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- In the mathematical field of differential geometry, a biharmonic map is a map between Riemannian or pseudo-Riemannian manifolds which satisfies a certain fourth-order partial differential equation. A biharmonic submanifold refers to an embedding or immersion into a Riemannian or pseudo-Riemannian manifold which is a biharmonic map when the domain is equipped with its induced metric. The problem of understanding biharmonic maps was posed by James Eells and Luc Lemaire in 1983. The study of harmonic maps, of which the study of biharmonic maps is an outgrowth (any harmonic map is also a biharmonic map), had been (and remains) an active field of study for the previous twenty years. A simple case of biharmonic maps is given by biharmonic functions. (en)
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- 15177 (xsd:nonNegativeInteger)
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- Chen (en)
- Sampson (en)
- Lemaire (en)
- Jiang (en)
- Caddeo (en)
- Eells (en)
- Montaldo (en)
- Oniciuc (en)
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- and (en)
- Proposition 7 (en)
- Conjecture 3 (en)
- Corollary 2.10 (en)
- Definition 5 (en)
- Example 12 (en)
- Proposition 3.1 (en)
- Proposition 3.2 (en)
- Sections 5−7 (en)
- Theorem 3 (en)
- Theorem 4.5 (en)
- Theorem 4.8 (en)
- Theorems 15.4, 15.6−15.8, 15.10, 15.12−15.13 (en)
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- 116 (xsd:integer)
- 124 (xsd:integer)
- 147 (xsd:integer)
- 869 (xsd:integer)
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- 1964 (xsd:integer)
- 1983 (xsd:integer)
- 1986 (xsd:integer)
- 1991 (xsd:integer)
- 1996 (xsd:integer)
- 2001 (xsd:integer)
- 2006 (xsd:integer)
- 2011 (xsd:integer)
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- Conjecture 25.B.6 (en)
- eq. (en)
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- 1996 (xsd:integer)
- 2011 (xsd:integer)
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- In the mathematical field of differential geometry, a biharmonic map is a map between Riemannian or pseudo-Riemannian manifolds which satisfies a certain fourth-order partial differential equation. A biharmonic submanifold refers to an embedding or immersion into a Riemannian or pseudo-Riemannian manifold which is a biharmonic map when the domain is equipped with its induced metric. The problem of understanding biharmonic maps was posed by James Eells and Luc Lemaire in 1983. The study of harmonic maps, of which the study of biharmonic maps is an outgrowth (any harmonic map is also a biharmonic map), had been (and remains) an active field of study for the previous twenty years. A simple case of biharmonic maps is given by biharmonic functions. (en)
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