Asymptotic and Spectral Analysis of the Spatially Nonhomogeneous Timoshenko Beam Model

## Abstract In the current paper, we present a series of results on the asymptotic and spectral analysis of coupled Euler‐Bernoulli and Timoshenko beam model. The model is well‐known in the different branches of the engineering sciences, such as in mechanical and civil engineering (in modelling of

It is well-known that the Timoshenko quotient always gives better results than the corresponding Rayleigh quotient, but its implementation is not straightforward, at least for non-uniform redundant beams. Quite recently a modified approach has been proposed [1], in which the main difficulty is overc

The viability of adapting the Timoshenko beam equations to a sandwich configuration is considered. These equations are utilised for modal analysis of solid as well as sandwich beams, including beams with a mass attached at the mid-span. Theoretical and experimental results regarding beam frequencies

The quasi-static and dynamic responses of a linear viscoelastic Timoshenko beam on Winkler foundation are studied numerically by using the hybrid Laplace-Carson and finite element method. In this analysis the field equation for viscoelastic material is used. In the transformed Laplace-Carson space t