The formulation of a bending vibration problem of an elastically restrained Bernoulli-Euler beam carrying a finite number of concentrated elements along its length is presented. In this study, the authors exploit the application of the differential evolution optimization technique to identify the torsional stiffness properties of the elastic supports of a Bernoulli-Euler beam. This hybrid strategy allows the determination of the natural frequencies and mode shapes of continuous beams, taking into account the effect of attached concentrated masses and rotational inertias, followed by a reconciliation step between the theoretical model results and the experimental ones. The proposed optimal identification of the elastic support parameters is ...
WOS: 000352389100003Zeren, Serkan (Arel Author)Many vibrating mechanical systems from the real life ...
In this study, optimal design of the transversely vibrating Euler–Bernoulli beams segmented in the l...
The stiffness maximization of elastic straight Euler-Bernoulli beams under the action of linearly di...
The formulation of a bending vibration problem of an elastically restrained Bernoulli–Euler beam car...
Facing the lateral vibration problem of a machine rotor as a beam on elastic supports in bending, th...
The problem of free vibration of Timoshenko beams with elastically supported ends can be solved by ...
In this project, the eigenvalues and mode shapes of a Bernoulli-Euler beam with concentrated masses...
An analytical method to study the dynamic characteristic of free vibration of beams carrying any typ...
International audienceStudying structural elements undergoing transverse vibration is crucial for sc...
The transfer matrix method based on the Euler-Bernoulli beam theory is employed in order to original...
Industrial rotating machines may be exposed to severe dynamic excitations due to resonant working re...
The problem of determining the optimum shape of a homogeneous Euler-Bernoulli beam of a circular cro...
In this paper, the free vibration of a rotating Euler-Bernoulli beam is studied using an inverse pro...
Typically, numerical or approximate methods are used for the free vibration analysis of axially load...
The minimum stiffness of a simple (or point) support that raises a natural frequency of a beam to it...
WOS: 000352389100003Zeren, Serkan (Arel Author)Many vibrating mechanical systems from the real life ...
In this study, optimal design of the transversely vibrating Euler–Bernoulli beams segmented in the l...
The stiffness maximization of elastic straight Euler-Bernoulli beams under the action of linearly di...
The formulation of a bending vibration problem of an elastically restrained Bernoulli–Euler beam car...
Facing the lateral vibration problem of a machine rotor as a beam on elastic supports in bending, th...
The problem of free vibration of Timoshenko beams with elastically supported ends can be solved by ...
In this project, the eigenvalues and mode shapes of a Bernoulli-Euler beam with concentrated masses...
An analytical method to study the dynamic characteristic of free vibration of beams carrying any typ...
International audienceStudying structural elements undergoing transverse vibration is crucial for sc...
The transfer matrix method based on the Euler-Bernoulli beam theory is employed in order to original...
Industrial rotating machines may be exposed to severe dynamic excitations due to resonant working re...
The problem of determining the optimum shape of a homogeneous Euler-Bernoulli beam of a circular cro...
In this paper, the free vibration of a rotating Euler-Bernoulli beam is studied using an inverse pro...
Typically, numerical or approximate methods are used for the free vibration analysis of axially load...
The minimum stiffness of a simple (or point) support that raises a natural frequency of a beam to it...
WOS: 000352389100003Zeren, Serkan (Arel Author)Many vibrating mechanical systems from the real life ...
In this study, optimal design of the transversely vibrating Euler–Bernoulli beams segmented in the l...
The stiffness maximization of elastic straight Euler-Bernoulli beams under the action of linearly di...