We investigate the parameterized complexity of Binary CSP parameterized by the vertex cover number and the treedepth of the constraint graph, as well as by a selection of related modulator-based parameters. The main findings are as follows: Binary CSP parameterized by the vertex cover number is W[3]-complete. More generally, for every positive integer d, Binary CSP parameterized by the size of a modulator to a treedepth-d graph is W[2d + 1]-complete. This provides a new family of natural problems that are complete for odd levels of the W-hierarchy. We introduce a new complexity class XSLP, defined so that Binary CSP parameterized by treedepth is complete for this class. We provide two equivalent characterizations of XSLP: the first one rela...
A parameterized computational problem is a set of pairs 〈x, k〉, where k is a distinguished item call...
To solve hard graph problems from the parameterized perspective, structural parameters have commonly...
While polynomial-time approximation algorithms remain a dominant notion in tackling computationally...
We investigate the parameterized complexity of Binary CSP parameterized by the vertex cover number a...
In this paper, we show that Binary CSP with the size of a vertex cover as parameter is complete for ...
In this paper, we introduce a new class of parameterized problems, which we call XALP: the class of ...
In this paper, we introduce a new class of parameterized problems, which we call XALP: the class of ...
We investigate the fine-grained and the parameterized complexity of several generalizations of binar...
In this work we summarize much of the research conducted by the author since his PhD defense in the ...
The complexity of various Constraint Satisfaction Problems (CSP) when parameterized by structural me...
Tractable cases of the binary CSP are mainly divided in two classes: constraint language restriction...
In this paper, we showcase the class XNLP as a natural place for many hard problems parameterized by...
We study the parameterized complexity of computing the tree-partition-width, a graph parameter equiv...
We study the parameterized complexity of computing the tree-partition-width, a graph parameter equiv...
Coping with NP-hard graph problems by doing better than simply brute force is a field of significant...
A parameterized computational problem is a set of pairs 〈x, k〉, where k is a distinguished item call...
To solve hard graph problems from the parameterized perspective, structural parameters have commonly...
While polynomial-time approximation algorithms remain a dominant notion in tackling computationally...
We investigate the parameterized complexity of Binary CSP parameterized by the vertex cover number a...
In this paper, we show that Binary CSP with the size of a vertex cover as parameter is complete for ...
In this paper, we introduce a new class of parameterized problems, which we call XALP: the class of ...
In this paper, we introduce a new class of parameterized problems, which we call XALP: the class of ...
We investigate the fine-grained and the parameterized complexity of several generalizations of binar...
In this work we summarize much of the research conducted by the author since his PhD defense in the ...
The complexity of various Constraint Satisfaction Problems (CSP) when parameterized by structural me...
Tractable cases of the binary CSP are mainly divided in two classes: constraint language restriction...
In this paper, we showcase the class XNLP as a natural place for many hard problems parameterized by...
We study the parameterized complexity of computing the tree-partition-width, a graph parameter equiv...
We study the parameterized complexity of computing the tree-partition-width, a graph parameter equiv...
Coping with NP-hard graph problems by doing better than simply brute force is a field of significant...
A parameterized computational problem is a set of pairs 〈x, k〉, where k is a distinguished item call...
To solve hard graph problems from the parameterized perspective, structural parameters have commonly...
While polynomial-time approximation algorithms remain a dominant notion in tackling computationally...