Author
Don B. Hinton
Bio: Don B. Hinton is an academic researcher from University of Tennessee. The author has contributed to research in topics: Differential operator & Hamiltonian system. The author has an hindex of 18, co-authored 69 publications receiving 1198 citations.
Papers published on a yearly basis
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154 citations
107 citations
TL;DR: In this article, a linear Hamiltonian system J y′ = ( λA + B y) y is considered on an open interval (a, b), where both a and b are singular.
95 citations
TL;DR: In this paper, a Titchmarsh-Weyl-coefficient for singular 8 hermitian systems of arbitrary deficiency index was defined, which is related to our singular selfadjoint problem.
Abstract: In part I of this work we defined a Titchmarsh-Weyl-coefficient M(λ) for singular 8 hermitian systems of arbitrary deficiency index. This construction proceeded by the method of von Noumann for selfadjoint extensions of symmetric operators. In this part we show how a Titchmarsh-Weyl coefficient M(λ) defined by a limit of Titchmarsh-Weyl coefficients on compact intervals is related to our M(λ). Examples are given in the intermediate deficiency index case which show that put all limits of Titchmarsh - Weyl coefficients on compact intervals give rise to a singular selfadjoint problem.
70 citations
01 Jan 2000
TL;DR: For nearly 50 years Lyapunov inequalities have been an important tool in the study of differential equations as discussed by the authors, and they have been used extensively in the analysis of Hamiltonian systems.
Abstract: For nearly 50 years Lyapunov inequalities have been an important tool in the study of differential equations. In this survey, building on an excellent 1991 historical survey by Cheng, we sketch some new developments in the theory of Lyapunov inequalities and present some recent disconjugacy results relating to second and higher order differential equations as well as Hamiltonian systems.
67 citations
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TL;DR: There is, I think, something ethereal about i —the square root of minus one, which seems an odd beast at that time—an intruder hovering on the edge of reality.
Abstract: There is, I think, something ethereal about i —the square root of minus one. I remember first hearing about it at school. It seemed an odd beast at that time—an intruder hovering on the edge of reality.
Usually familiarity dulls this sense of the bizarre, but in the case of i it was the reverse: over the years the sense of its surreal nature intensified. It seemed that it was impossible to write mathematics that described the real world in …
33,785 citations
2,618 citations
Book•
15 Jun 2001
TL;DR: The Time Scales Calculus as discussed by the authors is a generalization of the time-scales calculus with linear systems and higher-order linear equations, and it can be expressed in terms of linear Symplectic Dynamic Systems.
Abstract: Preface * The Time Scales Calculus * First Order Linear Equations * Second Order Linear Equations * Self-Adjoint Equations * Linear Systems and Higher Order Equations * Dynamic Inequalities * Linear Symplectic Dynamic Systems * Extensions * Solutions to Selected Problems * Bibliography * Index
2,581 citations
Journal Article•
TL;DR: A second-order ordinary differential equation is derived, which is the limit of Nesterov's accelerated gradient method, and it is shown that the continuous time ODE allows for a better understanding of Nestersov's scheme.
Abstract: We derive a second-order ordinary differential equation (ODE) which is the limit of Nesterov's accelerated gradient method. This ODE exhibits approximate equivalence to Nesterov's scheme and thus can serve as a tool for analysis. We show that the continuous time ODE allows for a better understanding of Nesterov's scheme. As a byproduct, we obtain a family of schemes with similar convergence rates. The ODE interpretation also suggests restarting Nesterov's scheme leading to an algorithm, which can be rigorously proven to converge at a linear rate whenever the objective is strongly convex.
949 citations
Book•
01 Jan 1999TL;DR: In this paper, the Toda system and the Kac-van Moerbeke system are studied. But the initial value problem is not considered in this paper, as it is in the case of Jacobi operators with periodic coefficients.
Abstract: Jacobi operators: Jacobi operators Foundations of spectral theory for Jacobi operators Qualitative theory of spectra Oscillation theory Random Jacobi operators Trace formulas Jacobi operators with periodic coefficients Reflectionless Jacobi operators Quasi-periodic Jacobi operators and Riemann theta functions Scattering theory Spectral deformations-Commutation methods Completely integrable nonlinear lattices: The Toda system The initial value problem for the Toda system The Kac-van Moerbeke system Notes on literature Compact Riemann surfaces-A review Hergoltz functions Jacobi difference equations with MathematicaR Bibliography Glossary of notations Index.
782 citations