Add to ORKGIn this thesis we study the configuration space, F (Γ, 2), of two particles moving without collisions on a graph Γ with a view to calculating the Betti numbers of this space. We develop an intersection theory for cycles in graphs inspired by the classical intersection theory for cycles in manifolds and we use this to develop an algorithm to calculate the second Betti number of F (Γ,2) for any graph Γ. We also use this intersection theory to provide a complete description of the cohomology algebra H ^*(F (Γ, 2), Q) for any planar graph Γ and to calculate explicit formulae for the Betti numbers of F (Γ, 2) when Γ is a complete graph or a complete bipartite graph. We also investigate the generators of group H_2 (F (Γ, 2), Z) and show that for a...
The intersection graph of a set system S is a graph on the vertex set S, in which two vertices are c...
We prove that the non-k-equal configuration space of a graph has a discretized model, analogous to t...
AbstractComputing intersection cohomology Betti numbers is complicated by the fact that the usual lo...
In this thesis we study the configuration space, F (Γ, 2), of two particles moving without collisions...
In this paper we study the homology and cohomology of configuration spaces F(Γ,2) of two distinct pa...
Thesis (Ph. D.)--University of Rochester. Department of Mathematics, 2016The purpose of this thesis ...
This paper continues the investigation of the configuration space of two distinct points on a graph....
In this thesis we deal with unordered configuration spaces of finite graphs, and in particular with ...
Imagine a set of robots moving along tracks in a factory, where the robots are points and the tracks...
Imagine a set of robots moving along tracks in a factory, where the robots are points and the tracks...
In this thesis, we study the topology of configuration spaces of particles of variable radius r>0 mo...
AbstractMotivated by a problem in computer graphic we develop discrete models of continuous n-dimens...
A configuration space is a space whose points represent the possible states of a given physical syst...
AbstractAn intersection theory developed by the author for matroids embedded in uniform geometries i...
A configuration space is a space whose points represent the possible states of a given physical syst...
The intersection graph of a set system S is a graph on the vertex set S, in which two vertices are c...
We prove that the non-k-equal configuration space of a graph has a discretized model, analogous to t...
AbstractComputing intersection cohomology Betti numbers is complicated by the fact that the usual lo...
In this thesis we study the configuration space, F (Γ, 2), of two particles moving without collisions...
In this paper we study the homology and cohomology of configuration spaces F(Γ,2) of two distinct pa...
Thesis (Ph. D.)--University of Rochester. Department of Mathematics, 2016The purpose of this thesis ...
This paper continues the investigation of the configuration space of two distinct points on a graph....
In this thesis we deal with unordered configuration spaces of finite graphs, and in particular with ...
Imagine a set of robots moving along tracks in a factory, where the robots are points and the tracks...
Imagine a set of robots moving along tracks in a factory, where the robots are points and the tracks...
In this thesis, we study the topology of configuration spaces of particles of variable radius r>0 mo...
AbstractMotivated by a problem in computer graphic we develop discrete models of continuous n-dimens...
A configuration space is a space whose points represent the possible states of a given physical syst...
AbstractAn intersection theory developed by the author for matroids embedded in uniform geometries i...
A configuration space is a space whose points represent the possible states of a given physical syst...
The intersection graph of a set system S is a graph on the vertex set S, in which two vertices are c...
We prove that the non-k-equal configuration space of a graph has a discretized model, analogous to t...
AbstractComputing intersection cohomology Betti numbers is complicated by the fact that the usual lo...