The geometric Cauchy problem for constant-rank submanifolds
Abstract
Given a smooth s-dimensional submanifold S of Rm+c and a smooth distribution D⊃ TS of rank m along S, we study the following geometric Cauchy problem: to find an m-dimensional rank-s submanifold M of Rm+c (that is, an m-submanifold with constant index of relative nullity m-s) such that M ⊃ S and TM |S = D. In particular, under some reasonable assumption and using a constructive approach, we show that a solution exists and is unique in a neighborhood of S.
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