Add to ORKGLet $\gamma$ be a generic closed curve in the plane. Samuel Blank, in his 1967 Ph.D. thesis, determined if $\gamma$ is self-overlapping by geometrically constructing a combinatorial word from $\gamma$. More recently, Zipei Nie, in an unpublished manuscript, computed the minimum homotopy area of $\gamma$ by constructing a combinatorial word algebraically. We provide a unified framework for working with both words and determine the settings under which Blank's word and Nie's word are equivalent. Using this equivalence, we give a new geometric proof for the correctness of Nie's algorithm. Unlike previous work, our proof is constructive which allows us to naturally compute the actual homotopy that realizes the minimum area. Furthermore, we cont...
Dans cette thèse, nous nous intéressons aux propriétés topologiques des surfaces, i.e. celles qui so...
We consider a notion of metric graphs where edge lengths take values in a commutative monoid, as a h...
Many questions about homotopy are provably hard or even unsolvable in general. However, in specific ...
We study the interplay between the recently-defined concept of minimum homotopy area and the classic...
In this thesis, we obtain combinatorial algorithms that determine the minimal number of self-interse...
In this article, we provide new structural results and algorithms for the Homotopy Height problem. I...
The geometric intersection number of a curve on a surface is the minimal number of self-intersection...
Any generic closed curve in the plane can be transformed into a simple closed curve by a finite sequ...
We prove new upper and lower bounds on the number of homotopy moves required to tighten a closed cur...
Any continuous deformation of closed curves on a surface can be decomposed into a finite sequence of...
A pair $(\alpha, \beta)$ of simple closed curves on a closed and orientable surface $S_g$ of genus $...
In this thesis, we focus on the topological properties of surfaces, i.e. those that are preserved by...
Abstract The minimal-area problem that defines string diagrams in closed string field theory asks f...
We study the Masur-Veech volumes $MV_{g,n}$ of the principal stratum of the moduli space of quadrati...
AbstractThe filling length of an edge-circuit η in the Cayley 2-complex of a finitely presented grou...
Dans cette thèse, nous nous intéressons aux propriétés topologiques des surfaces, i.e. celles qui so...
We consider a notion of metric graphs where edge lengths take values in a commutative monoid, as a h...
Many questions about homotopy are provably hard or even unsolvable in general. However, in specific ...
We study the interplay between the recently-defined concept of minimum homotopy area and the classic...
In this thesis, we obtain combinatorial algorithms that determine the minimal number of self-interse...
In this article, we provide new structural results and algorithms for the Homotopy Height problem. I...
The geometric intersection number of a curve on a surface is the minimal number of self-intersection...
Any generic closed curve in the plane can be transformed into a simple closed curve by a finite sequ...
We prove new upper and lower bounds on the number of homotopy moves required to tighten a closed cur...
Any continuous deformation of closed curves on a surface can be decomposed into a finite sequence of...
A pair $(\alpha, \beta)$ of simple closed curves on a closed and orientable surface $S_g$ of genus $...
In this thesis, we focus on the topological properties of surfaces, i.e. those that are preserved by...
Abstract The minimal-area problem that defines string diagrams in closed string field theory asks f...
We study the Masur-Veech volumes $MV_{g,n}$ of the principal stratum of the moduli space of quadrati...
AbstractThe filling length of an edge-circuit η in the Cayley 2-complex of a finitely presented grou...
Dans cette thèse, nous nous intéressons aux propriétés topologiques des surfaces, i.e. celles qui so...
We consider a notion of metric graphs where edge lengths take values in a commutative monoid, as a h...
Many questions about homotopy are provably hard or even unsolvable in general. However, in specific ...