Numerical solution of unsteady elastic equations with C-Bézier basis functions

Abstract: <abstract><p>In this paper, the finite element method is applied to solve the unsteady elastic equations, C-Bézier basis functions are used to construct the shape function spaces, the semi-discrete scheme of the unsteady elastic equations is obtained by Galerkin finite element method and then the fully discretized Galerkin method is obtained by further discretizing the time variable with $ \theta $-scheme finite difference. Furthermore, for several numerical examples, the accuracy of approximate so… Show more

“…Sun et al [28] showed that the C-Bézier and H-Bézier basis functions have a much better approximation in simulating convection-diffusion problems. Sun et al [29] combine the Galerkin finite element method with C-Bézier basis functions to solve unsteady elastic equations, and the numerical results indicate that the method has much better precision in solving unsteady elastic equations.…”

Numerical Solutions of Second-Order Elliptic Equations with C-Bézier Basis

“…Sun et al [28] showed that the C-Bézier and H-Bézier basis functions have a much better approximation in simulating convection-diffusion problems. Sun et al [29] combine the Galerkin finite element method with C-Bézier basis functions to solve unsteady elastic equations, and the numerical results indicate that the method has much better precision in solving unsteady elastic equations.…”

Numerical Solutions of Second-Order Elliptic Equations with C-Bézier Basis