In this paper, we discuss the superconvergence of the local discontinuous Galerkin methods for nonlinear convection-diffusion equations. We prove that the numerical solution is [Formula: see text]th-order superconvergent to a particular projection of the exact solution, when the upwind flux and the alternating fluxes are used. The proof is valid for arbitrary nonuniform regular meshes and for piecewise polynomials of degree k ([Formula: see text]). The numerical experiments reveal that the property of superconvergence actually holds true for general fluxes.
Keywords: convection-diffusion equations; local discontinuous Galerkin method; superconvergence.