Integrability of Lawson-Osserman Cone and its Applications
Abstract
In this paper, we characterize all eigenfunctions corresponding to nonpositive eigenvalues of the Jacobi operator of the link M of the Lawson-Osserman cone C in R7. In particular, we prove that C is integrable, i.e., all Jacobi fields on C of homogeneous degree 1 and 0, are generated by rotations and translations in R7. As applications, we prove that M is rigid as minimal submanifolds in S6, and derive the optimal decay order for minimal submanifolds in R7 asymptotic to C at infinity.
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