TY - JOUR

T1 - Einbettung gewisser Kettengeometrien in projektive Räume

AU - Hotje, Herbert

PY - 1974/3

Y1 - 1974/3

N2 - The theory of "chain geometries" as represented in [2] is a generalisation of the concept of Möbius-, Laguerre- and pseudo-euclidean planes over a commutative field K. It is well known that these geometries can be represented as a 2-dimensional variety of the 3-dimensional projective space over K. It will be shown how to embed in a similar way a class of "chain geometries", which covers these planes. The algebras belonging to these geometries are the kinematic algebras, studied by H.KARZEL, in which x2∃ Kx+K for each element x of the algebra. If the algebra is of rank n the geometry will be represented on a n-dimensional algebraic variety of the (n+1)-dimensional projective space π, the chains being the intersection of with planes of π having no line but at least two points in common with.

AB - The theory of "chain geometries" as represented in [2] is a generalisation of the concept of Möbius-, Laguerre- and pseudo-euclidean planes over a commutative field K. It is well known that these geometries can be represented as a 2-dimensional variety of the 3-dimensional projective space over K. It will be shown how to embed in a similar way a class of "chain geometries", which covers these planes. The algebras belonging to these geometries are the kinematic algebras, studied by H.KARZEL, in which x2∃ Kx+K for each element x of the algebra. If the algebra is of rank n the geometry will be represented on a n-dimensional algebraic variety of the (n+1)-dimensional projective space π, the chains being the intersection of with planes of π having no line but at least two points in common with.

UR - http://www.scopus.com/inward/record.url?scp=25444447882&partnerID=8YFLogxK

U2 - 10.1007/BF01954538

DO - 10.1007/BF01954538

M3 - Artikel

AN - SCOPUS:25444447882

VL - 5

SP - 85

EP - 94

JO - Journal of Geometry

JF - Journal of Geometry

SN - 0047-2468

IS - 1

ER -