Local growth envelopes and optimal embeddings of generalized Sobolev spaces
The order-sharp estimates for the local growth envelopes of functions from the generalized Sobolev spaces are obtained, and an explicit description of the rearrangement-invariant hulls of the generalized Lorentz-Sobolev spaces, is also presented. It was assumed that the norm of any function from a rearrangement-invariant space (RIS) can be represented in terms of its rearrangement. Such a representation is known as the Luxemburg representation. A positive function is said to be essentially decreasing if it satisfies the monotonically inequality with some positive constant, not necessarily equa... Mehr ...
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| Dokumenttyp: | Artikel |
| Erscheinungsdatum: | 2020 |
| Schlagwörter: | Function evaluation / Functions / Invariance / Nonlinear equations / Lorentz-Sobolev spaces / Luxemburg representation / Rearrangement-invariant space (RIS) / Sobolev spaces / Problem solving |
| Sprache: | Englisch |
| Permalink: | https://search.fid-benelux.de/Record/base-29111004 |
| Datenquelle: | BASE; Originalkatalog |
| Powered By: | BASE |
| Link(s) : | https://openrepository.ru/article?id=253782 |
The order-sharp estimates for the local growth envelopes of functions from the generalized Sobolev spaces are obtained, and an explicit description of the rearrangement-invariant hulls of the generalized Lorentz-Sobolev spaces, is also presented. It was assumed that the norm of any function from a rearrangement-invariant space (RIS) can be represented in terms of its rearrangement. Such a representation is known as the Luxemburg representation. A positive function is said to be essentially decreasing if it satisfies the monotonically inequality with some positive constant, not necessarily equal to 1. The interpretation of the notion of a RIS followed the axiomatics suggested by Bennet and Sharpley.