Removable singularities for p-harmonic maps: the subquadratic case

Gastel A, Grotowski JF, Kronz M (2005)

Publication Type: Journal article

Publication year: 2005

Journal

Advances in Geometry Walter de Gruyter

Publisher: Walter de Gruyter

Book Volume: 5

Pages Range: 469-483

DOI: 10.1515/advg.2005.5.3.469

Abstract

We prove a removable singularity theorem for p -harmonic maps in the subquadratic case. The theorem states that an isolated singularity of a weakly p -harmonic map is removable if the energy is sufficiently small in a neighbourhood of the singularity. © de Gruyter 2005.

Authors with CRIS profile

Andreas Gastel
Manfred Kronz Department Mathematik

Additional Organisation(s)

Lehrstuhl für Partial Differential Equations

How to cite

APA:

Gastel, A., Grotowski, J.F., & Kronz, M. (2005). Removable singularities for p-harmonic maps: the subquadratic case. Advances in Geometry, 5, 469-483. https://dx.doi.org/10.1515/advg.2005.5.3.469

MLA:

Gastel, Andreas, Joseph Francis Grotowski, and Manfred Kronz. "Removable singularities for p-harmonic maps: the subquadratic case." Advances in Geometry 5 (2005): 469-483.

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