence space [equation]. Given these ingredients, the decomposition space norm of a distribution g is defined as [equation] is a suitable partition of unity for Q. We establish readily verifiable criteria which ensure the existence of a continuous inclusion ("an embedding") [equation], mostly concentrating on the case where [equation]. Under suitable assumptions on Q, P, we will see that the relevant sufficient conditions are [equation] and finiteness of a nested norm of the form [equation]. Like the sets Ij, the exponents t, s and the weights [omega], [beta] only depend on the quantities used to define the decomposition spaces. In a nutshell, in order to apply the embedding results presented in this article, no knowledge of Fourier analysis is required; instead, one only has to study the geometric properties of the involved coverings, so that one can decide the finiteness of certain sequence space norms defined in terms of the coverings. These sufficient criteria are quite sharp: For almost arbitrary coverings and certain ranges of p1, p2, our criteria yield a complete characterization for the existence of the embedding. The same holds for arbitrary values of p1, p2 under more strict assumptions on the coverings. We also prove a rigidity result, namely that--[equation]--two decomposition spaces [equation] and [equation] can only coincide if their "ingredients" are equivalent, that is, if [equation] and [equation] and if the coverings Q,P and the weights w, v are equivalent in a suitable sense. The resulting embedding theory is illustrated by applications to [omega]-modulation and Besov spaces. All known embedding results for these spaces are special cases of our approach; often, we improve considerably upon the state of the art"-- Provided by publisher.

Contents:

Chapter 1. Introduction

Chapter 2. Different classes of coverings and their relations

Chapter 3. (Fourier-side) decomposition spaces

Chapter 4. Nested sequence spaces

Chapter 5. Sufficient conditions for embeddings

Chapter 6. Necessary conditions for embeddings

Chapter 7. An overview of the derived embedding results

Chapter 8. Decomposition spaces as spaces of tempered distributions

Chapter 9. Applications

Bibliography.

Notes:

"July 2023, volume 287, number 1426 (fourth of 6 numbers)."

Includes bibliographical references.

ISBN:

9781470459901

1470459906

OCLC:

1393204463