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The geometry of Jordan and Lie structures
The geometry of Jordan and Lie structures tries to answer the following question: what is the integrated, or geometric, version of real Jordan algebras, - triple systems and - pairs? Lie theory shows the way one has to go: Lie groups and symmetric spaces are the geometric version of Lie algebras and Lie triple systems. It turns out that both geometries are closely related via a functor between them, called the Jordan-Lie functor, which is constructed in this book. The reader is not assumed to have any knowledge of Jordan theory; the text can serve as a self-contained introduction to (real finite-dimensional) Jordan theory.
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- http://experiment.worldcat.org/entity/work/data/6193505#Topic/algebres_de_jordan
- http://id.worldcat.org/fast/998125
- http://experiment.worldcat.org/entity/work/data/6193505#Topic/jordan_algebra_lie_algebra_differentialgeometrie
- http://experiment.worldcat.org/entity/work/data/6193505#Topic/global_differential_geometry
- http://experiment.worldcat.org/entity/work/data/6193505#Topic/jordan_algebra
- http://experiment.worldcat.org/entity/work/data/6193505#Topic/algebry_jordana
- http://experiment.worldcat.org/entity/work/data/6193505#Topic/lie_algebra_s
- http://id.worldcat.org/fast/983985
- http://experiment.worldcat.org/entity/work/data/6193505#Topic/lie_algebra_de
- http://experiment.worldcat.org/entity/work/data/6193505#Topic/topological_groups
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- http://experiment.worldcat.org/entity/work/data/6193505#Topic/lie_algebras_de_libros_electronicos
- http://id.loc.gov/authorities/subjects/sh85070700
- http://experiment.worldcat.org/entity/work/data/6193505#Topic/algebry_lie_go
- http://experiment.worldcat.org/entity/work/data/6193505#Topic/grupy_lie_go
- http://experiment.worldcat.org/entity/work/data/6193505#Topic/algebre_de_jordan
- http://experiment.worldcat.org/entity/work/data/6193505#Topic/geometry_differential
- http://experiment.worldcat.org/entity/work/data/6193505#Topic/matematica
- http://experiment.worldcat.org/entity/work/data/6193505#Topic/lie_algebras
- http://experiment.worldcat.org/entity/work/data/6193505#Topic/jordan_algebras_de_libros_electronicos
- http://experiment.worldcat.org/entity/work/data/6193505#Topic/mathematics
- http://id.loc.gov/authorities/subjects/sh85076782
- http://experiment.worldcat.org/entity/work/data/6193505#Topic/jordan_algebres_de
- http://experiment.worldcat.org/entity/work/data/6193505#Topic/differentialgeometrie
- http://experiment.worldcat.org/entity/work/data/6193505#Topic/lie_algebres_de
- http://experiment.worldcat.org/entity/work/data/6193505#Topic/algebre_de_lie
- http://experiment.worldcat.org/entity/work/data/6193505#Topic/jordan_algebra_de
- http://experiment.worldcat.org/entity/work/data/6193505#Topic/jordan_algebra_s
- http://experiment.worldcat.org/entity/work/data/6193505#Topic/algebres_de_lie
- http://experiment.worldcat.org/entity/work/data/6193505#Topic/geometria_diferencial
- http://experiment.worldcat.org/entity/work/data/6193505#Topic/lie_algebra
- http://experiment.worldcat.org/entity/work/data/6193505#Topic/jordan_algebras
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- "The geometry of Jordan and Lie structures tries to answer the following question: what is the integrated, or geometric, version of real Jordan algebras, - triple systems and - pairs? Lie theory shows the way one has to go: Lie groups and symmetric spaces are the geometric version of Lie algebras and Lie triple systems. It turns out that both geometries are closely related via a functor between them, called the Jordan-Lie functor, which is constructed in this book. The reader is not assumed to have any knowledge of Jordan theory; the text can serve as a self-contained introduction to (real finite-dimensional) Jordan theory."@en
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- "Llibres electrònics"
- "Electronic books"@en
- "Elektronisches Buch"
- "Online-Publikation"
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