Geometric Hamiltonian Formulation of a Variational Problem Depending on the Covariant Acceleration

Singularities of the Hamiltonian Vectorfield in Optimal Control Problems

Mena-Matos, Helena

February 2001

AbstractVariational problems with n degrees of freedom give rise (by the Pontriaguine maximum princi...

Marin Kobilarov
David
Martín De Diego

August 2016

Abstract. This paper develops numerical methods for optimal control of mechanical systems in the Lag...

Submitted to ESAIM: Control, Optimisation and Calculus of Variations Pontryagin’s Minimum Principle for simple mechanical systems on Riemannian manifolds and Lie Groups

R. V. Iyer

January 2015

Pontryagin’s Minimum principle for optimal control had earlier been extended to non-linear systems d...

Geometric Hamiltonian formulation of a variational problem depending on the covariant acceleration

Abrunheiro, Lígia
Camarinha, Margarida
Clemente-Gallardo, Jesús

January 2013

We consider a second-order variational problem depending on the covariant acceleration, which is rel...

Geometric Hamiltonian Formulation of a Variational Problem Depending on the Covariant Acceleration

Abrunheiro, Lígia
Camarinha, Margarida
Clemente-Gallardo, Jesús

January 2013

In this work we consider a second order variational problem depending on the covariant acceleration,...

Preprint Number 09–05 CUBIC POLYNOMIALS AND OPTIMAL CONTROL ON COMPACT LIE GROUPS

L. Abrunheiro
M. Camarinha
J. Clemente-gallardo

July 2015

Abstract: This paper analyzes the Riemannian cubic polynomials’s problem from a Hamiltonian point of...

Geometric integrators for higherorder mechanics on Lie groups. ArXiv e-prints

Christopher L. Burnett
Darryl D. Holm
David M. Meier

January 2011

This paper develops a structure-preserving numerical integration scheme for a class of higher-order ...

On the geometry of higher-order variational problems on Lie groups, April 2011. Preprint available at http://arxiv.org/abs/1104.3221

Leonardo Colombo
David
Martín De Diego

August 2016

Abstract. In this paper, we describe a geometric setting for higher-order la-grangian problems on Li...

GEOMETRIC INTEGRATORS FOR HIGHER-ORDER VARIATIONAL SYSTEMS AND THEIR APPLICATION TO OPTIMAL CONTROL

Leonardo Colombo
David
Martín De Diego

August 2016

Abstract. Numerical methods that preserve geometric invariants of the system, such as energy, moment...

Geometry of optimal control problems and Hamiltonian systems

Agrachev, Andrey

January 2008

We explain a general variational and dynamical nature of nice and powerful concepts and results main...

OPTIMAL CONTROL OF UNDERACTUATED MECHANICAL SYSTEMS: A GEOMETRIC APPROACH

Leonardo Colombo
De Diego
Marcela Zuccalli

August 2016

Abstract. In this paper, we consider a geometric formalism for optimal control of under-actuated mec...

Invariant higher-order variational problems: Reduction, geometry and applications

Meier, David

November 2013

This thesis is centred around higher-order invariant variational problems defined on Lie groups. We ...

Hyperbolicity and curvature in dynamics and control

Chittaro, Francesca Carlotta

October 2007

In this thesis, we will use some techniques developed in the frame of Optimal Control Theory and som...

Variational and optimal control approaches for the second-order Herglotz problem on spheres

Machado, Luís
Abrunheiro, Lígia
Martins, Natália

January 2019

The present paper extends the classical second–order variational problem of Herglotz type to the mor...

High-precision algorithms for constructing optimal trajectories via solving Hamiltonian systems

Krasovskii, A.A.
Tarasyev, A.M.

May 2009

The paper deals with analysis of optimal control problems arising in models of economic growth. The ...

Singularities of the Hamiltonian Vectorfield in Optimal Control Problems

Mena-Matos, Helena

February 2001

AbstractVariational problems with n degrees of freedom give rise (by the Pontriaguine maximum princi...

DISCRETE VARIATIONAL OPTIMAL CONTROL

Marin Kobilarov
David
Martín De Diego

August 2016

Abstract. This paper develops numerical methods for optimal control of mechanical systems in the Lag...

