Your search keyword '"Hermitian matrix"' showing total 3 results

1. On the Stability of Linear Stochastic Finite-Difference Systems with Almost-Periodic Coefficients.

Author

Strugova, T.

Subjects

*ASYMPTOTIC expansions, *STOCHASTIC difference equations, *DIFFERENCE equations, *EQUATIONS, *MATHEMATICS

Abstract

Focuses on the stability of linear stochastic finite-difference systems with almost-periodic coefficients. Reduction of the stability problem of solutions of deterministic linear finite-difference equation; Establishment of a condition for exponential stability; Validity of the criterion of asymptotic mean-square stability.

Published

2005

2. Inside the eigenvalues of certain Hermitian Toeplitz band matrices

Author

E. A. Maksimenko, Sergei M. Grudsky, and Albrecht Böttcher

Subjects

Pure mathematics, Numerical linear algebra, Band matrix, Applied Mathematics, Eigenvalue, Generating function, Toeplitz matrix, computer.software_genre, Hermitian matrix, Combinatorics, Computational Mathematics, Asymptotic expansions, Asymptotic expansion, computer, Eigenvalues and eigenvectors, Second derivative, Mathematics

Abstract

While extreme eigenvalues of large Hermitian Toeplitz matrices have been studied in detail for a long time, much less is known about individual inner eigenvalues. This paper explores the behavior of the jth eigenvalue of an n-by-n banded Hermitian Toeplitz matrix as n tends to infinity and provides asymptotic formulas that are uniform in j for [email protected][email protected]?n. The real-valued generating function of the matrices is assumed to increase strictly from its minimum to its maximum, and then to decrease strictly back from the maximum to the minimum, having nonzero second derivatives at the minimum and the maximum. The results, which are of interest in numerical analysis, probability theory, or statistical physics, for example, are illustrated and underpinned by numerical examples.

Published

2010

3. Semiclassical Almost Isometry

Author

Roberto Paoletti and Paoletti, R

Subjects

Ample line bundle, Pure mathematics, isodrastic leaf, FOS: Physical sciences, Semiclassical physics, Isometry (Riemannian geometry), Tensor (intrinsic definition), FOS: Mathematics, Fourier integral operator, Mathematics::Symplectic Geometry, Mathematical Physics, Mathematics, Fundamental theorem, Hodge manifold, Statistical and Nonlinear Physics, Mathematical Physics (math-ph), Bohr-Sommerfeld Lagrangian submanifold, MAT/07 - FISICA MATEMATICA, asymptotic expansions, Hermitian matrix, Manifold, Mathematics - Symplectic Geometry, BPU map, Symplectic Geometry (math.SG), MAT/03 - GEOMETRIA, Symplectic geometry

Abstract

Let M be a complex projective manifold, and L an Hermitian ample line bundle on it. A fundamental theorem of Gang Tian, reproved and strengthened by Zelditch, implies that the Khaeler form of L can be recovered from the asymptotics of the projective embeddings associated to large tensor powers of L. More precisely, with the natural choice of metrics the projective embeddings associated to the full linear series |kL| are asymptotically symplectic, in the appropriate rescaled sense. In this article, we ask whether and how this result extends to the semiclassical setting. Specifically, we relate the Weinstein symplectic structure on a given isodrastic leaf of half-weighted Bohr-Sommerfeld Lagrangian submanifolds of M to the asymptotics of the the pull-back of the Fubini-Study form under the semiclassical projective maps constructed by Borthwick, Paul and Uribe., exposition improved

Published

2006