ON THE NUMBER OF CYCLIC PROJECTIVE-PLANES

Authors
KONVALINA J
Citation
J. Konvalina, ON THE NUMBER OF CYCLIC PROJECTIVE-PLANES, Advances in applied mathematics, 20(1), 1998, pp. 130-140
Citations number
14
Categorie Soggetti
Mathematics,Mathematics
Journal title
Advances in applied mathematicsACNP
ISSN journal
01968858
Volume
20
Issue
1
Year of publication
1998
Pages
130 - 140
Database
ISI
SICI code
0196-8858(1998)20:1<130:OTNOCP>2.0.ZU;2-G
Abstract
An explicit formula for the number of finite cyclic projective planes (or planar difference sets) is derived by applying Ramanujan sums (Von Sterneck numbers) and Mobius inversion over the set partition lattice to counting one-to-one solution vectors of multivariable linear congr uences. (C) 1998 Academic Press.