Vortex solutions of Liouville equation and quasi spherical surfaces

Abstract

We identify the two-dimensional surfaces corresponding to certain solutions of the Liouville equation of importance for mathematical physics, the non-topological Chern-Simons (or Jackiw-Pi) vortex solutions, characterized by an integer N 1. Such surfaces, that we call S2 (N), have positive constant Gaussian curvature, K, but are spheres only when N=1. They have edges, and, for any fixed K, have maximal radius c that we find here to be c = N / K . If such surfaces are constructed in a laboratory by using graphene (or any other Dirac material), our findings could be of interest to realize table-top Dirac massless excitations on nontrivial backgrounds. We also briefly discuss the type of three-dimensional spacetimes obtained as the product S2 (N) × R.