Regularity and structure of non-planar p-elasticae

Abstract

We prove regularity and structure results for p-elasticae in Rn, with arbitrary p∈ (1,∞) and n≥2. Planar p-elasticae are already classified and known to lose regularity. In this paper, we show that every non-planar p-elastica is analytic and three-dimensional, with the only exception of flat-core solutions of arbitrary dimensions. Subsequently, we classify pinned p-elasticae in Rn and, as an application, establish a Li-Yau type inequality for the p-bending energy of closed curves in Rn. This extends previous works for p=2 and n≥2 as well as for p∈ (1,∞) and n=2.