Finite element mesh refinement for in-plane and out-of-plane vibration of variable geometrical Timoshenko beams based on superconvergent vibration modes

Abstract: PurposeIn this paper, a superconvergent patch recovery method is proposed for superconvergent solutions of modes in the finite element post-processing stage of variable geometrical Timoshenko beams. The proposed superconvergent patch recovery method improves the solution speed and accuracy of the finite element analysis of a curved beam. The free vibration and natural frequency of the beam were considered for studying forced vibrations and structural resonance. Beam vibration mode analysis was performed for hi… Show more

“…However, the FEM is by far the most popular computational approach for problems from Structural Mechanics, due to is computational efficiency, flexibility and accuracy [1,2]. In the literature concerning the FEM, much attention has been given to error estimates concerning the interpolation provided by the shape functions, also known as discretization errors [1,[3][4][5][6][7]. In this case, it is assumed that the boundary conditions and the geometry of the domain are represented exactly and the only source of error is the interpolation scheme.…”

A posteriori error estimates for beams with inexact flexural stiffness representation

“…However, the FEM is by far the most popular computational approach for problems from Structural Mechanics, due to is computational efficiency, flexibility and accuracy [1,2]. In the literature concerning the FEM, much attention has been given to error estimates concerning the interpolation provided by the shape functions, also known as discretization errors [1,[3][4][5][6][7]. In this case, it is assumed that the boundary conditions and the geometry of the domain are represented exactly and the only source of error is the interpolation scheme.…”

A posteriori error estimates for beams with inexact flexural stiffness representation