Morrey smoothness spaces: A new approach

Abstract

In the recent years so-called Morrey smoothness spaces attracted a lot of interest. They can (also) be understood as generalisations of the classical spaces Asp,q (Rn), A∈ \B,F\, in Rn, where the parameters satisfy s∈ R (smoothness), 0<p ∞ (integrability) and 0<q ∞ (summability). In the case of Morrey smoothness spaces additional parameters are involved. In our opinion, among the various approaches at least two scales enjoy special attention, also in view of applications: the scales Asu,p,q (Rn), with A∈ \N, E\, u≥ p, and As, τp,q (Rn), with τ≥ 0. We reorganise these two prominent types of Morrey smoothness spaces by adding to (s,p,q) the so--called slope parameter , preferably (but not exclusively) with -n <0. It comes out that || replaces n, and (||,1) replaces 1 in slopes of (broken) lines in the ( 1p, s)--diagram characterising distinguished properties of the spaces Asp,q (Rn) and their Morrey counterparts. Special attention will be paid to low--slope spaces with -1 < <0, where corresponding properties are quite often independent of n∈ N. Our aim is two--fold. On the one hand we reformulate some assertions already available in the literature (many of them are quite recent). On the other hand we establish on this basis new properties, a few of them became visible only in the context of the offered new approach, governed, now, by the four parameters (s,p,q,).

0

Turn this paper into a full lesson

ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.

Discussion (0)

Sign in to join the discussion.

Loading comments…