Configuration of lines in del Pezzo surfaces with Gosset Polytopes

Abstract

In this article, we study the divisor classes of del Pezzo surfaces, which are written as the sum of distinct lines with fixed intersection according to the inscribed simplexes and crosspolytopes in Gosset polytopes. We introduce the k-Steiner system and cornered simplexes, and characterize the configurations of inscribed m(<4)-simplexes with them. Higher dimensional inscribed m(3<m)-simplexes exist in 421 in the Picard group of del Pezzo surface S8 of degree 1.The configurations of 4- and 7-simplexes are related to rulings in S8. And the configurations of 5- and 6-simplexes correspond the skew 3-lines and skew 7-lines in S8. In particular, the seven lines in a 6-simplex produce a Fano plane. We also study the inscribed crosspolytopes and hypercubes in the Gosset polytopes.