RT info:eu-repo/semantics/article T1 Integrating Semilinear Wave Problems with Time-Dependent Boundary Values Using Arbitrarily High-Order Splitting Methods A1 Alonso Mallo, Isaías A1 Portillo de la Fuente, Ana María K1 65M12; 65M20; 65M22 K1 splitting methods; method of lines; initial boundary-value problem; consistency; convergence K1 65M12; 65M20; 65M22 AB The initial boundary-value problem associated to a semilinear wave equation with time dependent boundary values was approximated by using the method of lines. Time integration isachieved by means of an explicit time method obtained from an arbitrarily high-order splittingscheme. We propose a technique to incorporate the boundary values that is more accurate than theone obtained in the standard way, which is clearly seen in the numerical experiments. We prove theconsistency and convergence, with the same order of the splitting method, of the full discretizationcarried out with this technique. Although we performed mathematical analysis under the hypothesisthat the source term was Lipschitz-continuous, numerical experiments show that this techniqueworks in more general cases. PB MDPI Mathematics YR 2021 FD 2021 LK https://uvadoc.uva.es/handle/10324/46787 UL https://uvadoc.uva.es/handle/10324/46787 LA eng NO Mathematics. 2021; 9(10):1113. https://doi.org/10.3390/math9101113 DS UVaDOC RD 22-nov-2024