On the intersection of two subgeometries of PG(n, q)

The study of the intersection of two Baer subgeometries of PG ( n , q ), q a square, started in Bose et al. (Utilitas Math 17 , 65–77, 1980); Bruen (Arch Math 39 (3), 285–288, (1982). Later, in Svéd (Baer subspaces in the n-dimensional projective space. Springer-Verlag) and Jagos et al. (Acta Sci Ma...

Full description

Saved in:

Bibliographic Details
Published in	Designs, codes, and cryptography Vol. 46; no. 3; pp. 261 - 267
Main Authors	Donati, Giorgio, Durante, Nicola
Format	Journal Article
Language	English
Published	Boston Springer US 01.03.2008
Subjects	Circuits Coding and Information Theory Computer Science Cryptology Data Structures and Information Theory Discrete Mathematics in Computer Science Information and Communication Collineations 51E20 Subgeometrics 05B25
Online Access	Get full text
ISSN	0925-1022 1573-7586
DOI	10.1007/s10623-007-9143-9

Cover

Loading…

More Information
Summary:	The study of the intersection of two Baer subgeometries of PG ( n , q ), q a square, started in Bose et al. (Utilitas Math 17 , 65–77, 1980); Bruen (Arch Math 39 (3), 285–288, (1982). Later, in Svéd (Baer subspaces in the n-dimensional projective space. Springer-Verlag) and Jagos et al. (Acta Sci Math 69 (1–2), 419–429, 2003), the structure of the intersection of two Baer subgeometries of PG ( n , q ) has been completely determined. In this paper, generalizing the previous results, we determine all possible intersection configurations of any two subgeometries of PG ( n , q ).
ISSN:	0925-1022 1573-7586
DOI:	10.1007/s10623-007-9143-9