PARTIALLY ORDERED SETS WITH SELF COMPLEMENTARY COMPARABILITY-GRAPHS

被引:0
作者
BEHRENDT, G [1 ]
机构
[1] UNIV TUBINGEN,INST MATH,W-7400 TUBINGEN 1,GERMANY
来源
PUBLICATIONES MATHEMATICAE-DEBRECEN | 1991年 / 38卷 / 1-2期
关键词
D O I
暂无
中图分类号
O1 [数学];
学科分类号
0701 ; 070101 ;
摘要
A 2-poset (X, {P, Q}) is a pair consisting of a set X and a set {P, Q} of two partial order relations on X such that any two distinct elements of X are comparable in exactly one of these relations. We consider 2-posets (X, {P, Q} with the property that there exists an order-isomorphism f:(X, P) --> (X, Q). Thus the poset (X, P) has the property that its comparability graph is self-complementary. We derive results about the structure of such 2-posets, and we determine properties of the order-isomorphism f.
引用
收藏
页码:111 / 119
页数:9
相关论文
共 50 条
[41]   ON DERIVATIONS OF PARTIALLY ORDERED SETS [J].
Zhang, Huarong ;
Li, Qingguo .
MATHEMATICA SLOVACA, 2017, 67 (01) :17-22
[42]   ON REPRESENTATION OF PARTIALLY ORDERED SETS [J].
ABIAN, A ;
DEEVER, D .
MATHEMATISCHE ZEITSCHRIFT, 1966, 92 (05) :353-&
[43]   DISTRIBUTIVE PARTIALLY ORDERED SETS [J].
HICKMAN, RC ;
MONRO, GP .
FUNDAMENTA MATHEMATICAE, 1984, 120 (02) :151-166
[44]   On the structure of partially ordered sets [J].
Propoi, AI .
DOKLADY MATHEMATICS, 2003, 67 (03) :452-454
[45]   DIMENSION OF PARTIALLY ORDERED SETS [J].
PRETZEL, O .
JOURNAL OF COMBINATORIAL THEORY SERIES A, 1977, 22 (02) :146-152
[46]   A CLASS OF PARTIALLY ORDERED SETS [J].
WILCOX, LR .
BULLETIN OF THE AMERICAN MATHEMATICAL SOCIETY, 1948, 54 (11) :1058-1058
[47]   GEOMETRIES ON PARTIALLY ORDERED SETS [J].
FAIGLE, U .
JOURNAL OF COMBINATORIAL THEORY SERIES B, 1980, 28 (01) :26-51
[48]   Matroids on partially ordered sets [J].
Barnabei, M ;
Nicoletti, G ;
Pezzoli, L .
ADVANCES IN APPLIED MATHEMATICS, 1998, 21 (01) :78-112
[49]   QUASIMARTINGALES ON PARTIALLY ORDERED SETS [J].
HURZELER, HE .
JOURNAL OF MULTIVARIATE ANALYSIS, 1984, 14 (01) :34-73
[50]   GRAPHICAL PARTIALLY ORDERED SETS [J].
BORZACCHINI, L .
DISCRETE APPLIED MATHEMATICS, 1987, 18 (03) :247-262
12345