Add to ORKGThe dynamics of some non-conservative and dissipative systems can be derived by calculating the first variation of an action-dependent action, according to the variational principle of Herglotz. This is directly analogous to the variational principle of Hamilton commonly used to derive the dynamics of conservative systems. In a similar fashion, just as the second variation of a conservative system's action can be used to infer whether that system's possible trajectories are dynamically stable, so too can the second variation of the action-dependent action be used to infer whether the possible trajectories of non-conservative and dissipative systems are dynamically stable. In this paper I show, generalizing earlier analyses of the second var...
For four types of time boundary conditions, some generalized variational principles for conservative...
This paper compares the Hamiltonian approach to systems with nonholonomic constraints (see Weber [1...
Hamiltonian systems can be classified according Poincaré into integrable and non-integrable systems....
A new statement of Maupertuis principle of extremal action is contributed on the basis of a constrai...
A new statement of Maupertuis principle of extremal action is contributed on the basis of a constrai...
A new statement of Maupertuis principle of extremal action is contributed on the basis of a constrai...
A new statement of Maupertuis principle of extremal action is contributed on the basis of a constrai...
A new statement of Maupertuis principle of extremal action is contributed on the basis of a constrai...
We show that the contact dynamics obtained from the Herglotz variational principle can be described ...
This paper compares the Hamiltonian approach to systems with nonholonomic constraints (see Weber [19...
Following closely Kolmogorov’s original paper [1], we give a complete proof ofhis celebrated Theorem...
We show that the contact dynamics obtained from the Herglotz variational principle can be described ...
AbstractIn this paper, we show how to study the evolution of a complex system, given imprecise knowl...
In the development of nonholonomic mechanics one can observe recurring confusion over the very equat...
Abstract. The least action principle, through its variational formulation, possesses a final-ist asp...
For four types of time boundary conditions, some generalized variational principles for conservative...
This paper compares the Hamiltonian approach to systems with nonholonomic constraints (see Weber [1...
Hamiltonian systems can be classified according Poincaré into integrable and non-integrable systems....
A new statement of Maupertuis principle of extremal action is contributed on the basis of a constrai...
A new statement of Maupertuis principle of extremal action is contributed on the basis of a constrai...
A new statement of Maupertuis principle of extremal action is contributed on the basis of a constrai...
A new statement of Maupertuis principle of extremal action is contributed on the basis of a constrai...
A new statement of Maupertuis principle of extremal action is contributed on the basis of a constrai...
We show that the contact dynamics obtained from the Herglotz variational principle can be described ...
This paper compares the Hamiltonian approach to systems with nonholonomic constraints (see Weber [19...
Following closely Kolmogorov’s original paper [1], we give a complete proof ofhis celebrated Theorem...
We show that the contact dynamics obtained from the Herglotz variational principle can be described ...
AbstractIn this paper, we show how to study the evolution of a complex system, given imprecise knowl...
In the development of nonholonomic mechanics one can observe recurring confusion over the very equat...
Abstract. The least action principle, through its variational formulation, possesses a final-ist asp...
For four types of time boundary conditions, some generalized variational principles for conservative...
This paper compares the Hamiltonian approach to systems with nonholonomic constraints (see Weber [1...
Hamiltonian systems can be classified according Poincaré into integrable and non-integrable systems....