ABSTRACT
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
TABLE OF CONTENTS
part |2 pages
Part 1. Partitions of Vector Spaces
part |2 pages
Part 2. Subgeometry Partitions
part |2 pages
Part 3. Subplane Covered Nets and Baer Groups
part |2 pages
Part 4. Flocks and Related Geometries
part |2 pages
Part 5. Derivable Geometries
part |2 pages
Part 6. Constructions of Parallelisms
part |2 pages
Part 8. Coset Switching
part |2 pages
Part 9. Transitivity
part |2 pages
Part 10. Appendices