TY - JOUR
T1 - Bounding the number of k-faces in arrangements of hyperplanes
AU - Fukuda, Komei
AU - Saito, Shigemasa
AU - Tamura, Akihisa
AU - Tokuyama, Takeshi
PY - 1991/4/15
Y1 - 1991/4/15
N2 - We study certain structural problems of arrangements of hyperplanes in d-dimensional Euclidean space. Of special interest are nontrivial relations satisfied by the f-vector f=(f0,f1,...,fd) of an arrangement, where fk denotes the number of k-faces. The first result is that the mean number of (k-1)-faces lying on the boundary of a fixed k-face is less than 2k in any arrangement, which implies the simple linear inequality fk>(d-k+1) kf--1 if fk≠0. Similar results hold for spherical arrangements and oriented matroids. We also show that the f-vector and the h-vector of a simple arrangement is logarithmic concave, and hence unimodal.
AB - We study certain structural problems of arrangements of hyperplanes in d-dimensional Euclidean space. Of special interest are nontrivial relations satisfied by the f-vector f=(f0,f1,...,fd) of an arrangement, where fk denotes the number of k-faces. The first result is that the mean number of (k-1)-faces lying on the boundary of a fixed k-face is less than 2k in any arrangement, which implies the simple linear inequality fk>(d-k+1) kf--1 if fk≠0. Similar results hold for spherical arrangements and oriented matroids. We also show that the f-vector and the h-vector of a simple arrangement is logarithmic concave, and hence unimodal.
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U2 - 10.1016/0166-218X(91)90067-7
DO - 10.1016/0166-218X(91)90067-7
M3 - Article
AN - SCOPUS:0004515166
SN - 0166-218X
VL - 31
SP - 151
EP - 165
JO - Discrete Applied Mathematics
JF - Discrete Applied Mathematics
IS - 2
ER -