Geometry of weak contact conics to irreducible quartics with 2 nodes and 1 cusp via rational elliptic surfaces and Zariski pairs

Abstract

Let Q be an irreducible quartic with two nodes and one cusp as its singularities and let C be a conic such that the intersection multiplicity at each point of C Q is even and C Q contain at least one smooth point zo of Q. In this paper, for every Q we find all possible conics C as above via studying geometry of C and Q through that of integral sections of a rational elliptic surface which canonically arises from Q and zo ∈ C Q. As an application, we construct Zariski pairs of degree 7 and degree 8, whose irreducible components consist of Q, C and line passing through two of the singular points of Q .