A Liouville-type theorem for cylindrical cones

Abstract

Suppose that C0n ⊂ Rn+1 is a smooth strictly minimizing and strictly stable minimal hypercone, l ≥ 0, and M a complete embedded minimal hypersurface of Rn+1+l lying to one side of C = C0 × Rl. If the density at infinity of M is less than twice the density of C, then we show that M = H(λ) × Rl, where \H(λ)\λ is the Hardt-Simon foliation of C0. This extends a result of L. Simon, where an additional smallness assumption is required for the normal vector of M.