The present dissertation is concerned with the study of problems from toric and numerical algebraic geometry, as well as mathematical population genetics from the perspective of discrete geometry. The introductory Chapter 1 contains a short summary of the results. Furthermore, we introduce the objects stemming from discrete geometry which play a central role in the following, and fix the corresponding notation. Chapter 2 is devoted to the examination of Newton-Okounkov bodies and Newton-Okounkov functions. We consider the case of toric varieties. First, we give a combinatorial proof for the existence and uniqueness of Zariski decomposition on toric surfaces. Based on this, we construct an isomorphism between the polytope associated to ...
This thesis is concerned with establishing Manin's conjecture on the distribution of ratinal points ...
Varieties with group action have been of interest to algebraic geometers for centuries. In particula...
0/1-Polytopen kann man in vielen Gebieten der diskreten Mathematik begegnen. Das bekannteste ist als...
The present text is a synthesis of research papers in mathematics, dealing with algebraic geometry, ...
In this dissertation, we focus on the description of equivariant line bundles on complexity-one T-va...
Many interesting properties of polynomials are closely related to the geometry of their Newton polyt...
This thesis consists of four chapters that are largely independent. Counting Functions as Hilbert Fu...
This thesis consists of four independent articles all connected to the theory of Newton-Okounkov bod...
Acknowledgements 7 Contents 8 Summary 11 1 Realization of simplicial spheres and oriented matroids 1...
We develop a collection of numerical algorithms which connect ideas from polyhedral geometry and alg...
Title page, acknowledgements, contents Generalities Introduction I. Self-Touching Linkages 1...
This thesis consists of six papers in algebraic geometry –all of which have close connections to com...
Agraïments: This research was started during the workshop "Recent advances in Linear series and Newt...
In the first part, we introduce a new condition, called toric-additivity, on a family of abelian var...
Tropical geometry and its applications indicate a 'theory of syzygies' over polytope semirings. Taki...
This thesis is concerned with establishing Manin's conjecture on the distribution of ratinal points ...
Varieties with group action have been of interest to algebraic geometers for centuries. In particula...
0/1-Polytopen kann man in vielen Gebieten der diskreten Mathematik begegnen. Das bekannteste ist als...
The present text is a synthesis of research papers in mathematics, dealing with algebraic geometry, ...
In this dissertation, we focus on the description of equivariant line bundles on complexity-one T-va...
Many interesting properties of polynomials are closely related to the geometry of their Newton polyt...
This thesis consists of four chapters that are largely independent. Counting Functions as Hilbert Fu...
This thesis consists of four independent articles all connected to the theory of Newton-Okounkov bod...
Acknowledgements 7 Contents 8 Summary 11 1 Realization of simplicial spheres and oriented matroids 1...
We develop a collection of numerical algorithms which connect ideas from polyhedral geometry and alg...
Title page, acknowledgements, contents Generalities Introduction I. Self-Touching Linkages 1...
This thesis consists of six papers in algebraic geometry –all of which have close connections to com...
Agraïments: This research was started during the workshop "Recent advances in Linear series and Newt...
In the first part, we introduce a new condition, called toric-additivity, on a family of abelian var...
Tropical geometry and its applications indicate a 'theory of syzygies' over polytope semirings. Taki...
This thesis is concerned with establishing Manin's conjecture on the distribution of ratinal points ...
Varieties with group action have been of interest to algebraic geometers for centuries. In particula...
0/1-Polytopen kann man in vielen Gebieten der diskreten Mathematik begegnen. Das bekannteste ist als...