In this article, a new methodology is presented to obtain representation models for a priori relation z = u(x1, x2, . . . ,xn) (1), with a known an experimental dataset zi; x1i ; x2i ; x3i ; . . . ; xni i=1;2;...;p· In this methodology, a potential energy is initially defined over each possible model for the relationship (1), what allows the application of the Lagrangian mechanics to the derived system. The solution of the Euler–Lagrange in this system allows obtaining the optimal solution according to the minimal action principle. The defined Lagrangian, corresponds to a continuous medium, where a n-dimensional finite elements model has been applied, so it is possible to get a solution for the problem solving a compatible and determined li...
This work aims at developing formulations and algorithms where maximum advantage of using Lagrangian...
The Lagrangian and the Generalized Linear Momentum are expressed in terms of a Constant of Motion of...
The Lagrangian representation of multi-Hamiltonian PDEs has been introduced by Y. Nutku and one o...
An activity fundamental to science is building mathematical models. These models are used to both pr...
Thesis (Ph. D.)--University of Washington, 1995A unified approach for modeling engineering systems i...
Classical mechanics is the branch of physics concerned with describing the motion of bodies. The sub...
Computer analysis of structures has traditionally been carried out using the displacement method com...
Augmented Lagrangian methods represent an efficient way to carry out the forward-dynamics simulation...
This book focuses on the interplay between Eulerian and Lagrangian conservation laws for systems tha...
This work presents a nonintrusive physics-preserving method to learn reduced-order models (ROMs) of ...
Augmented Lagrangian methods represent an efficient way to carry out the forward-dynamics simulation...
This paper briefly reveiws the two complementary descriptions of a dynamical system in its phase spa...
The work covers the development of Lagrangian formalism for investigation of systems with connection...
Classical mechanics is the study of the motion of particles, solid bodies or of systems of bodies, a...
AbstractIn this paper, we show how to study the evolution of a complex system, given imprecise knowl...
This work aims at developing formulations and algorithms where maximum advantage of using Lagrangian...
The Lagrangian and the Generalized Linear Momentum are expressed in terms of a Constant of Motion of...
The Lagrangian representation of multi-Hamiltonian PDEs has been introduced by Y. Nutku and one o...
An activity fundamental to science is building mathematical models. These models are used to both pr...
Thesis (Ph. D.)--University of Washington, 1995A unified approach for modeling engineering systems i...
Classical mechanics is the branch of physics concerned with describing the motion of bodies. The sub...
Computer analysis of structures has traditionally been carried out using the displacement method com...
Augmented Lagrangian methods represent an efficient way to carry out the forward-dynamics simulation...
This book focuses on the interplay between Eulerian and Lagrangian conservation laws for systems tha...
This work presents a nonintrusive physics-preserving method to learn reduced-order models (ROMs) of ...
Augmented Lagrangian methods represent an efficient way to carry out the forward-dynamics simulation...
This paper briefly reveiws the two complementary descriptions of a dynamical system in its phase spa...
The work covers the development of Lagrangian formalism for investigation of systems with connection...
Classical mechanics is the study of the motion of particles, solid bodies or of systems of bodies, a...
AbstractIn this paper, we show how to study the evolution of a complex system, given imprecise knowl...
This work aims at developing formulations and algorithms where maximum advantage of using Lagrangian...
The Lagrangian and the Generalized Linear Momentum are expressed in terms of a Constant of Motion of...
The Lagrangian representation of multi-Hamiltonian PDEs has been introduced by Y. Nutku and one o...