Add to ORKGExterior differential systems, Lie algebra cohomology, and the rigidity of homogenous varietie
The theory of exterior differential systems plays a crucial role in Cartan's whole mathematical prod...
Two central aspects of Cartan's approach to differential geometry are the theory of exterior differe...
An n -dimensional complex Lie algebra is rigid if its orbit under the canonical action of the full l...
summary:These are expository notes from the 2008 Srní Winter School. They have two purposes: (1) to ...
Abstract. These are expository notes from the 2008 Srní Winter School. They have two purposes: (1) t...
These are notes for a very rapid introduction to the basics of exterior differential systems and the...
We give an account of the construction of exterior differential systems based on the notion of table...
summary:The external derivative $d$ on differential manifolds inspires graded operators on complexes...
This a comprehensive modern account of the theory of Lie groupoids and Lie algebroids, and their imp...
In this article we introduce a new language to describe many problems of differential geometry: for ...
This concise and practical textbook presents the essence of the theory on smooth manifolds. A key co...
In this paper we apply the Cartan-Kähler theory of exterior differential systems to solve the Cauchy...
Preface: To the reader who wants to dip a toe in the water: read chapter 1. The reader who continues...
The smoothness of a morphism between noetherian schemes can be recognized in terms of the induced ma...
We consider purely algebraic data generalizing the notion of a smooth differentiable manifold. It is...
The theory of exterior differential systems plays a crucial role in Cartan's whole mathematical prod...
Two central aspects of Cartan's approach to differential geometry are the theory of exterior differe...
An n -dimensional complex Lie algebra is rigid if its orbit under the canonical action of the full l...
summary:These are expository notes from the 2008 Srní Winter School. They have two purposes: (1) to ...
Abstract. These are expository notes from the 2008 Srní Winter School. They have two purposes: (1) t...
These are notes for a very rapid introduction to the basics of exterior differential systems and the...
We give an account of the construction of exterior differential systems based on the notion of table...
summary:The external derivative $d$ on differential manifolds inspires graded operators on complexes...
This a comprehensive modern account of the theory of Lie groupoids and Lie algebroids, and their imp...
In this article we introduce a new language to describe many problems of differential geometry: for ...
This concise and practical textbook presents the essence of the theory on smooth manifolds. A key co...
In this paper we apply the Cartan-Kähler theory of exterior differential systems to solve the Cauchy...
Preface: To the reader who wants to dip a toe in the water: read chapter 1. The reader who continues...
The smoothness of a morphism between noetherian schemes can be recognized in terms of the induced ma...
We consider purely algebraic data generalizing the notion of a smooth differentiable manifold. It is...
The theory of exterior differential systems plays a crucial role in Cartan's whole mathematical prod...
Two central aspects of Cartan's approach to differential geometry are the theory of exterior differe...
An n -dimensional complex Lie algebra is rigid if its orbit under the canonical action of the full l...