AIMS Mathematics (Sep 2023)

An efficient linearly-implicit energy-preserving scheme with fast solver for the fractional nonlinear wave equation

  • Tingting Ma ,
  • Yuehua He

DOI
https://doi.org/10.3934/math.20231358
Journal volume & issue
Vol. 8, no. 11
pp. 26574 – 26589

Abstract

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The paper considers the Hamiltonian structure and develops efficient energy-preserving schemes for the nonlinear wave equation with a fractional Laplacian operator. To this end, we first derive the Hamiltonian form of the equation by using the fractional variational derivative and then applying the finite difference method to the original equation to obtain a semi-discrete Hamiltonian system. Furthermore, the scalar auxiliary variable method and extrapolation technique is used to approximate a semi-discrete system to construct an efficient linearly-implicit energy-preserving scheme. A fast solver for the proposed scheme is presented to reduce CPU consumption. Ample numerical results are given to finally confirm the efficiency and conservation of the developed scheme.

Keywords