Regularity for degenerate elliptic problems via $p$-harmonic approximation

Duzaar F, Mingione G (2004)

Publication Type: Journal article

Publication year: 2004

Journal

Annales de l'Institut Henri Poincaré - Analyse Non Linéaire Elsevier Masson / Institute Henri Poincaré

Publisher: Elsevier Masson / Institute Henri Poincaré

Book Volume: 21

Pages Range: 735-766

Journal Issue: 5

URI: http://www.sciencedirect.com/science?_ob=MImg&_imagekey=B6VKB-4BRBCVJ-1-5&_cdi=6118&_user=616145&_orig=search&_coverDate=10%2F31%2F2004&_sk=999789994&view=c&wchp=dGLzVlz-zSkzS&md5=e353b7aee2d2bf8cde5892ba0f08fc99&ie=/sdarticle.pdf

DOI: 10.1016/j.anihpc.2003.09.003

Abstract

We introduce a new method to prove regularity of solutions to certain degenerate elliptic problems. The method is based on the p-harmonic approximation lemma, recently proved by the authors in [F. Duzaar, G. Mingione, The p-harmonic approximation and the regularity of p-harmonic maps, Calc. Var., 2004, in press], that allows to approximate functions with p-harmonic functions in the same way as the classical harmonic approximation lemma (going back to De Giorgi) does via harmonic functions. The method presented here also bypasses certain difficulties arising when treating some degenerate and singular problems with a weak structure, such as degenerate and singular quasiconvex integrals, and provides transparent and elementary proofs.

Authors with CRIS profile

Frank Duzaar Lehrstuhl für Partial Differential Equations

Involved external institutions

University of Parma / Università degli Studi di Parma IT Italy (IT)

How to cite

APA:

Duzaar, F., & Mingione, G. (2004). Regularity for degenerate elliptic problems via $p$-harmonic approximation. Annales de l'Institut Henri Poincaré - Analyse Non Linéaire, 21(5), 735-766. https://doi.org/10.1016/j.anihpc.2003.09.003

MLA:

Duzaar, Frank, and Giuseppe Mingione. "Regularity for degenerate elliptic problems via $p$-harmonic approximation." Annales de l'Institut Henri Poincaré - Analyse Non Linéaire 21.5 (2004): 735-766.

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