Let 𝔄 be a finite abelian group. In this article, we classify harmonic 𝔄-covers of a tropical curve Γ (which allow dilation along edges and at vertices) in terms of the cohomology group of a suitably defined sheaf on Γ. We give a realizability criterion for harmonic 𝔄-covers by patching local monodromy data in an extended homology group on Γ. As an explicit example, we work out the case 𝔄=ℤ/pℤ and explain how realizability for such covers is related to the nowhere-zero flow problem from graph theory
Real tropical varieties are polyhedral objects which are in some cases isotopic to real algebraic va...
A closed Riemann surface of genus at least 2 can be described by many different objects, for instanc...
In this thesis, we prove that the tropical cohomology of a smooth projective tropical variety verifi...
Funding: This project has received funding from the European Union’s Horizon 2020 research and innov...
In just ten years, tropical geometry has established itself as an important new field bridging algeb...
In this paper we prove several lifting theorems for morphisms of tropical curves. We inter-pret the ...
Abstract. Let Γ be a tropical curve (or metric graph), and fix a base point p ∈ Γ. We define the Jac...
textIn this thesis we construct an analogue in tropical geometry for a class of Schubert varieties f...
Let K be a complete and algebraically closed field with value group Λ and residue field k, and let ϕ...
Much success in finding rational points on curves has been obtained by using Chabauty's Theorem, whi...
AbstractWe construct the moduli spaces of tropical curves and tropical principally polarized abelian...
ABSTRACT. Let E be a plane in an algebraic torus over an algebraically closed field. Given a balance...
We construct bordifications of the moduli spaces of tropical curves and of tropical abelian varietie...
The aim of this thesis is to develop some possible generalizations of the Brill-Noether theory of sm...
Tropical geometry is algebraic geometry over the tropical semiring, or min-plus algebra. In this the...
Real tropical varieties are polyhedral objects which are in some cases isotopic to real algebraic va...
A closed Riemann surface of genus at least 2 can be described by many different objects, for instanc...
In this thesis, we prove that the tropical cohomology of a smooth projective tropical variety verifi...
Funding: This project has received funding from the European Union’s Horizon 2020 research and innov...
In just ten years, tropical geometry has established itself as an important new field bridging algeb...
In this paper we prove several lifting theorems for morphisms of tropical curves. We inter-pret the ...
Abstract. Let Γ be a tropical curve (or metric graph), and fix a base point p ∈ Γ. We define the Jac...
textIn this thesis we construct an analogue in tropical geometry for a class of Schubert varieties f...
Let K be a complete and algebraically closed field with value group Λ and residue field k, and let ϕ...
Much success in finding rational points on curves has been obtained by using Chabauty's Theorem, whi...
AbstractWe construct the moduli spaces of tropical curves and tropical principally polarized abelian...
ABSTRACT. Let E be a plane in an algebraic torus over an algebraically closed field. Given a balance...
We construct bordifications of the moduli spaces of tropical curves and of tropical abelian varietie...
The aim of this thesis is to develop some possible generalizations of the Brill-Noether theory of sm...
Tropical geometry is algebraic geometry over the tropical semiring, or min-plus algebra. In this the...
Real tropical varieties are polyhedral objects which are in some cases isotopic to real algebraic va...
A closed Riemann surface of genus at least 2 can be described by many different objects, for instanc...
In this thesis, we prove that the tropical cohomology of a smooth projective tropical variety verifi...