AbstractA study is made of inverse problems for n×n systems of the form L(λ)=Mλ2+Dλ+K. This paper concerns the determination of systems in an equivalence class defined by a fixed 2n×2n admissible Jordan matrix, i.e. a class of isospectral systems. Constructive methods are obtained for complex or real systems with no symmetry constraints. It is also shown how isospectral families of complex hermitian matrices can be formed. The case of real symmetric matrices is more difficult. Some partial solutions are obtained but, in this case, the theory remains incomplete. Examples are given
The regular λ-matrix λ2M+λD+K withM,D,K ∈ IRn×n defines a second-order system. A one-parameter traje...
AbstractSome new sufficient conditions are found for n real numbers to be the spectrum of some n × n...
Abstract. We study an inverse spectral problem for a compound oscillating system consisting of a sin...
AbstractA study is made of inverse problems for n×n systems of the form L(λ)=Mλ2+Dλ+K. This paper co...
Earlier work of the authors concerning the generation of isospectral families of second order (vibra...
Two vibrating systems are said to be isospectral if they have the same natural frequencies. The pape...
Inverse problems of spectral analysis deal with the reconstruction of operators of the specified for...
In this paper we investigate inverse eigenvalue problems for finite spectrum linear isometries on co...
Lambda-Matrices and Vibrating Systems presents aspects and solutions to problems concerned with line...
AbstractThe symmetric, positive semidefinite, and positive definite real solutions of matrix equatio...
We consider the class of real second-order linear dynamical systems that admit real diagonal forms w...
Abstract. We study an inverse spectral problem for a compound oscillating system consisting of a sin...
We show that if we start from one longitudinally vibrating rod we may construct one-parameter t-fami...
Given an incomplete set of natural frequencies and modes of a linear structure from a vibration test...
Abstract. We study an inverse spectral problem for a compound oscillating system consisting of a sin...
The regular λ-matrix λ2M+λD+K withM,D,K ∈ IRn×n defines a second-order system. A one-parameter traje...
AbstractSome new sufficient conditions are found for n real numbers to be the spectrum of some n × n...
Abstract. We study an inverse spectral problem for a compound oscillating system consisting of a sin...
AbstractA study is made of inverse problems for n×n systems of the form L(λ)=Mλ2+Dλ+K. This paper co...
Earlier work of the authors concerning the generation of isospectral families of second order (vibra...
Two vibrating systems are said to be isospectral if they have the same natural frequencies. The pape...
Inverse problems of spectral analysis deal with the reconstruction of operators of the specified for...
In this paper we investigate inverse eigenvalue problems for finite spectrum linear isometries on co...
Lambda-Matrices and Vibrating Systems presents aspects and solutions to problems concerned with line...
AbstractThe symmetric, positive semidefinite, and positive definite real solutions of matrix equatio...
We consider the class of real second-order linear dynamical systems that admit real diagonal forms w...
Abstract. We study an inverse spectral problem for a compound oscillating system consisting of a sin...
We show that if we start from one longitudinally vibrating rod we may construct one-parameter t-fami...
Given an incomplete set of natural frequencies and modes of a linear structure from a vibration test...
Abstract. We study an inverse spectral problem for a compound oscillating system consisting of a sin...
The regular λ-matrix λ2M+λD+K withM,D,K ∈ IRn×n defines a second-order system. A one-parameter traje...
AbstractSome new sufficient conditions are found for n real numbers to be the spectrum of some n × n...
Abstract. We study an inverse spectral problem for a compound oscillating system consisting of a sin...