Add to ORKGThis master thesis investigates discrete geometry in the tropical semiring (R,min,+), setting its main focus on convex polytopes and halfspace arrangements. Specifically, tropical analogs to results in classical discrete geometry are presented. Results include tropical versions of the separation of tw
Tropical linear algebra is the study of classical linear algebra problems with arithmetic done over ...
structure of the semigroup of n × n tropical matrices and its connection with the geometry of tropic...
Tropical geometry is a relatively new field of mathematics that studies the tropicalization map: a m...
The notions of convexity and convex polytopes are introduced in the setting of tropical geometry. Co...
The authors thank the anonymous referee for many useful comments, and in particular for drawing our ...
arXiv:1611.04148International audienceWe introduce tropical analogues of the notion of volume of pol...
We establish a new notion of tropical convexity for signed tropical numbers. We provide several equi...
Tropical geometry is an area of mathematics that has enjoyed a quick development in the last 15 year...
This paper is about the combinatorics of finite point configurations in the tropical projective spac...
We extend the fundamentals for tropical convexity beyond the tropically positive orthant expanding t...
Abstract The tropical convex hull of a finite set of points in tropical projective space has a natur...
Murota et al. have recently developed a theory of discrete convex analysis which concerns M-convex f...
We consider tropical hemispaces, defined as tropically convex sets whose complements are also tropic...
Abstract. Using a potential theory on metric graphs Γ, we introduce the notion of tropical convexity...
In recent decades, tropical mathematics gradually evolved as a field of study in mathematics and it ...
Tropical linear algebra is the study of classical linear algebra problems with arithmetic done over ...
structure of the semigroup of n × n tropical matrices and its connection with the geometry of tropic...
Tropical geometry is a relatively new field of mathematics that studies the tropicalization map: a m...
The notions of convexity and convex polytopes are introduced in the setting of tropical geometry. Co...
The authors thank the anonymous referee for many useful comments, and in particular for drawing our ...
arXiv:1611.04148International audienceWe introduce tropical analogues of the notion of volume of pol...
We establish a new notion of tropical convexity for signed tropical numbers. We provide several equi...
Tropical geometry is an area of mathematics that has enjoyed a quick development in the last 15 year...
This paper is about the combinatorics of finite point configurations in the tropical projective spac...
We extend the fundamentals for tropical convexity beyond the tropically positive orthant expanding t...
Abstract The tropical convex hull of a finite set of points in tropical projective space has a natur...
Murota et al. have recently developed a theory of discrete convex analysis which concerns M-convex f...
We consider tropical hemispaces, defined as tropically convex sets whose complements are also tropic...
Abstract. Using a potential theory on metric graphs Γ, we introduce the notion of tropical convexity...
In recent decades, tropical mathematics gradually evolved as a field of study in mathematics and it ...
Tropical linear algebra is the study of classical linear algebra problems with arithmetic done over ...
structure of the semigroup of n × n tropical matrices and its connection with the geometry of tropic...
Tropical geometry is a relatively new field of mathematics that studies the tropicalization map: a m...