Moving curves of least gonality on symmetric products of curves

Abstract

This paper is a sequel of arXiv:2208.00990. Let C be a smooth complex projective curve of genus g and let C(k) be its k-fold symmetric product. The covering gonality of C(k) is the least gonality of an irreducible curve E⊂ C(k) passing through a general point of C(k). It follows from previous works of the authors that if 2≤ k≤ 4 and g≥ k+4, the covering gonality of C(k) equals the gonality of C. In this paper, we prove that under mild assumptions of generality on C, the only curves E⊂ C(k) computing the covering gonality of C(k) are copies of C of the form C+p, for some point p∈ C(k-1). As a byproduct, we deduce that the connecting gonality of C(k) (i.e. the least gonality of an irreducible curve E⊂ C(k) connecting two general points of C(k)) is strictly larger than the covering gonality.