The damping forces in a multiple-degree-of-freedom engineering dynamic system may not be accurately described by the familiar ‘viscous damping model’. The purpose of this paper is to develop indices to quantify the extent of any departures from this model, in other words the amount of ‘non-viscosity ’ of damping in discrete linear systems. Four indices are proposed. Two of these indices are based on the non-viscous damping matrix of the system. A third index is based on the residue matrices of the system transfer functions and the fourth is based on the (measured) complex modes of the system. The performance of the proposed indices is examined by considering numerical examples
Vibrating linear mechanical systems, in particular continuous systems, are often modelled considerin...
The paper analyzes an applicability of to date published indexes of non-proportionality in the case...
In previous papers (S. Adhikari and J. Woodhouse 2001 Journal of Sound and Vibration 243, 43-61; 63-...
The objectives of the studies reported in this dissertation are: (1) to develop improved techniques...
Multiple-degree-of-freedom linear dynamic systems with nonviscous damping is considered. The nonvisc...
In this paper, a new methodology is proposed to identify modal and physical parameters of linear non...
Derivatives of eigenvalues and eigenvectors of multiple-degree-of-freedom damped linear dynamic syst...
A method to calculate the derivatives of the eigenvalues and eigenvectors of multiple-degree-of-free...
A study is carried out into the philosophy and performance of different approaches for the determina...
The viscous damping model has been widely used to represent dissipative forces in structures under m...
In this paper the generalization of the classical mode orthogonality and normalization relationships...
Use of modal procedures in systems with non-proportional damping (such as structures with added visc...
In this chapter, the principal elements of the dynamic response of linear undamped and damped singl...
The standard damping model is the viscous dashpot for which the damping force is proportional to vel...
The analysis of nongyroscopic damped (viscous) linear dynamic systems is presented. Discrete system...
Vibrating linear mechanical systems, in particular continuous systems, are often modelled considerin...
The paper analyzes an applicability of to date published indexes of non-proportionality in the case...
In previous papers (S. Adhikari and J. Woodhouse 2001 Journal of Sound and Vibration 243, 43-61; 63-...
The objectives of the studies reported in this dissertation are: (1) to develop improved techniques...
Multiple-degree-of-freedom linear dynamic systems with nonviscous damping is considered. The nonvisc...
In this paper, a new methodology is proposed to identify modal and physical parameters of linear non...
Derivatives of eigenvalues and eigenvectors of multiple-degree-of-freedom damped linear dynamic syst...
A method to calculate the derivatives of the eigenvalues and eigenvectors of multiple-degree-of-free...
A study is carried out into the philosophy and performance of different approaches for the determina...
The viscous damping model has been widely used to represent dissipative forces in structures under m...
In this paper the generalization of the classical mode orthogonality and normalization relationships...
Use of modal procedures in systems with non-proportional damping (such as structures with added visc...
In this chapter, the principal elements of the dynamic response of linear undamped and damped singl...
The standard damping model is the viscous dashpot for which the damping force is proportional to vel...
The analysis of nongyroscopic damped (viscous) linear dynamic systems is presented. Discrete system...
Vibrating linear mechanical systems, in particular continuous systems, are often modelled considerin...
The paper analyzes an applicability of to date published indexes of non-proportionality in the case...
In previous papers (S. Adhikari and J. Woodhouse 2001 Journal of Sound and Vibration 243, 43-61; 63-...