Elliptic dihedral covers in dimension 2, geometry of sections of elliptic surfaces, and Zariski pairs for line-conic arrangements

Abstract

In this article, examples of Zariski pairs (B1, B2) satisfying the following condition are given: (i) B1 = B2 = 7. (ii) Irreducible components of Bi (i = 1, 2) are lines and conics. (iii) Singularities of Bi (i = 1, 2) are nodes, tacnodes and ordinary triple points. In order to construct Bi (i = 1, 2), we make use of geometry of sections of rational elliptic surfaces and their group structure. Dihedral covers play important roles to distinguish the topology of ( P2, Bi) (i = 1, 2).