Tangent unit-vector fields: nonabelian homotopy invariants and the Dirichlet energy

Tangent unit-vector fields: nonabelian homotopy invariants and the Dirichlet energy

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Let O be a closed geodesic polygon in S 2 . Maps from O into S 2 are said to satisfy tangent boundary conditions if the edges of O are mapped into the geodesics which contain them. Taking O to be an octant of S 2 , we compute the infimum Dirichlet energy, E(H), for continuous maps satisfying tan...

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Bibliographic Details
Main Authors:	Majumdar, A, Robbins, J, Zyskin, M
Format:	Journal article
Published:	2009

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