Two regularized energy-preserving finite difference methods for the logarithmic Klein-Gordon equation

Abstract

We present and analyze two regularized finite difference methods which preserve energy of the logarithmic Klein-Gordon equation (LogKGE). In order to avoid singularity caused by the logarithmic nonlinearity of the LogKGE, we propose a regularized logarithmic Klein-Gordon equation (RLogKGE) with a small regulation parameter 0<1 to approximate the LogKGE with the convergence order O(). By adopting the energy method, the inverse inequality, and the cut-off technique of the nonlinearity to bound the numerical solution, the error bound O(h2+τ22) of the two schemes with the mesh size h, the time step τ and the parameter . Numerical results are reported to support our conclusions.