Nonlinear O(3) sigma model in discrete complex analysis

Abstract

We present a discrete version of the two-dimensional nonlinear O(3) sigma model examined by Belavin and Polyakov. We formulate it by means of Mercat's discrete complex analysis and its elaboration by Bobenko and G\"unther. We define a weighted discrete Dirichlet energy and area on a planar quad-graph and derive an inequality between them. We write f for the complex function obtained from the unit vector field of the model. The inequality is saturated if and only if the f is discrete (anti-)holomorphic. By using a weight W obtained from a kind of tiling of the sphere S2, the weighted discrete area AW(f) admits a geometrical interpretation, namely, AW(f)=4 π N for a topological quantum number N ∈ π2(S2). This ensures the topological stability of the solution described by the f, and we have the quantized energy EW(f)=| AW(f)|=4 π |N| . For quad-graphs with orthogonal diagonals, we show that the discrete (anti-)holomorphic function f satisfies the Euler--Lagrange equation derived from the weighted discrete Dirichlet energy. On some rhombic lattices, the discrete power functions z(N) give the topological quantum number N. Moreover, the weighted discrete Dirichlet energy, area, and Euler--Lagrange equation tend to their continuous forms as the lattice spacings tend to zero.