Add to ORKGdepending on triples of points (x, a, z), exchanging x and z and fixing a. In a similar way, symmetric spaces have been defined by Loos ([Lo69]) as spaces equipped with point reflections Sx fixing x, and therefore the theories of Jordan geometries and of symmetric spaces are closely related to each other – in order to describe this link, the notion of inversive action of torsors and of symmetric spaces is introduced. Jordan geometries give rise both to inversive actions of certain abelian torsors and of certain symmetric spaces, which in a sense are dual to each other. By using the algebraic differential calculus dveloped in [Be14], we attach a tangent object to such geometries, namely a Jordan pair, resp. a Jordan algebra. The present appr...
AbstractIt is well known that by means of the right and left products of an associative dialgebra we...
This study proposes the characterization of geometric transformations in space, with particular refe...
New objects characterizing the structure of complex linear transformations were introduced. These ne...
We define symmetric spaces in arbitrary dimension and over arbitrary non-discrete topological fields...
In this work we introduce generalized projective geometries which are a natural generalization of pr...
The geometry of Jordan and Lie structures tries to answer the following question: what is the integr...
summary:In these lecture notes we report on research aiming at understanding the relation beween alg...
Abstract. We give an overview over constructions of geometries associated to Jor-dan structures (alg...
. We determine the causal transformations of a class of causal symmetric spaces (Th. 2.4.1). As a ba...
Presents recent advances of Jordan theory in differential geometry, complex and functional analysis,...
Grids are special families of tripotents in Jordan triple systems. This research monograph presents ...
AbstractIn this paper, I give two very direct proves of the correspondance between a geometric objec...
In the present article we introduce and study a class of topological reflectionspaces that we call K...
AbstractWe extend Hua’s fundamental theorem of the geometry of symmetric matrices to the infinite-di...
v2: new results on relation with lattice theory added (Th. 2.4) v3: title and terminology changed: "...
AbstractIt is well known that by means of the right and left products of an associative dialgebra we...
This study proposes the characterization of geometric transformations in space, with particular refe...
New objects characterizing the structure of complex linear transformations were introduced. These ne...
We define symmetric spaces in arbitrary dimension and over arbitrary non-discrete topological fields...
In this work we introduce generalized projective geometries which are a natural generalization of pr...
The geometry of Jordan and Lie structures tries to answer the following question: what is the integr...
summary:In these lecture notes we report on research aiming at understanding the relation beween alg...
Abstract. We give an overview over constructions of geometries associated to Jor-dan structures (alg...
. We determine the causal transformations of a class of causal symmetric spaces (Th. 2.4.1). As a ba...
Presents recent advances of Jordan theory in differential geometry, complex and functional analysis,...
Grids are special families of tripotents in Jordan triple systems. This research monograph presents ...
AbstractIn this paper, I give two very direct proves of the correspondance between a geometric objec...
In the present article we introduce and study a class of topological reflectionspaces that we call K...
AbstractWe extend Hua’s fundamental theorem of the geometry of symmetric matrices to the infinite-di...
v2: new results on relation with lattice theory added (Th. 2.4) v3: title and terminology changed: "...
AbstractIt is well known that by means of the right and left products of an associative dialgebra we...
This study proposes the characterization of geometric transformations in space, with particular refe...
New objects characterizing the structure of complex linear transformations were introduced. These ne...