Add to ORKGGiven a smooth family of unparameterized curves such that through every point in every direction there passes exactly one curve, does there exist a Lagrangian with extremals being precisely this family? It is known that in dimension 2 the answer is positive. In dimension 3, it follows from the work of Douglas that the answer is, in general, negative. We generalise this result to all higher dimensions and show that the answer is actually negative for almost every such a family of curves, also known as path structure or path geometry. On the other hand, we consider path geometries possessing infinitesimal symmetries and show that path and projective structures with submaximal symmetry dimensions are variational. Note that the projective struc...
Whereas in a coordinate-dependent setting the Euler-Lagrange equations establish necessary condition...
AbstractWe consider a family of natural variational problems in the Grassmannian of a C*-algebra wit...
summary:A Finsler geometry may be understood as a homogeneous variational problem, where the Finsler...
We study collections of paths—i.e., unparametrized curves—on a manifold such that through every poin...
We study collections of paths—i.e., unparametrized curves—on a manifold such that through every poin...
We study collections of paths—i.e., unparametrized curves—on a manifold such that through every poin...
AbstractWe show that for n⩾3 the following equivalence problems are essentially the same: the equiva...
We classify extremal curves in free nilpotent Lie groups. The classification is obtained via an expl...
We classify extremal curves in free nilpotent Lie groups. The classification is obtained via an expl...
AbstractThe postulation of a space curve is a classifying invariant which computes for any integer n...
In this work we study extremals on three-dimensional connected Lie groups $G$ endowed with a left in...
We classify extremal curves in free nilpotent Lie groups. The classification is obtained via an expl...
In this paper we consider the class a functionals (introduced by Brancolini, Buttazzo, and Santambro...
We classify extremal curves in free nilpotent Lie groups. The classification is obtained via an expl...
Working over imperfect fields, we give a comprehensive classification of genus-one curves that are r...
Whereas in a coordinate-dependent setting the Euler-Lagrange equations establish necessary condition...
AbstractWe consider a family of natural variational problems in the Grassmannian of a C*-algebra wit...
summary:A Finsler geometry may be understood as a homogeneous variational problem, where the Finsler...
We study collections of paths—i.e., unparametrized curves—on a manifold such that through every poin...
We study collections of paths—i.e., unparametrized curves—on a manifold such that through every poin...
We study collections of paths—i.e., unparametrized curves—on a manifold such that through every poin...
AbstractWe show that for n⩾3 the following equivalence problems are essentially the same: the equiva...
We classify extremal curves in free nilpotent Lie groups. The classification is obtained via an expl...
We classify extremal curves in free nilpotent Lie groups. The classification is obtained via an expl...
AbstractThe postulation of a space curve is a classifying invariant which computes for any integer n...
In this work we study extremals on three-dimensional connected Lie groups $G$ endowed with a left in...
We classify extremal curves in free nilpotent Lie groups. The classification is obtained via an expl...
In this paper we consider the class a functionals (introduced by Brancolini, Buttazzo, and Santambro...
We classify extremal curves in free nilpotent Lie groups. The classification is obtained via an expl...
Working over imperfect fields, we give a comprehensive classification of genus-one curves that are r...
Whereas in a coordinate-dependent setting the Euler-Lagrange equations establish necessary condition...
AbstractWe consider a family of natural variational problems in the Grassmannian of a C*-algebra wit...
summary:A Finsler geometry may be understood as a homogeneous variational problem, where the Finsler...