On Euler-Dierkes-Huisken variational problem
Abstract
In this paper, we study the stability and minimizing properties of higher codimensional surfaces in Euclidean space associated with the f-weighted area-functional Ef(M)=∫M f(x)\; d Hk with the density function f(x)=g(|x|) and g(t) is non-negative, which develop the recent works by U. Dierkes and G. Huisken (Math. Ann., 20 October 2023) on hypersurfaces with the density function |x|α. Under suitable assumptions on g(t), we prove that minimal cones with globally flat normal bundles are f-stable, and we also prove that the regular minimal cones satisfying Lawlor curvature criterion, the highly singular determinantal varieties and Pfaffian varieties without some exceptional cases are f-minimizing. As an application, we show that k-dimensional minimal cones over product of spheres are |x|α-stable for α≥-k+22(k-1), the oriented stable minimal hypercones are |x|α-stable for α≥ 0, and we also show that the minimal cones over product of spheres C=C (Sk1 × ·s × Skm) are |x|α-minimizing for C ≥ 7, ki>1 and α ≥ 0, the Simons cones C(Sp × Sp)(p≥ 1) are |x|α-minimizing for any α ≥ 1, which relaxes the assumption 1≤α ≤ 2p in DH23.
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