Add to ORKGThe hypertoric variety M_A defined by an arrangement A of affine hyperplanes admits a natural tropicalization, induced by its embedding in a Lawrence toric variety. In this thesis, we explicitly describe the polyhedral structure of this tropicalization and calculate the fibers of the tropicalization map. Using a recent result of Gubler, Rabinoff, and Werner, we prove that there is a continuous section of the tropicalization map
The image of the complement of a hyperplane arrangement under a monomial map can be tropicalized com...
The main theme of this thesis is the interplay between algebraic and tropical intersection theory, ...
Abstract. We show that the skeleton of the Deligne-Mumford-Knudsen moduli stack of stable curves is ...
Abstract. We show that the tropical projective Grassmannian of planes is homeomorphic to a closed su...
The tropicalization of a projective toric variety is a topological space that "looks like" the assoc...
Let X be an algebraic variety and let S be a tropical variety associated to X. We study the tropical...
The tropicalization of an algebraic variety X is a combinatorial shadow of X, which is sensitive to ...
We merge ideas around the tropical hyperfield with the theory of ordered blueprints to give a new fo...
Abstract. For any affine variety equipped with coordinates, there is a surjec-tive, continuous map f...
We show that the moduli spaces of irreducible labeled parametrized marked rational curves in toric v...
Tropical geometry is a relatively new field of mathematics that studies the tropicalization map: a m...
Tropical geometry is a developing area of mathematics in between algebraic geometry, combinatorics a...
For any affine variety equipped with coordinates, there is a surjective, continuous map from its Ber...
We study toric varieties over the tropical semifield. We define tropical cycles inside these toric v...
AbstractTropicalization is a procedure for associating a polyhedral complex in Euclidean space to a ...
The image of the complement of a hyperplane arrangement under a monomial map can be tropicalized com...
The main theme of this thesis is the interplay between algebraic and tropical intersection theory, ...
Abstract. We show that the skeleton of the Deligne-Mumford-Knudsen moduli stack of stable curves is ...
Abstract. We show that the tropical projective Grassmannian of planes is homeomorphic to a closed su...
The tropicalization of a projective toric variety is a topological space that "looks like" the assoc...
Let X be an algebraic variety and let S be a tropical variety associated to X. We study the tropical...
The tropicalization of an algebraic variety X is a combinatorial shadow of X, which is sensitive to ...
We merge ideas around the tropical hyperfield with the theory of ordered blueprints to give a new fo...
Abstract. For any affine variety equipped with coordinates, there is a surjec-tive, continuous map f...
We show that the moduli spaces of irreducible labeled parametrized marked rational curves in toric v...
Tropical geometry is a relatively new field of mathematics that studies the tropicalization map: a m...
Tropical geometry is a developing area of mathematics in between algebraic geometry, combinatorics a...
For any affine variety equipped with coordinates, there is a surjective, continuous map from its Ber...
We study toric varieties over the tropical semifield. We define tropical cycles inside these toric v...
AbstractTropicalization is a procedure for associating a polyhedral complex in Euclidean space to a ...
The image of the complement of a hyperplane arrangement under a monomial map can be tropicalized com...
The main theme of this thesis is the interplay between algebraic and tropical intersection theory, ...
Abstract. We show that the skeleton of the Deligne-Mumford-Knudsen moduli stack of stable curves is ...