Conical defects in growing sheets

Abstract

A growing or shrinking disc will adopt a conical shape, its intrinsic geometry characterized by a surplus angle se at the apex. If growth is slow, the cone will find its equilibrium. Whereas this is trivial if se <= 0, the disc can fold into one of a discrete infinite number of states if se is positive. We construct these states in the regime where bending dominates, determine their energies and how stress is distributed in them. For each state a critical value of se is identified beyond which the cone touches itself. Before this occurs, all states are stable; the ground state has two-fold symmetry.