AbstractWe define the notion of sub-Finsler geometry as a natural generalization of sub-Riemannian geometry with applications to optimal control theory. We compute a complete set of local invariants, geodesic equations, and the Jacobi operator for the three-dimensional case and investigate homogeneous examples
In this paper, we study the sub-Finsler geometry as a time-optimal control problem. In particular, w...
Abstract. Following an introduction to control theory, we show how Finsler geometries occur in certa...
The curvature discussed in this paper is a far reaching generalisation of the Riemannian sectional ...
Communicated by O. Kowalski We define the notion of sub-Finsler geometry as a natural generalization...
The curvature discussed in this paper is a far reaching generalisation of the Riemannian sectional c...
In this paper, we study the sub-Finsler geometry as a time-optimal control problem. In particular, w...
24 pages, 17 figuresIn this paper we study the sub-Finsler geometry as a time-optimal control proble...
24 pages, 17 figuresIn this paper we study the sub-Finsler geometry as a time-optimal control proble...
24 pages, 17 figuresIn this paper we study the sub-Finsler geometry as a time-optimal control proble...
Abstract. We analyze the geometry of sub-Finsler Engel manifolds, computing a complete set of local ...
International audienceWe consider specific sub-Finslerian structures in the neighborhood of 0 in R 2...
Abstract. A Finsler geometry may be understood as a homogeneous variational problem, where the Finsl...
Local geometry of sub-Finslerian structures in dimension 3 associated with a maximum norm are studie...
In this paper, we study the sub-Finsler geometry as a time-optimal control problem. In particular, w...
summary:A Finsler geometry may be understood as a homogeneous variational problem, where the Finsler...
In this paper, we study the sub-Finsler geometry as a time-optimal control problem. In particular, w...
Abstract. Following an introduction to control theory, we show how Finsler geometries occur in certa...
The curvature discussed in this paper is a far reaching generalisation of the Riemannian sectional ...
Communicated by O. Kowalski We define the notion of sub-Finsler geometry as a natural generalization...
The curvature discussed in this paper is a far reaching generalisation of the Riemannian sectional c...
In this paper, we study the sub-Finsler geometry as a time-optimal control problem. In particular, w...
24 pages, 17 figuresIn this paper we study the sub-Finsler geometry as a time-optimal control proble...
24 pages, 17 figuresIn this paper we study the sub-Finsler geometry as a time-optimal control proble...
24 pages, 17 figuresIn this paper we study the sub-Finsler geometry as a time-optimal control proble...
Abstract. We analyze the geometry of sub-Finsler Engel manifolds, computing a complete set of local ...
International audienceWe consider specific sub-Finslerian structures in the neighborhood of 0 in R 2...
Abstract. A Finsler geometry may be understood as a homogeneous variational problem, where the Finsl...
Local geometry of sub-Finslerian structures in dimension 3 associated with a maximum norm are studie...
In this paper, we study the sub-Finsler geometry as a time-optimal control problem. In particular, w...
summary:A Finsler geometry may be understood as a homogeneous variational problem, where the Finsler...
In this paper, we study the sub-Finsler geometry as a time-optimal control problem. In particular, w...
Abstract. Following an introduction to control theory, we show how Finsler geometries occur in certa...
The curvature discussed in this paper is a far reaching generalisation of the Riemannian sectional ...
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