Bidimensionality is the most common technique to design subexponential-time parameterized algorithms on special classes of graphs, particularly planar graphs. The core engine behind it is a combinatorial lemma of Robertson, Seymour and Thomas that states that every planar graph either has a sqrt{k} x sqrt{k}-grid as a minor, or its treewidth is O(sqrt{k}). However, bidimensionality theory cannot be extended directly to several well-known classes of geometric graphs like unit disk or map graphs. This is mainly due to the presence of large cliques in these classes of graphs. Nevertheless, a relaxation of this lemma has been proven useful for unit disk graphs. Inspired by this, we prove a new decomposition lemma for map graphs, the intersectio...
Abstract We present a general framework for designing fast subexponential exact and parameterized al...
A divide-and-conquer strategy based on variations of the Lipton-Tarjan planar separator theorem has ...
It is well known that the celebrated Lipton-Tarjan planar separation theorem, in a combination with ...
We give algorithms with running time 2^{O({sqrt{k}log{k}})} n^{O(1)} for the following problems. Gi...
In this paper we make the first step beyond bidimensionality by obtaining subexponential time algori...
In this thesis we focus on subexponential algorithms for NP-hard graph problems: exact and parameter...
In this thesis we focus on subexponential algorithms for NP-hard graph problems: exact and parameter...
One of the most celebrated results in Parameterized Complexity is the Bidimensionality theory of Dem...
We introduce a new framework for designing fixed-parameter algorithms with subexponential running ti...
A (unit) disk graph is the intersection graph of closed (unit) disks in the plane. Almost three deca...
AbstractWe present subexponential parameterized algorithms on planar graphs for a family of problems...
The well-known bidimensionality theory provides a method for designing fast, subexponential-time par...
We design the first subexponential-time (parameterized) algorithms for several cut and cycle-hitting...
It is well known that the celebrated Lipton-Tarjan planar separation theorem, in a combination with ...
Bidimensionality theory appears to be a powerful framework for the development of meta-algorithmic t...
Abstract We present a general framework for designing fast subexponential exact and parameterized al...
A divide-and-conquer strategy based on variations of the Lipton-Tarjan planar separator theorem has ...
It is well known that the celebrated Lipton-Tarjan planar separation theorem, in a combination with ...
We give algorithms with running time 2^{O({sqrt{k}log{k}})} n^{O(1)} for the following problems. Gi...
In this paper we make the first step beyond bidimensionality by obtaining subexponential time algori...
In this thesis we focus on subexponential algorithms for NP-hard graph problems: exact and parameter...
In this thesis we focus on subexponential algorithms for NP-hard graph problems: exact and parameter...
One of the most celebrated results in Parameterized Complexity is the Bidimensionality theory of Dem...
We introduce a new framework for designing fixed-parameter algorithms with subexponential running ti...
A (unit) disk graph is the intersection graph of closed (unit) disks in the plane. Almost three deca...
AbstractWe present subexponential parameterized algorithms on planar graphs for a family of problems...
The well-known bidimensionality theory provides a method for designing fast, subexponential-time par...
We design the first subexponential-time (parameterized) algorithms for several cut and cycle-hitting...
It is well known that the celebrated Lipton-Tarjan planar separation theorem, in a combination with ...
Bidimensionality theory appears to be a powerful framework for the development of meta-algorithmic t...
Abstract We present a general framework for designing fast subexponential exact and parameterized al...
A divide-and-conquer strategy based on variations of the Lipton-Tarjan planar separator theorem has ...
It is well known that the celebrated Lipton-Tarjan planar separation theorem, in a combination with ...