In this paper the formulae for regular stiffness matrix and matrix of viscous damping and for complex modal matrix of left eigenvectors from regular mass matrix, diagonal spectral matrix and from complex modal matrix of right eiegenvectors was deduced. Finally, the resolvent of this system was expressed in simple additive form. The corresponding formulae for dynamical systems with commutative matrix of viscous damping and with corresponding real modal matrix of right eigenvectors was given, too
The Sumudu transform of certain elementary matrix functions is obtained. These transforms are then u...
In this paper the solution of two-mass symmetric dynamical system with singular stiffnes matrix via...
The linearized equations of motion of finite dimensional autonomous mechanical systems are normally ...
In this paper the formulae for regular stiffness matrix and matrix of viscous damping and for comple...
In this paper the generalization of the classical mode orthogonality and normalization relationships...
Decoupling a second-order linear dynamical system requires that one develop a transformation that si...
In this paper, a method to calculate derivatives of eigenvectors of damped discrete linear dynamic s...
Multiple-degree-of-freedom linear dynamic systems with nonviscous damping is considered. The nonvisc...
In general, the damping matrix of a dynamic system or structure is such that it can not be simultane...
The analysis of nongyroscopic damped (viscous) linear dynamic systems is presented. Discrete system...
A method to calculate the derivatives of the eigenvalues and eigenvectors of multiple-degree-of-free...
Derivatives of eigenvalues and eigenvectors of multiple-degree-of-freedom damped linear dynamic syst...
A set of first-order coupled equations of motion for eigenvalues and eigenvectors of a generic matri...
The viscous damping model has been widely used to represent dissipative forces in structures under m...
For a vibrating dissipative system with hysteresis loop, complex (dynamic) stiffness is widely used....
The Sumudu transform of certain elementary matrix functions is obtained. These transforms are then u...
In this paper the solution of two-mass symmetric dynamical system with singular stiffnes matrix via...
The linearized equations of motion of finite dimensional autonomous mechanical systems are normally ...
In this paper the formulae for regular stiffness matrix and matrix of viscous damping and for comple...
In this paper the generalization of the classical mode orthogonality and normalization relationships...
Decoupling a second-order linear dynamical system requires that one develop a transformation that si...
In this paper, a method to calculate derivatives of eigenvectors of damped discrete linear dynamic s...
Multiple-degree-of-freedom linear dynamic systems with nonviscous damping is considered. The nonvisc...
In general, the damping matrix of a dynamic system or structure is such that it can not be simultane...
The analysis of nongyroscopic damped (viscous) linear dynamic systems is presented. Discrete system...
A method to calculate the derivatives of the eigenvalues and eigenvectors of multiple-degree-of-free...
Derivatives of eigenvalues and eigenvectors of multiple-degree-of-freedom damped linear dynamic syst...
A set of first-order coupled equations of motion for eigenvalues and eigenvectors of a generic matri...
The viscous damping model has been widely used to represent dissipative forces in structures under m...
For a vibrating dissipative system with hysteresis loop, complex (dynamic) stiffness is widely used....
The Sumudu transform of certain elementary matrix functions is obtained. These transforms are then u...
In this paper the solution of two-mass symmetric dynamical system with singular stiffnes matrix via...
The linearized equations of motion of finite dimensional autonomous mechanical systems are normally ...