Add to ORKGAbstract. Problems concerning characterization of eigenvalues of some linear and homogenous differential systems by the Pellew and Southwell method of con-jugate eigenfunctions in the domain of hydrodynamic instability are discussed and a general mathematical framework described. In this general survey we look back on and rewrite this work almost in exactly the way it evolved out of a few naive looking calculations in hydrodynamic instability. We show in the process the close relationship that exists between mathematical analysis and its applications with due credit to intuition as the main source of mathematical activity
This book shows that the phenomenon of integrability is related not only to Hamiltonian systems, but...
The present eort discusses multi-dimensional eigenvalue problems as applied to the solution of hydro...
Two-dimensional periodic travelling hydroelastic waves on water of infinite depth are investigated. ...
AbstractThe equation (A▽4 + B▽2 + C)χ = 0 with matrix coefficients A, B, C is studied for homogeneou...
The Chebyshev tau method is examined; a numerical technique which in recent years has been successfu...
AbstractA study is made of the general eigenvalue problem posed by a differential equation whose sol...
Fluid flows that are smooth at low speeds become unstable and then turbulent at higher speeds. Th...
The linear stability of solitary-wave or front solutions of Hamiltonian evolutionary equations, whic...
An operator theoretic framework is developed to determine the essential spectra of diagonal dominant...
Abstract: The method for computing Liapunov-Schmidt expansions in the analysis of degenera...
We apply some general results for Hamiltonian systems, depending on the notion of signature of eigen...
AbstractAn operator theoretic framework is developed to determine the essential spectra of diagonal ...
Dedicated to the 100th anniversary of Mark Krein. Abstract. We give a short survey of an operator ap...
A Legendre polynomial-based spectral technique is developed to be applicable to solving eigenvalue p...
This book focuses on the constructive and practical aspects of spectral methods. It rigorously exami...
This book shows that the phenomenon of integrability is related not only to Hamiltonian systems, but...
The present eort discusses multi-dimensional eigenvalue problems as applied to the solution of hydro...
Two-dimensional periodic travelling hydroelastic waves on water of infinite depth are investigated. ...
AbstractThe equation (A▽4 + B▽2 + C)χ = 0 with matrix coefficients A, B, C is studied for homogeneou...
The Chebyshev tau method is examined; a numerical technique which in recent years has been successfu...
AbstractA study is made of the general eigenvalue problem posed by a differential equation whose sol...
Fluid flows that are smooth at low speeds become unstable and then turbulent at higher speeds. Th...
The linear stability of solitary-wave or front solutions of Hamiltonian evolutionary equations, whic...
An operator theoretic framework is developed to determine the essential spectra of diagonal dominant...
Abstract: The method for computing Liapunov-Schmidt expansions in the analysis of degenera...
We apply some general results for Hamiltonian systems, depending on the notion of signature of eigen...
AbstractAn operator theoretic framework is developed to determine the essential spectra of diagonal ...
Dedicated to the 100th anniversary of Mark Krein. Abstract. We give a short survey of an operator ap...
A Legendre polynomial-based spectral technique is developed to be applicable to solving eigenvalue p...
This book focuses on the constructive and practical aspects of spectral methods. It rigorously exami...
This book shows that the phenomenon of integrability is related not only to Hamiltonian systems, but...
The present eort discusses multi-dimensional eigenvalue problems as applied to the solution of hydro...
Two-dimensional periodic travelling hydroelastic waves on water of infinite depth are investigated. ...