Construction of tropical morphisms from tropical modifications of nonhyperelliptic genus 3 metric graphs with tree gonality 3 to metric trees

Abstract

In this article, we look into the tree gonality of genus 3 metric graphs which is defined as the minimum of degrees of all tropical morphisms from any tropical modification of to any metric tree. It is denoted by tgon() and is at most 3. We define hyperelliptic metric graphs in terms of tropical morphisms and tree gonality. Let be a genus 3 metric graph with tgon() = 3 which is not hyperelliptic. In this paper, for such metric graphs , we construct a tropical modification ' of , a metric tree T and a tropical map :' T of degree 3.