Bu-Hamiltonian equations in mechanics of infinite-dimensional systems are studied. The equation of motion represented in the operator form is considered. A linear operator is called Bu-Hamiltonian with respect to the bilinear form if there exists an operator. The representability of this operator equation in the form of a Bu-Hamiltonian equation is studied. The representability of an equation depending on linear operator in the form of a B-Hamiltonian equation is also studied
An operator equation with the second time derivative is represented in the form of a Hamiltonianadmi...
Hamiltonian systems model a number of important problems in theoretical physics, mechanics, fluid dy...
For systems with infinitely many degrees of freedom, we establish a relationship between the solutio...
Bu-Hamiltonian equations in mechanics of infinite-dimensional systems are studied. The equation of m...
Necessary and sufficient conditions for an operator equation with a first time derivative to be repr...
We study linear Hamiltonian systems using bilinear and quadratic differential forms. Such a represen...
Abstract. We study linear Hamiltonian systems using bilinear and quadratic differential forms. Such ...
We study linear Hamiltonian systems using bilinear and quadratic differential forms. Such a represen...
This book provides a self-contained introduction to the theory of infinite-dimensional systems theor...
We obtain necessary and sufficient conditions for the representability of an evolution operator equa...
In this survey we use an operator theoretic approach to infinite-dimensional systems theory. As this...
We give two distinct infinite-Hamiltonian representations for the Riemann equation. One with first o...
The first integrals of the equation of motion by using elements of nonlinear functional analysis was...
The Lagrangian representation of multi-Hamiltonian PDEs has been introduced by Y. Nutku and one o...
In this paper, some new results concerning the modeling of distributed parameter systems in port Ham...
An operator equation with the second time derivative is represented in the form of a Hamiltonianadmi...
Hamiltonian systems model a number of important problems in theoretical physics, mechanics, fluid dy...
For systems with infinitely many degrees of freedom, we establish a relationship between the solutio...
Bu-Hamiltonian equations in mechanics of infinite-dimensional systems are studied. The equation of m...
Necessary and sufficient conditions for an operator equation with a first time derivative to be repr...
We study linear Hamiltonian systems using bilinear and quadratic differential forms. Such a represen...
Abstract. We study linear Hamiltonian systems using bilinear and quadratic differential forms. Such ...
We study linear Hamiltonian systems using bilinear and quadratic differential forms. Such a represen...
This book provides a self-contained introduction to the theory of infinite-dimensional systems theor...
We obtain necessary and sufficient conditions for the representability of an evolution operator equa...
In this survey we use an operator theoretic approach to infinite-dimensional systems theory. As this...
We give two distinct infinite-Hamiltonian representations for the Riemann equation. One with first o...
The first integrals of the equation of motion by using elements of nonlinear functional analysis was...
The Lagrangian representation of multi-Hamiltonian PDEs has been introduced by Y. Nutku and one o...
In this paper, some new results concerning the modeling of distributed parameter systems in port Ham...
An operator equation with the second time derivative is represented in the form of a Hamiltonianadmi...
Hamiltonian systems model a number of important problems in theoretical physics, mechanics, fluid dy...
For systems with infinitely many degrees of freedom, we establish a relationship between the solutio...