This work deals with convergence theorems and bounds on the cost of several layout measures for lattice graphs, random lattice graphs and sparse random geometric graphs. For full square lattices, we give optimal layouts for the problems still open. Our convergence theorems can be viewed as an analogue of the Beardwood, Halton and Hammersley theorem for the Euclidian TSP on random points in the $d$-dimensional cube. As the considered layout measures are non-subadditive, we use percolation theory to obtain our results on random lattices and random geometric graphs. In particular, we deal with the subcritical regimes on these class of graphs
We show two simple algorithms that, with high probability, approximate within a constant several lay...
The thesis is split into two parts. In the first part we prove a local limit theorem for the number ...
We study topological and geometric functionals of l∞-random geometric graphs on the high-dimensional...
In random geometric graphs, vertices are randomly distributed on [0,1]^2 and pairs of vertices are c...
This dissertation studies the asymptotic behavior of two probabilistic models.It consists of two par...
Abstract We show that, with overwhelming probability, several well known layout problems are approxi...
We show that, with high probability, several layout problems are approximable within a constant for ...
Given a sample from a probability measure with support on a submanifold in Euclidean space one can c...
Given a sample from a probability measure with support on a submanifold in Euclidean space one can c...
We study a model of random R-enriched trees that is based on weights on the R-structures and allows ...
Abstract. We study the uniform random graph Cn with n vertices drawn from a subcritical class of con...
In this paper we study the treewidth of the random geometric graph, obtained by dropping n points on...
Abstract We characterize the existence of certain geometric configurations in the fractal percolati...
Given $\lambda > 0$, $p\in [0,1]$ and a Poisson Point Process $\mathrm{Po}(\lambda)$ in $\mathbb R^2...
This thesis investigates the geometry of random spaces. Geodesics in random surfaces. The Br...
We show two simple algorithms that, with high probability, approximate within a constant several lay...
The thesis is split into two parts. In the first part we prove a local limit theorem for the number ...
We study topological and geometric functionals of l∞-random geometric graphs on the high-dimensional...
In random geometric graphs, vertices are randomly distributed on [0,1]^2 and pairs of vertices are c...
This dissertation studies the asymptotic behavior of two probabilistic models.It consists of two par...
Abstract We show that, with overwhelming probability, several well known layout problems are approxi...
We show that, with high probability, several layout problems are approximable within a constant for ...
Given a sample from a probability measure with support on a submanifold in Euclidean space one can c...
Given a sample from a probability measure with support on a submanifold in Euclidean space one can c...
We study a model of random R-enriched trees that is based on weights on the R-structures and allows ...
Abstract. We study the uniform random graph Cn with n vertices drawn from a subcritical class of con...
In this paper we study the treewidth of the random geometric graph, obtained by dropping n points on...
Abstract We characterize the existence of certain geometric configurations in the fractal percolati...
Given $\lambda > 0$, $p\in [0,1]$ and a Poisson Point Process $\mathrm{Po}(\lambda)$ in $\mathbb R^2...
This thesis investigates the geometry of random spaces. Geodesics in random surfaces. The Br...
We show two simple algorithms that, with high probability, approximate within a constant several lay...
The thesis is split into two parts. In the first part we prove a local limit theorem for the number ...
We study topological and geometric functionals of l∞-random geometric graphs on the high-dimensional...