Plane $\mathbb{A}^1$-curves on the complement of strange rational curves

Qile Chen; Ryan Contreras

arXiv:2108.09024·math.AG·August 23, 2021

Plane $\mathbb{A}^1$-curves on the complement of strange rational curves

Qile Chen, Ryan Contreras

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Abstract

A plane curve is called strange if its tangent line at any smooth point passes through a fixed point, called the strange point. In this paper, we study $A^{1}$ -curves on the complement of a rational strange curve of degree $p$ in characteristic $p$ . We prove the connectedness of the moduli spaces of $A^{1}$ -curves with given degree, classify their irreducible components, and exhibit the inseparable $A^{1}$ -connectedness via the $A^{1}$ -curves parameterized by each irreducible component. The key to these results is the strangeness of all $A^{1}$ -curves. As an application, in every characteristic we construct explicit covering families of $A^{1}$ -curves, whose total spaces are smooth along large numbers of cusps on each general fiber.

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TopicsAlgebraic Geometry and Number Theory · Geometry and complex manifolds · Geometric Analysis and Curvature Flows