Continuous Geometry

Name: Continuous Geometry
Brand: Princeton University Press
SKU: 9780691058931
Price: 112.99 EUR
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Product variants

A01=John von Neumann

Abstract algebra

Addition

Arithmetic

Associative property

Author_John von Neumann

Automorphism

Axiom

Baer ring

Big O notation

Boolean algebra (structure)

Bounded operator

Category=PBM

Category=PBP

Characterization (mathematics)

Complex number

Computation

Congruence relation

Dedekind cut

Dedekind–MacNeille completion

Dimension

Dimension (vector space)

Dimension function

Dimension theory (algebra)

Direct proof

Direct sum

Division algebra

Empty set

eq_isMigrated=1

eq_isMigrated=2

Existential quantification

Geometry

Greatest element

Hermitian adjoint

Hilbert space

Homogeneous coordinates

Hypercomplex number

Ideal (ring theory)

Identity element

Infimum and supremum

Integral domain

Irreducibility (mathematics)

Irreducible component

Join and meet

Lattice (order)

Limit point

Linear combination

Linear equation

Linear space (geometry)

Lipschitz continuity

Mathematical induction

Matrix ring

Modular lattice

Module (mathematics)

Non-Desarguesian plane

Orthogonal complement

Orthogonalization

Partially ordered set

Polynomial

Principal ideal

Relative dimension

Ring (mathematics)

Semi-simplicity

Set (mathematics)

Special case

Subsequence

Subset

Summation

Theorem

Transitive relation

Transpose

Unbounded operator

Uniqueness theorem

Upper and lower bounds

Variable (mathematics)

Zero element

Product details

ISBN 9780691058931
Weight: 425g
Dimensions: 197 x 254mm
Publication Date: 10 May 1998
Publisher: Princeton University Press
Publication City/Country: US
Product Form: Paperback

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In his work on rings of operators in Hilbert space, John von Neumann discovered a new mathematical structure that resembled the lattice system Ln. In characterizing its properties, von Neumann founded the field of continuous geometry. This book, based on von Neumann's lecture notes, begins with the development of the axioms of continuous geometry, dimension theory, and--for the irreducible case--the function D(a). The properties of regular rings are then discussed, and a variety of results are presented for lattices that are continuous geometries, for which irreducibility is not assumed. For students and researchers interested in ring theory or projective geometries, this book is required reading.

John von Neumann (1903-1957) was a Permanent Member of the Institute for Advanced Study in Princeton.