Laplace Transformations of Submanifolds
Abstract
Let x : M Em be an isometric immersion of a Riemannian manifold M into a Euclidean m-space. Denote by the Laplace operator of M. Then gives rise to a differentiable map L :M Em, called the Laplace map, defined by L(p)=( x)(p), p∈ M. We call L(M) the Laplace image, and the transformation L :M L(M) from M onto its Laplace image L(M) the Laplace transformation. In this monograph, we provide a fundamental study of the Laplace transformations of Euclidean submanifolds.
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