Exploration of kinematic optimal control on the lie group S0(3)

A. Saccon; J. Hauser; A. Pedro Aguiar

doi:10.3182/20100901-3-IT-2016.00237

Exploration of kinematic optimal control on the lie group S0(3)

A. Saccon, J. Hauser, A. Pedro Aguiar

Research output: Contribution to journal › Conference article › peer-review

13 Citations (Scopus)

Abstract

In this paper, we investigate a generalization of the infinite time horizon linear quadratic regulator (LQR) for systems evolving on the special orthogonal group SO(3). Using Pontryagin’s Maximum Principle, we derive the necessary conditions for optimality and the associated Hamiltonian equations. For a special class of weighting matrices, we show that the optimal feedback can be computed explicitly and we prove that the non differentiable value function is the viscosity solution of an appropriate Hamiltn-Jacobi-Bellman equation on SO(3). For arbitrary positive definite weighting matrices, numerical simulations allow us to explore the relationship between the optimal trajectories and weighting matrices, and in particular to highlight nontrivial non differentiability properties of the value function.

Original language	English
Pages (from-to)	1302-1307
Number of pages	6
Journal	IFAC Proceedings Volumes
Volume	43
Issue number	14
DOIs	https://doi.org/10.3182/20100901-3-IT-2016.00237
Publication status	Published - 2010
Externally published	Yes
Event	8th IFAC Symposium on Nonlinear Control Systems - Bologna, Italy Duration: 1 Sept 2010 → 3 Sept 2010

Keywords

Hamilton-Jacobi-Bellman equation
Lie groups
Optimal control
Pontryagin's Maximum Principle
Rotation matrices
Special orthogonal group SO(3)

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10.3182/20100901-3-IT-2016.00237

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title = "Exploration of kinematic optimal control on the lie group S0(3)",

abstract = "In this paper, we investigate a generalization of the infinite time horizon linear quadratic regulator (LQR) for systems evolving on the special orthogonal group SO(3). Using Pontryagin{\textquoteright}s Maximum Principle, we derive the necessary conditions for optimality and the associated Hamiltonian equations. For a special class of weighting matrices, we show that the optimal feedback can be computed explicitly and we prove that the non differentiable value function is the viscosity solution of an appropriate Hamiltn-Jacobi-Bellman equation on SO(3). For arbitrary positive definite weighting matrices, numerical simulations allow us to explore the relationship between the optimal trajectories and weighting matrices, and in particular to highlight nontrivial non differentiability properties of the value function.",

keywords = "Hamilton-Jacobi-Bellman equation, Lie groups, Optimal control, Pontryagin's Maximum Principle, Rotation matrices, Special orthogonal group SO(3)",

author = "A. Saccon and J. Hauser and {Pedro Aguiar}, A.",

year = "2010",

doi = "10.3182/20100901-3-IT-2016.00237",

language = "English",

volume = "43",

pages = "1302--1307",

journal = "IFAC Proceedings Volumes",

issn = "1474-6670",

publisher = "Elsevier",

number = "14",

note = "8th IFAC Symposium on Nonlinear Control Systems ; Conference date: 01-09-2010 Through 03-09-2010",

}

TY - JOUR

T1 - Exploration of kinematic optimal control on the lie group S0(3)

AU - Saccon, A.

AU - Hauser, J.

AU - Pedro Aguiar, A.

PY - 2010

Y1 - 2010

N2 - In this paper, we investigate a generalization of the infinite time horizon linear quadratic regulator (LQR) for systems evolving on the special orthogonal group SO(3). Using Pontryagin’s Maximum Principle, we derive the necessary conditions for optimality and the associated Hamiltonian equations. For a special class of weighting matrices, we show that the optimal feedback can be computed explicitly and we prove that the non differentiable value function is the viscosity solution of an appropriate Hamiltn-Jacobi-Bellman equation on SO(3). For arbitrary positive definite weighting matrices, numerical simulations allow us to explore the relationship between the optimal trajectories and weighting matrices, and in particular to highlight nontrivial non differentiability properties of the value function.

AB - In this paper, we investigate a generalization of the infinite time horizon linear quadratic regulator (LQR) for systems evolving on the special orthogonal group SO(3). Using Pontryagin’s Maximum Principle, we derive the necessary conditions for optimality and the associated Hamiltonian equations. For a special class of weighting matrices, we show that the optimal feedback can be computed explicitly and we prove that the non differentiable value function is the viscosity solution of an appropriate Hamiltn-Jacobi-Bellman equation on SO(3). For arbitrary positive definite weighting matrices, numerical simulations allow us to explore the relationship between the optimal trajectories and weighting matrices, and in particular to highlight nontrivial non differentiability properties of the value function.

KW - Hamilton-Jacobi-Bellman equation

KW - Lie groups

KW - Optimal control

KW - Pontryagin's Maximum Principle

KW - Rotation matrices

KW - Special orthogonal group SO(3)

U2 - 10.3182/20100901-3-IT-2016.00237

DO - 10.3182/20100901-3-IT-2016.00237

M3 - Conference article

SN - 1474-6670

VL - 43

SP - 1302

EP - 1307

JO - IFAC Proceedings Volumes

JF - IFAC Proceedings Volumes

IS - 14

T2 - 8th IFAC Symposium on Nonlinear Control Systems

Y2 - 1 September 2010 through 3 September 2010

ER -

Exploration of kinematic optimal control on the lie group S0(3)

Abstract

Keywords

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