Fredholm properties of the jacobi Operator of minimal conical hypersurfaces
Abstract
In this paper we study non-degeneracy properties of via the Jacobi operator J:=+|A|2 of a given minimal hypersurface asymptotic to a cone C⊂ RN+1 of co-dimension one. Here is the Laplace Beltrami operator of and |A| is the norm of the second fundamental form of . We also construct a right inverse of J, that is, we prove that the Jacobi equation Jφ=f is solvable in , at least under some suitable non-degeneracy assumptions about and about the asymptotic behavior of f at infinity. We also discuss some examples where our results can be applied.
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