In this paper, an exact dynamic stiffness formulation using one-dimensional (1D) higher-order theories is presented and subsequently used to investigate the free vibration characteristics of solid and thin-walled structures. Higher-order kinematic fields are developed using the Carrera Unified Formulation, which allows for straightforward implementation of any-order theory without the need for ad hoc formulations. Classical beam theories (Euler–Bernoulli and Timoshenko) are also captured from the formulation as degenerate cases. The Principle of Virtual Displacements is used to derive the governing differential equations and the associated natural boundary conditions. An exact dynamic stiffness matrix is then developed by relating the ampli...
A refined theory which accounts for both longitudinal and transverse displacements as well as for th...
This paper proposes the use of a one-dimensional (1D) structural theory to analyze thin walled struc...
The free vibration analysis of thin- and thick-walled layered structures via a refined onedimensiona...
In this paper, an exact dynamic stiffness formulation using one-dimensional (1D) higher-order theori...
Closed-form dynamic stiffness (DS) formulations coupled with an efficient eigen-solution technique a...
A moving Timoshenko beam is analyzed for its free vibration characteristics using the dynamic stiffn...
In linear elasticity, most of the theories of structures in dynamics are governed by partial differe...
A moving Timoshenko beam is analyzed for its free vibration characteristics using the dynamic stiffn...
An exact dynamic stiffness matrix for a beam is developed by integrating the Rayleigh–Love theory fo...
The article is dedicated to the discussion on the exact dynamic stiffness matrix method applied to t...
Starting from the solutions of the governing differential equations of motion in free vibration, the...
Variable kinematic beam theories are used in this paper to carry out vibration analysis of isotropic...
An exact dynamic stiffness method is proposed for the free vibration analysis of multi-body systems ...
The dynamic stiffness formulation for both inplane and bending free vibration based on the first ord...
The free vibration of functionally graded Timoshenko beams is investigated by developing the dynamic...
A refined theory which accounts for both longitudinal and transverse displacements as well as for th...
This paper proposes the use of a one-dimensional (1D) structural theory to analyze thin walled struc...
The free vibration analysis of thin- and thick-walled layered structures via a refined onedimensiona...
In this paper, an exact dynamic stiffness formulation using one-dimensional (1D) higher-order theori...
Closed-form dynamic stiffness (DS) formulations coupled with an efficient eigen-solution technique a...
A moving Timoshenko beam is analyzed for its free vibration characteristics using the dynamic stiffn...
In linear elasticity, most of the theories of structures in dynamics are governed by partial differe...
A moving Timoshenko beam is analyzed for its free vibration characteristics using the dynamic stiffn...
An exact dynamic stiffness matrix for a beam is developed by integrating the Rayleigh–Love theory fo...
The article is dedicated to the discussion on the exact dynamic stiffness matrix method applied to t...
Starting from the solutions of the governing differential equations of motion in free vibration, the...
Variable kinematic beam theories are used in this paper to carry out vibration analysis of isotropic...
An exact dynamic stiffness method is proposed for the free vibration analysis of multi-body systems ...
The dynamic stiffness formulation for both inplane and bending free vibration based on the first ord...
The free vibration of functionally graded Timoshenko beams is investigated by developing the dynamic...
A refined theory which accounts for both longitudinal and transverse displacements as well as for th...
This paper proposes the use of a one-dimensional (1D) structural theory to analyze thin walled struc...
The free vibration analysis of thin- and thick-walled layered structures via a refined onedimensiona...