Stability of point defects of degree 1 2 in a two-dimensional nematic liquid crystal model

Abstract

We study k-radially symmetric solutions corresponding to topological defects of charge k2 for integer k ≠ 0 in the Landau-de Gennes model describing liquid crystals in two-dimensional domains. We show that the solutions whose radial profiles satisfy a natural sign invariance are stable when |k| = 1 (unlike the case |k|>1 which we treated before). The proof crucially uses the monotonicity of the suitable components, obtained by making use of the cooperative character of the system. A uniqueness result for the radial profiles is also established.