Stable minimal hypersurfaces in RN+1+ with singular set an arbitrary closed K in \0\×R^
Abstract
With respect to a C∞ metric which is close to the standard Euclidean metric on RN+1+, where N 7 and 1 are given, we construct a class of embedded (N+)-dimensional hypersurfaces (without boundary) which are minimal and strictly stable, and which have singular set equal to an arbitrary preassigned closed subset K⊂\0\×R.
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