Norman Johnson

Combinatorics of Spreads and Parallelisms

Name: Combinatorics of Spreads and Parallelisms
Brand: Taylor & Francis Ltd
SKU: 9781032917849
Price: 69.99 EUR
Availability: InStock

★★★★★

€69.99

Product variants

A01=Norman Johnson

affine planes

Age Group_Uncategorized

Andre spreads

Author_Norman Johnson

automatic-update

baer

Baer Group

Baer Subplane

Beutelspacher's construction

Beutelspacher’s construction

Category1=Non-Fiction

Category=PBD

Category=PBF

Category=PBM

Category=PBV

collineation

Collineation Group

combinatorics

COP=United Kingdom

Delivery_Pre-order

derivable

Derivable Net

Desarguesian Plane

Desarguesian Spread

Dual Translation Plane

Elliptic Quadrics

eq_isMigrated=2

eq_new_release

flocks

focal-spreads

Full Collineation Group

group

Homology Group

Hyperbolic Quadric

Kernel Homology Group

Language_English

Ne Homology Group

Ne Plane

net

order

Order Q2

PA=Not yet available

Pappian Spread

parallelisms

partial

Partial Parallelism

Partial Spread

plane

Price_€50 to €100

Projective Space PG

PS=Forthcoming

Quadratic Cone

Quadratic Extension

quasi-subgeometry partitions

Regulus Net

softlaunch

Sperner spaces

Subgeometry Partitions

subgeometry partitions of projective spaces

subplane

transitive t-parallelisms

translation

Translation Plane

translation planes

Vector Space

vector spaces

Product details

ISBN 9781032917849
Weight: 453g
Dimensions: 156 x 234mm
Publication Date: 14 Oct 2024
Publisher: Taylor & Francis Ltd
Publication City/Country: GB
Product Form: Paperback
Language: English

Delivery/Collection within 10-20 working days

Our Delivery Time Frames Explained
2-4 Working Days: Available in-stock

10-20 Working Days: On Backorder

Will Deliver When Available: On Pre-Order or Reprinting

We ship your order once all items have arrived at our warehouse and are processed. Need those 2-4 day shipping items sooner? Just place a separate order for them!

Combinatorics of Spreads and Parallelisms covers all known finite and infinite parallelisms as well as the planes comprising them. It also presents a complete analysis of general spreads and partitions of vector spaces that provide groups enabling the construction of subgeometry partitions of projective spaces.

The book describes general partitions of finite and infinite vector spaces, including Sperner spaces, focal-spreads, and their associated geometries. Since retraction groups provide quasi-subgeometry and subgeometry partitions of projective spaces, the author thoroughly discusses subgeometry partitions and their construction methods. He also features focal-spreads as partitions of vector spaces by subspaces. In addition to presenting many new examples of finite and infinite parallelisms, the book shows that doubly transitive or transitive t-parallelisms cannot exist unless the parallelism is a line parallelism.

Along with the author’s other three books (Subplane Covered Nets, Foundations of Translation Planes, Handbook of Finite Translation Planes), this text forms a solid, comprehensive account of the complete theory of the geometries that are connected with translation planes in intricate ways. It explores how to construct interesting parallelisms and how general spreads of vector spaces are used to study and construct subgeometry partitions of projective spaces.

Norman L. Johnson is a professor in the Department of Mathematics at the University of Iowa.