TY - JOUR
T1 - The defect in an invariant reflection structure
AU - Karzel, Helmut
AU - Pianta, Silvia
AU - Marchi, Mario
PY - 2010
Y1 - 2010
N2 - The defect function [introduced in Karzel and Marchi (Results
Math 47:305–326, 2005)] of an invariant reflection structure (P, I) is
strictly connected to the precession maps of the corresponding K-loop
(P, +), therefore it permits a classification of such structures with respect
to the algebraic properties of their K-loop. In the ordinary case (i.e.
when the K-loop is not a group) we define, by means of products of
three involutions, four different families of blocks denoted, respectively,
by LG,L, BG, B (cf. Sect. 4) so that we can provide the reflection structure
with some appropriate incidence structure. On the other hand we
consider in (P, +) two types of centralizers and recognize a strong connection
between them and the aforesaid blocks: actually we prove that
all the blocks of (P, I) can be represented as left cosets of suitable centralizers
of the loop (P, +) (Theorem 6.1). Finally we give necessary and
sufficient conditions in order that the incidence structures (P,LG) and
(P,L) become linear spaces (cf. Theorem 8.6)
AB - The defect function [introduced in Karzel and Marchi (Results
Math 47:305–326, 2005)] of an invariant reflection structure (P, I) is
strictly connected to the precession maps of the corresponding K-loop
(P, +), therefore it permits a classification of such structures with respect
to the algebraic properties of their K-loop. In the ordinary case (i.e.
when the K-loop is not a group) we define, by means of products of
three involutions, four different families of blocks denoted, respectively,
by LG,L, BG, B (cf. Sect. 4) so that we can provide the reflection structure
with some appropriate incidence structure. On the other hand we
consider in (P, +) two types of centralizers and recognize a strong connection
between them and the aforesaid blocks: actually we prove that
all the blocks of (P, I) can be represented as left cosets of suitable centralizers
of the loop (P, +) (Theorem 6.1). Finally we give necessary and
sufficient conditions in order that the incidence structures (P,LG) and
(P,L) become linear spaces (cf. Theorem 8.6)
KW - K-loop
KW - loop
KW - loop-derivation
KW - reflection structure
KW - K-loop
KW - loop
KW - loop-derivation
KW - reflection structure
UR - http://hdl.handle.net/10807/55298
U2 - 10.1007/s00022-010-0058-7
DO - 10.1007/s00022-010-0058-7
M3 - Article
SN - 0047-2468
VL - 99
SP - 67
EP - 87
JO - Journal of Geometry
JF - Journal of Geometry
ER -