In this paper we construct a family of covariant functors from the category of finite dimensional smooth vector bundles over a fixed differentiable manifold M to the category of smooth vector bundles with differentiable structures modelled on Banach spaces
AbstractIf G is a compact Lie group acting smoothly on a manifold M, we prove that a G-invariant nei...
summary:A Finsler geometry may be understood as a homogeneous variational problem, where the Finsler...
Abstract. We approach the study of differentiable manifolds modeled on Banach spaces by means of Non...
We consider differentiable maps in the framework of Abstract Differential Geometry and we prove a nu...
The book is devoted to recent research in the global variational theory on smooth manifolds. Its mai...
Let M be a finite-dimensional differentiable manifold. We will denote the space of smooth vector fie...
We construct differentiable manifolds modelled on locally convex spaces using Yamamuro ' s theory o...
Diffeological and differential spaces are generalisations of smooth structures on manifolds. We show...
Systems of ordinary differential equations (or dynamical forms in Lagrangian mechanics), induced by ...
The tangent bundle on a smooth manifold is, in a sense, sufficient structure for Lagrangian mechani...
A solution of a differential system can be interpreted as a maximal submanifold determined by the Ca...
A solution of a differential system can be interpreted as a maximal submanifold determined by the Ca...
This tutorial will show how algebraic structure in tangent categories can capture geometric differen...
The main categories of study in this thesis are the categories of diffeological and Fr\ olicher spac...
õ 1. The class ((Nn)) of differentiable manifolds M n. For n> 1, let N n be a compact, connected,...
AbstractIf G is a compact Lie group acting smoothly on a manifold M, we prove that a G-invariant nei...
summary:A Finsler geometry may be understood as a homogeneous variational problem, where the Finsler...
Abstract. We approach the study of differentiable manifolds modeled on Banach spaces by means of Non...
We consider differentiable maps in the framework of Abstract Differential Geometry and we prove a nu...
The book is devoted to recent research in the global variational theory on smooth manifolds. Its mai...
Let M be a finite-dimensional differentiable manifold. We will denote the space of smooth vector fie...
We construct differentiable manifolds modelled on locally convex spaces using Yamamuro ' s theory o...
Diffeological and differential spaces are generalisations of smooth structures on manifolds. We show...
Systems of ordinary differential equations (or dynamical forms in Lagrangian mechanics), induced by ...
The tangent bundle on a smooth manifold is, in a sense, sufficient structure for Lagrangian mechani...
A solution of a differential system can be interpreted as a maximal submanifold determined by the Ca...
A solution of a differential system can be interpreted as a maximal submanifold determined by the Ca...
This tutorial will show how algebraic structure in tangent categories can capture geometric differen...
The main categories of study in this thesis are the categories of diffeological and Fr\ olicher spac...
õ 1. The class ((Nn)) of differentiable manifolds M n. For n> 1, let N n be a compact, connected,...
AbstractIf G is a compact Lie group acting smoothly on a manifold M, we prove that a G-invariant nei...
summary:A Finsler geometry may be understood as a homogeneous variational problem, where the Finsler...
Abstract. We approach the study of differentiable manifolds modeled on Banach spaces by means of Non...