Hybrid Routhian Reduction of Lagrangian Hybrid Systems

Hybrid Routhian Reduction of Lagrangian Hybrid Systems
Aaron Ames, Shankar Sastry

Citation
Aaron Ames, Shankar Sastry. "Hybrid Routhian Reduction of Lagrangian Hybrid Systems". American Control Conference, June, 2006.

Abstract
This paper extends Routhian reduction to a hybrid setting, i.e., to systems that display both continuous and discrete behavior. We begin by considering a Lagrangian together with a configuration space with unilateral constraints on the set of admissible configurations. This naturally yields the notion of a hybrid Lagrangian, from which we obtain a Lagrangian hybrid system in a way analogous to the association of a Lagrangian vector field to a Lagrangian. We first give general conditions on when it is possible to reduce a cyclic Lagrangian hybrid system, and explicitly compute the reduced Lagrangian hybrid system in the case when it is obtained from a cyclic hybrid Lagrangian.

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Citation formats

HTML

Aaron Ames, Shankar Sastry. <a
href="http://chess.eecs.berkeley.edu/pubs/257.html"
>Hybrid Routhian Reduction of Lagrangian Hybrid
Systems</a>, American Control Conference, June, 2006.

Plain text

Aaron Ames, Shankar Sastry. "Hybrid Routhian Reduction
of Lagrangian Hybrid Systems". American Control
Conference, June, 2006.

BibTeX

@inproceedings{AmesSastry06_HybridRouthianReductionOfLagrangianHybridSystems,
    author = {Aaron Ames and Shankar Sastry},
    title = {Hybrid Routhian Reduction of Lagrangian Hybrid
              Systems},
    booktitle = {American Control Conference},
    month = {June},
    year = {2006},
    abstract = {This paper extends Routhian reduction to a hybrid
              setting, i.e., to systems that display both
              continuous and discrete behavior. We begin by
              considering a Lagrangian together with a
              configuration space with unilateral constraints on
              the set of admissible configurations. This
              naturally yields the notion of a hybrid
              Lagrangian, from which we obtain a Lagrangian
              hybrid system in a way analogous to the
              association of a Lagrangian vector field to a
              Lagrangian. We first give general conditions on
              when it is possible to reduce a cyclic Lagrangian
              hybrid system, and explicitly compute the reduced
              Lagrangian hybrid system in the case when it is
              obtained from a cyclic hybrid Lagrangian.},
    URL = {http://chess.eecs.berkeley.edu/pubs/257.html}
}

Posted by Aaron Ames on 16 May 2007.
Groups: chess
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