AbstractRotation numbers and chain rotation numbers may be interpreted as a generalization of the imaginary parts for matrices. In dimension two they measure how the solutions of a linear autonomous differential equation rotate in the phase space, and they reduce to the imaginary parts of the eigenvalues of the system’s matrix. In higher dimensions they measure how a two-frame of vectors rotate under the induced flow in the plane which is spanned by the frame. For their calculation, only special sets in the oriented Grassmann manifold of planes are relevant, and to each of these sets corresponds a compact interval of chain rotation numbers. In this paper we will determine these relevant sets and calculate the corresponding sets of chain rot...
In this article, we will study the link between a method for computing eigenvalues closest to the im...
We prove an ergodic theorem for the rotation number of the composition of a sequence os stationary r...
AbstractIn this paper, we use the analytic theory for 2 and 3-Toeplitz matrices to obtain the explic...
AbstractRotation numbers and chain rotation numbers may be interpreted as a generalization of the im...
In the present paper, formulas for the Rayleigh-quotient representation of the real parts, imaginary...
Two eigenvalue problems associated with steady rotations of a chain are considered. To compare the s...
AbstractTwo germs of linear analytic differential systems xk+1Y′=A(x)Y with a non-resonant irregular...
AbstractThe concept of rotation number for circle maps has been extended to rotation vectors for map...
An undergraduate course in Linear Algebra introduces eigenvalues and defines an eigenvalue as a numb...
AbstractThe main inertia theorem gives necessary and sufficient conditions that an n×n complex matri...
Abstract. The asymptotic angular stability of a dynamical system may be quantified by its rotation n...
The paper considers the rotation number for a family of linear nonautonomous Hamiltonian systems an...
Due to the character of the original source materials and the nature of batch digitization, quality ...
We treat rotation matrices of given axes and angles in the space R^3 = ImH of pure imaginary quatern...
AbstractThis paper is concerned with the dynamical behavior of the solutions of a class of linear Ha...
In this article, we will study the link between a method for computing eigenvalues closest to the im...
We prove an ergodic theorem for the rotation number of the composition of a sequence os stationary r...
AbstractIn this paper, we use the analytic theory for 2 and 3-Toeplitz matrices to obtain the explic...
AbstractRotation numbers and chain rotation numbers may be interpreted as a generalization of the im...
In the present paper, formulas for the Rayleigh-quotient representation of the real parts, imaginary...
Two eigenvalue problems associated with steady rotations of a chain are considered. To compare the s...
AbstractTwo germs of linear analytic differential systems xk+1Y′=A(x)Y with a non-resonant irregular...
AbstractThe concept of rotation number for circle maps has been extended to rotation vectors for map...
An undergraduate course in Linear Algebra introduces eigenvalues and defines an eigenvalue as a numb...
AbstractThe main inertia theorem gives necessary and sufficient conditions that an n×n complex matri...
Abstract. The asymptotic angular stability of a dynamical system may be quantified by its rotation n...
The paper considers the rotation number for a family of linear nonautonomous Hamiltonian systems an...
Due to the character of the original source materials and the nature of batch digitization, quality ...
We treat rotation matrices of given axes and angles in the space R^3 = ImH of pure imaginary quatern...
AbstractThis paper is concerned with the dynamical behavior of the solutions of a class of linear Ha...
In this article, we will study the link between a method for computing eigenvalues closest to the im...
We prove an ergodic theorem for the rotation number of the composition of a sequence os stationary r...
AbstractIn this paper, we use the analytic theory for 2 and 3-Toeplitz matrices to obtain the explic...