Abstract. Finding the so-called characteristic numbers of the complex projective plane CP 2 is a classical problem of enumerative geometry posed by Zeuthen more than a century ago. For a given d and g one has to find the number of degree d genus g curves that pass through a certain generic configuration of points and at the same time are tangent to a certain generic configuration of lines. The total number of points and lines in these two configurations is 3d − 1 + g so that the answer is a finite integer number. In this paper we translate this classical problem to the corresponding enumerative problem of tropical geometry in the case when g = 0. Namely, we show that the tropical problem is well-posed and establish a special case of the cor...
Recently, the first and third author proved a correspondence theorem which recovers the Levine-Welsc...
Enumerative tropical geometry allows to solve technical problems from enumerative algebraic geometry...
A main result of this thesis is a conceptual proof of the fact that the weighted number of tropical ...
50 pages, 21 figuresInternational audienceFinding the so-called characteristic numbers of the comple...
55 pages, 23 figuresInternational audienceFinding the so-called characteristic numbers of the comple...
Finding the so-called characteristic numbers of the complex projective plane $ \mathbb{C} {P}^{2} $ ...
Tropical geometry is a rather new field of algebraic geometry. The main idea is to replace algebraic...
We study two classical families of enumerative problems: inflection lines of plane curves and theta-...
Abstract. Tropical geometry is a piecewise linear “shadow ” of algebraic geome-try. It allows for th...
We investigate the problem of counting tropical genus g curves in g-dimensional tropical abelian var...
A main result of this thesis is a conceptual proof of the fact that the weighted number of tropical ...
This thesis is devoted to the study of tropical curves with emphasis on their enumerative geometry. ...
Hurwitz numbers count genus g, degree d covers of ℙ1 with fixed branch locus. This equals the degree...
Tropical refined invariants of toric surfaces constitute a fascinating interpolation between real an...
Floor diagrams are a class of weighted oriented graphs introduced by E. Brugalle and the second auth...
Recently, the first and third author proved a correspondence theorem which recovers the Levine-Welsc...
Enumerative tropical geometry allows to solve technical problems from enumerative algebraic geometry...
A main result of this thesis is a conceptual proof of the fact that the weighted number of tropical ...
50 pages, 21 figuresInternational audienceFinding the so-called characteristic numbers of the comple...
55 pages, 23 figuresInternational audienceFinding the so-called characteristic numbers of the comple...
Finding the so-called characteristic numbers of the complex projective plane $ \mathbb{C} {P}^{2} $ ...
Tropical geometry is a rather new field of algebraic geometry. The main idea is to replace algebraic...
We study two classical families of enumerative problems: inflection lines of plane curves and theta-...
Abstract. Tropical geometry is a piecewise linear “shadow ” of algebraic geome-try. It allows for th...
We investigate the problem of counting tropical genus g curves in g-dimensional tropical abelian var...
A main result of this thesis is a conceptual proof of the fact that the weighted number of tropical ...
This thesis is devoted to the study of tropical curves with emphasis on their enumerative geometry. ...
Hurwitz numbers count genus g, degree d covers of ℙ1 with fixed branch locus. This equals the degree...
Tropical refined invariants of toric surfaces constitute a fascinating interpolation between real an...
Floor diagrams are a class of weighted oriented graphs introduced by E. Brugalle and the second auth...
Recently, the first and third author proved a correspondence theorem which recovers the Levine-Welsc...
Enumerative tropical geometry allows to solve technical problems from enumerative algebraic geometry...
A main result of this thesis is a conceptual proof of the fact that the weighted number of tropical ...