On a boundary value problem for conically deformed thin elastic sheets

Abstract

We consider a thin elastic sheet in the shape of a disk that is clamped at its boundary such that the displacement and the deformation gradient coincide with a conical deformation with no stretching there. We define the free elastic energy as a variation of the von K\'arm\'an energy, that penalizes bending energy in Lp with p∈ (2,83) (instead of, as usual, p=2). We prove ansatz free upper and lower bounds for the elastic energy that scale like hp/(p-1), where h is the thickness of the sheet.