For all integers $g \geq 6$ we prove the existence of a metric graph $G$ with $w^1_4=1$ such that $G$ has Clifford index 2 and there is no tropical modification $G'$ of $G$ such that there exists a finite harmonic morphism of degree 2 from $G'$ to a metric graph of genus 1. Those examples show that dimension theorems on the space classifying special linear systems for curves do not all of them have immediate translation to the theory of divisors on metric graphs.13 pages, 6 figuresstatus: publishe
We investigate the tree gonality of a genus-g metric graph, defined as the minimum degree of a tropi...
AbstractA metric graph is a geometric realization of a finite graph by identifying each edge with a ...
A tropical curve Γ is a metric graph with possibly unbounded edges, and tropical rational functions ...
For all integers $g \geq 6$ we prove the existence of a metric graph $G$ with $w^1_4=1$ such that $G...
Let Γ be a metric graph of genus g. Assume there exists a natural number 2 ≤ r ≤ g − 2 such that Γ h...
Let $\Gamma$ be a metric graph of genus $g$. Assume there exists a natural number $2 \leq r \leq g-...
In this paper we prove several lifting theorems for morphisms of tropical curves. We inter-pret the ...
The divisor theories on finite graphs and metric graphs were introduced systematically as analogues ...
In the last years different techniques coming from algebraic geometry have been used also in differe...
On a metric graph we introduce the notion of a free divisor as a replacement for the notion of a bas...
In the last years different techniques coming from algebraic geometry have been used also in differe...
AbstractIn this paper we study homotopy type of certain moduli spaces of metric graphs. More precise...
\u3cp\u3eWe prove that in the moduli space of genus-g metric graphs the locus of graphs with gonalit...
Let K be a complete and algebraically closed field with value group Λ and residue field k, and let ϕ...
The last decades have seen an extremely fruitful interplay between Riemann surfaces and graphs with ...
We investigate the tree gonality of a genus-g metric graph, defined as the minimum degree of a tropi...
AbstractA metric graph is a geometric realization of a finite graph by identifying each edge with a ...
A tropical curve Γ is a metric graph with possibly unbounded edges, and tropical rational functions ...
For all integers $g \geq 6$ we prove the existence of a metric graph $G$ with $w^1_4=1$ such that $G...
Let Γ be a metric graph of genus g. Assume there exists a natural number 2 ≤ r ≤ g − 2 such that Γ h...
Let $\Gamma$ be a metric graph of genus $g$. Assume there exists a natural number $2 \leq r \leq g-...
In this paper we prove several lifting theorems for morphisms of tropical curves. We inter-pret the ...
The divisor theories on finite graphs and metric graphs were introduced systematically as analogues ...
In the last years different techniques coming from algebraic geometry have been used also in differe...
On a metric graph we introduce the notion of a free divisor as a replacement for the notion of a bas...
In the last years different techniques coming from algebraic geometry have been used also in differe...
AbstractIn this paper we study homotopy type of certain moduli spaces of metric graphs. More precise...
\u3cp\u3eWe prove that in the moduli space of genus-g metric graphs the locus of graphs with gonalit...
Let K be a complete and algebraically closed field with value group Λ and residue field k, and let ϕ...
The last decades have seen an extremely fruitful interplay between Riemann surfaces and graphs with ...
We investigate the tree gonality of a genus-g metric graph, defined as the minimum degree of a tropi...
AbstractA metric graph is a geometric realization of a finite graph by identifying each edge with a ...
A tropical curve Γ is a metric graph with possibly unbounded edges, and tropical rational functions ...