Classical geometries in modern contexts : geometry of real inner product spaces

Resource Information

The work Classical geometries in modern contexts : geometry of real inner product spaces represents a distinct intellectual or artistic creation found in University of Missouri Libraries. This resource is a combination of several types including: Work, Language Material, Books.

Label

Classical geometries in modern contexts : geometry of real inner product spaces

Title remainder

geometry of real inner product spaces

Statement of responsibility

Walter Benz

Creator

• Benz, Walter, 1931-

Subject

• Complexes
• Complexes
• Complexes
• Conformal geometry
• Conformal geometry
• Conformal geometry
• Conformal geometry
• Functional equations
• Functional equations
• Functional equations
• Functional equations
• General relativity (Physics)
• General relativity (Physics)
• General relativity (Physics)
• General relativity (Physics)
• Lie algebras
• Lie algebras
• Lie algebras
• Lie algebras
• MATHEMATICS -- Geometry | General
• Complexes

Language

eng

Summary

Presents the real inner product spaces of arbitrary (finite or infinite) dimension greater than or equal to 2. This book studies the sphere geometries of Mobius and Lie for these spaces, besides euclidean and hyperbolic geometry, as well as geometries where Lorentz transformations play the key role

Is part of

• Springer e-books

Cataloging source

COO

Dewey number

516

Index

index present

LC call number

QA431

LC item number

.B39 2005

Literary form

non fiction

Nature of contents

• dictionaries
• bibliography