TY - JOUR TI - A linear finite difference scheme for the generalized dissipative symetric regularized long wave equation with damping AU - Wang Xi AU - Hu Jin-Song AU - Zhang Hong JN - Thermal Science PY - 2019 VL - 23 IS - 13 SP - 719 EP - 726 PT - Article AB - In this paper, we study and analyze a three-level linear finite difference scheme for the initial boundary value problem of the symmetric regularized long wave equation with damping. The proposed scheme has the second accuracy both for the spatial and temporal discretization. The convergence and stability of the numerical solutions are proved by the mathematical induction and the discrete functional analysis. Numerical results are given to verify the accuracy and the efficiency of proposed algorithm.