Generic Scarring for Minimal Hypersurfaces in Manifolds Thick at Infinity with a Thin Foliation at Infinity

Abstract

We show generic scarring phenomenon for minimal hypersurfaces in a class of complete non-compact manifolds. In particular, we prove that for any metric g in a C∞-generic subset of the family of complete metrics which are thick at infinity with a thin foliation at infinity on a fixed Mn+1 of dimension 3 ≤ (n + 1) ≤ 7, to any connected, closed, embedded, 2-sided, stable minimal hypersurface S ⊂ (M, g), there exists a sequence of closed, embedded, minimal hypersurfaces \k\ scarring along S, in the sense that the area of k diverges to infinity, and when properly renormalized, k converges to S as varifolds.

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