Uniform decay of function norms

TL;DR

This paper introduces new relations between function spaces over infinite measure spaces, focusing on uniform decay of norms and localized almost-compactness, to analyze compactness properties in a broad quasi-Banach setting.

Contribution

It defines and studies two novel relations for function spaces over infinite measure spaces, extending compactness analysis beyond classical normed spaces.

Findings

Established an abstract compactness principle using the new relations.

Provided concrete examples illustrating the relations.

Applied the framework to Sobolev space embeddings on ^n.

Abstract

We introduce and study two new relations between function spaces over measure spaces of infinite measure, motivated by the question of establishing compactness. The first relation captures the uniform decay of function (quasi-)norms ``at infinity''. It appeared implicitly in the first author's recent work on the compactness of Sobolev embeddings of radially symmetric functions on $\mathbb{R}^n$. The second is a suitably localized version of the relation of almost-compact embeddings, which has been successfully used to study compactness in function spaces over measure spaces of finite measure, but becomes of no use in the case of infinite measure. Our framework is that of quasi-Banach function spaces, which need not be normable or rearrangement invariant. This level of generality leads us to introduce the notion of extremal fundamental functions associated with a (quasi-)Banach function space. We provide several concrete examples and establish an abstract compactness principle involving the new relations. Finally, we demonstrate a possible application of this principle to embeddings of inhomogeneous Sobolev spaces on $\mathbb{R}^n$.