Abstract
In this paper, a linearized semi‐implicit finite difference scheme is proposed to solve the strongly coupled fractional Ginzburg‐Landau equations. The difference scheme, which involves three time levels, is unconditionally stable, fourth‐order accurate in space, and second‐order accurate in time. By using the energy method and mathematical induction, the unique solvability, the unconditional stability, and optimal pointwise error estimate are obtained. Finally, some numerical experiments are presented to validate our theoretical findings.
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