For many known non-compact embeddings of two Banach spaces E ,! F, every bounded sequence in E has a subsequence that takes the form of a profile decomposition - a sum of clearly structured terms with asymptotically disjoint supports plus a remainder that vanishes in the norm of F. In this note we construct a profile decomposition for arbitrary sequences in the Sobolev space H1;2(M) of a compact Riemannian manifold, relative to the embedding of H1;2(M) into L^2 (M), generalizing the well-known profile decomposition of Struwe [12, Proposition 2.1] to the case of arbitrary bounded sequences.

A Profile Decomposition for the Limiting Sobolev Embedding / Devillanova, G.; Tintarev, C.. - STAMPA. - (2020), pp. 65-78.

A Profile Decomposition for the Limiting Sobolev Embedding

G. Devillanova;
2020-01-01

Abstract

For many known non-compact embeddings of two Banach spaces E ,! F, every bounded sequence in E has a subsequence that takes the form of a profile decomposition - a sum of clearly structured terms with asymptotically disjoint supports plus a remainder that vanishes in the norm of F. In this note we construct a profile decomposition for arbitrary sequences in the Sobolev space H1;2(M) of a compact Riemannian manifold, relative to the embedding of H1;2(M) into L^2 (M), generalizing the well-known profile decomposition of Struwe [12, Proposition 2.1] to the case of arbitrary bounded sequences.
2020
Fifteenth International Conference Zaragoza-Pau on Mathematics and its Applications
978-84-1340-039-6
PUZ - Prensas de la Universidad de Zaragoza
A Profile Decomposition for the Limiting Sobolev Embedding / Devillanova, G.; Tintarev, C.. - STAMPA. - (2020), pp. 65-78.
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11589/203264
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