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Removable singularities for p-harmonic maps: the subquadratic case
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Published/Copyright:
July 29, 2005
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.
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Published Online: 2005-07-29
Published in Print: 2005-07-20
Walter de Gruyter GmbH & Co. KG
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Articles in the same Issue
- Semifield flocks, eggs, and ovoids of Q (4,q)
- Index of speciality and arithmetically Gorenstein subschemes
- Polar spaces embedded in projective spaces
- Equivariant periodicity for compact group actions
- The finiteness property and Łojasiewicz inequality for global semianalytic sets
- 3-dimensional loops on non-solvable reductive spaces
- A characterization of the P-geometry for M23
- A lower bound for the second sectional geometric genus of polarized manifolds
- On the geometry of linear involutions
- Removable singularities for p-harmonic maps: the subquadratic case
- Division algebras with an anti-automorphism but with no involution
