Add to ORKGMany geometrical features of manifolds and fibre bundles modelled on Fréchet spaces either cannot be defined or are difficult to handle directly. This is due to the inherent deficiencies of Fréchet spaces; for example, the lack of a general solvability theory for differential equations, the non-existence of a reasonable Lie group structure on the general linear group of a Fréchet space, and the non-existence of an exponential map in a Fréchet-Lie group. In this book, the authors describe in detail a new approach that overcomes many of these limitations by using projective limits of geometrical objects modelled on Banach spaces. It will appeal to researchers and graduate students from a variety of backgrounds with an interest in infinite-dim...
This monograph gives an overview of various classes of infinite-dimensional Lie groups and their app...
A geometric transition is a continuous path of geometric structures that changes type, meaning that ...
The key idea in geometric group theory is to study infinite groups by endowing them with a metric an...
A new approach to studying Fréchet geometry using projective limits of geometrical objects modelled ...
Some recent work in Fréchet geometry is briefly reviewed. In particular an earlier result on the st...
We give an integrability criterion for a projective limit of Banach distributions on a Fréchet manif...
Some recent work in Frechet geometry is briefly reviewed. In particular an earlier result on the str...
The present document is the draft of a book which presents an introduction to infinite-dimensional d...
Ambrose, Palais and Singer introduced the concept of second order structures on finite dimensional m...
AbstractIn this paper we show that the solution set of certain Volterra inclusions defined between F...
On a smooth manifold M, the vector bundle structures of the second order tangent bundle, T^2M biject...
Abstract. On a smooth manifold M, the vector bundle structures of the second order tangent bundle, T...
In this short note, we give an obstruction to obtain examples of higher dimensional manifolds with i...
A characterisation is given of all topological spaces that can be obtained as quotients $ mathbb D /...
This is a unified treatment of the various algebraic approaches to geometric spaces. The study of al...
This monograph gives an overview of various classes of infinite-dimensional Lie groups and their app...
A geometric transition is a continuous path of geometric structures that changes type, meaning that ...
The key idea in geometric group theory is to study infinite groups by endowing them with a metric an...
A new approach to studying Fréchet geometry using projective limits of geometrical objects modelled ...
Some recent work in Fréchet geometry is briefly reviewed. In particular an earlier result on the st...
We give an integrability criterion for a projective limit of Banach distributions on a Fréchet manif...
Some recent work in Frechet geometry is briefly reviewed. In particular an earlier result on the str...
The present document is the draft of a book which presents an introduction to infinite-dimensional d...
Ambrose, Palais and Singer introduced the concept of second order structures on finite dimensional m...
AbstractIn this paper we show that the solution set of certain Volterra inclusions defined between F...
On a smooth manifold M, the vector bundle structures of the second order tangent bundle, T^2M biject...
Abstract. On a smooth manifold M, the vector bundle structures of the second order tangent bundle, T...
In this short note, we give an obstruction to obtain examples of higher dimensional manifolds with i...
A characterisation is given of all topological spaces that can be obtained as quotients $ mathbb D /...
This is a unified treatment of the various algebraic approaches to geometric spaces. The study of al...
This monograph gives an overview of various classes of infinite-dimensional Lie groups and their app...
A geometric transition is a continuous path of geometric structures that changes type, meaning that ...
The key idea in geometric group theory is to study infinite groups by endowing them with a metric an...