OFFSET
3,1
COMMENTS
Clearly a generalization of "signotopes" (cf. A006245), i.e., mappings X:{{1..n} choose 3}->{+,-} such that for any four indices a < b < c < d, the sequence X(a,b,c), X(a,b,d), X(a,c,d), X(b,c,d) changes its sign at most once (see Felsner-Weil and Balko-Fulek-Kynčl reference).
Also a generalization of "simple topological drawings" (a.k.a. good drawings, cf. A276109), i.e., non-isomorphic drawings of the complete graph K_n such that any two edges intersect at most once. In a simple topological drawings, each three vertices a < b < c determine a triangle which is either oriented clockwise or counterclockwise -- this clearly motivates the mapping X. It can be checked that in any simple topological drawing of K_4, the sequence X(a,b,c), X(a,b,d), X(a,c,d), X(b,c,d) changes its sign at most twice.
Also known as "Interior triple systems", see Knuth's book.
REFERENCES
D. Knuth, Axioms and Hulls, Springer, 1992, 9-11.
LINKS
M. Balko, R. Fulek, and J. Kynčl, Crossing Numbers and Combinatorial Characterization of Monotone Drawings of K_n, Discrete & Computational Geometry, Volume 53, Issue 1, 2015, Pages 107-143.
H. Bergold, S. Felsner, M. Scheucher, F. Schröder, and R. Steiner, Topological Drawings meet Classical Theorems from Convex Geometry, Discrete & Computational Geometry, Springer, 2022.
S. Felsner and H. Weil, Sweeps, arrangements and signotopes, Discrete Applied Mathematics, Volume 109, Issues 1-2, 2001, Pages 67-94.
Manfred Scheucher, C-program for computing the first terms
KEYWORD
nonn,more,hard
AUTHOR
Manfred Scheucher, Oct 14 2019
EXTENSIONS
a(8) from Robert Lauff and Manfred Scheucher, Nov 04 2022
STATUS
approved