Instability of Closed p-Elastic Curves in S2

Abstract

For p∈R, we show that non-circular closed p-elastic curves in S2 exist only when p=2, in which case they are classical elastic curves, or when p∈(0,1). In the latter case, we prove that for every pair of relatively prime natural numbers n and m satisfying m<2n<2\,m, there exists a closed spherical p-elastic curve with non-constant curvature which winds around a pole n times and closes up in m periods of its curvature. Further, we show that all closed spherical p-elastic curves for p∈(0,1) are unstable as critical points of the p-elastic energy.