Submitted to ESAIM: Control, Optimisation and Calculus of Variations Pontryagin’s Minimum Principle for simple mechanical systems on Riemannian manifolds and Lie Groups

R. V. Iyer

January 2015

Pontryagin’s Minimum principle for optimal control had earlier been extended to non-linear systems d...

Geometric Hamiltonian formulation of a variational problem depending on the covariant acceleration

Abrunheiro, Lígia
Camarinha, Margarida
Clemente-Gallardo, Jesús

January 2013

We consider a second-order variational problem depending on the covariant acceleration, which is rel...

Geometric Hamiltonian Formulation of a Variational Problem Depending on the Covariant Acceleration

Abrunheiro, Lígia
Camarinha, Margarida
Clemente-Gallardo, Jesús

January 2013

In this work we consider a second order variational problem depending on the covariant acceleration,...

Preprint Number 09–05 CUBIC POLYNOMIALS AND OPTIMAL CONTROL ON COMPACT LIE GROUPS

L. Abrunheiro
M. Camarinha
J. Clemente-gallardo

July 2015

Abstract: This paper analyzes the Riemannian cubic polynomials’s problem from a Hamiltonian point of...

Geometric integrators for higherorder mechanics on Lie groups. ArXiv e-prints

Christopher L. Burnett
Darryl D. Holm
David M. Meier

January 2011

This paper develops a structure-preserving numerical integration scheme for a class of higher-order ...

On the geometry of higher-order variational problems on Lie groups, April 2011. Preprint available at http://arxiv.org/abs/1104.3221

Leonardo Colombo
David
Martín De Diego

August 2016

Abstract. In this paper, we describe a geometric setting for higher-order la-grangian problems on Li...

GEOMETRIC INTEGRATORS FOR HIGHER-ORDER VARIATIONAL SYSTEMS AND THEIR APPLICATION TO OPTIMAL CONTROL

Leonardo Colombo
David
Martín De Diego

August 2016

Abstract. Numerical methods that preserve geometric invariants of the system, such as energy, moment...

Geometry of optimal control problems and Hamiltonian systems

Agrachev, Andrey

January 2008

We explain a general variational and dynamical nature of nice and powerful concepts and results main...

OPTIMAL CONTROL OF UNDERACTUATED MECHANICAL SYSTEMS: A GEOMETRIC APPROACH

Leonardo Colombo
De Diego
Marcela Zuccalli

August 2016

Abstract. In this paper, we consider a geometric formalism for optimal control of under-actuated mec...

Invariant higher-order variational problems: Reduction, geometry and applications

Meier, David

November 2013

This thesis is centred around higher-order invariant variational problems defined on Lie groups. We ...

Hyperbolicity and curvature in dynamics and control

Chittaro, Francesca Carlotta

October 2007

In this thesis, we will use some techniques developed in the frame of Optimal Control Theory and som...

Variational and optimal control approaches for the second-order Herglotz problem on spheres

Machado, Luís
Abrunheiro, Lígia
Martins, Natália

January 2019

The present paper extends the classical second–order variational problem of Herglotz type to the mor...

High-precision algorithms for constructing optimal trajectories via solving Hamiltonian systems

Krasovskii, A.A.
Tarasyev, A.M.

May 2009

The paper deals with analysis of optimal control problems arising in models of economic growth. The ...

Singularities of the Hamiltonian Vectorfield in Optimal Control Problems

Mena-Matos, Helena

February 2001

AbstractVariational problems with n degrees of freedom give rise (by the Pontriaguine maximum princi...

DISCRETE VARIATIONAL OPTIMAL CONTROL

Marin Kobilarov
David
Martín De Diego

August 2016

Abstract. This paper develops numerical methods for optimal control of mechanical systems in the Lag...

Submitted to ESAIM: Control, Optimisation and Calculus of Variations Pontryagin’s Minimum Principle for simple mechanical systems on Riemannian manifolds and Lie Groups

R. V. Iyer

January 2015

Pontryagin’s Minimum principle for optimal control had earlier been extended to non-linear systems d...

Geometric Hamiltonian Formulation of a Variational Problem Depending on the Covariant Acceleration

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Geometric Hamiltonian Formulation of a Variational Problem Depending on the Covariant Acceleration

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