A linear implicit finite difference discretization of the Schrodinger-Hirota Equation
This work provides a numerical method for solving the Schrodinger-Hirota equation, which is relevant for researchers in computational physics and applied mathematics, but the contribution is incremental.
The paper proposes a linear implicit finite difference method for the Schrodinger-Hirota equation, proving optimal second-order convergence under small step-size conditions and verifying efficiency through numerical experiments.
A linear implicit finite difference method is proposed for the approximation of the solution to a periodic, initial value problem for a Schrodinger-Hirota equation. Optimal, second order convergence in the discrete $H^1-$norm is proved, assuming that $τ$, $h$ and $τ^4/h$ are sufficiently small, where $τ$ is the time-step and $h$ is the space mesh-size. The efficiency of the proposed method is verified by results from numerical experiments.