Abstract
AbstractA harmonic morphism between arbitrary Riemannian manifolds is a type of harmonic map. This chapter is devoted to the description of those properties of harmonic maps, which are essential to the development. Harmonic maps are extremals of a natural energy integral; they can be characterized as maps whose tension field vanishes, where the tension field is a natural generalization of the Laplacian. The first three sections in this chapter give the necessary formalism, the basic definitions, examples, and properties of harmonic maps. In Section 3.4, a conservation law involving the stress-energy is given. Harmonic maps from surfaces have special properties and include (branched) minimal immersions, which are discussed in Section 3.5. The chapter ends with a treatment of the second variation.
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