In this paper, we showcase the class XNLP as a natural place for many hard problems parameterized by linear width measures. This strengthens existing W[1]-hardness proofs for these problems, since XNLP-hardness implies W[t]-hardness for all t. It also indicates, via a conjecture by Pilipczuk and Wrochna [ToCT 2018], that any XP algorithm for such problems is likely to require XP space. In particular, we show XNLP-completeness for natural problems parameterized by pathwidth, linear clique-width, and linear mim-width. The problems we consider are Independent Set, Dominating Set, Odd Cycle Transversal, (q-)Coloring, Max Cut, Maximum Regular Induced Subgraph, Feedback Vertex Set, Capacitated (Red-Blue) Dominating Set, and Bipartite Bandwidth
We described a simple algorithm running in linear time for each xed constant k, that either establis...
We investigate the parameterized complexity of Binary CSP parameterized by the vertex cover number a...
In the last decades, considerable efforts have been spent to characterize what makes NP-hard problem...
In this paper, we showcase the class XNLP as a natural place for many hard problems parameterized by...
In this paper, we showcase the class XNLP as a natural place for many hard problems parameterized by...
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 show that the $b$-Coloring problem is complete for the class XNLP when parameterized by the pathw...
We show that the $b$-Coloring problem is complete for the class XNLP whenparameterized by the pathwi...
We show that some natural problems that are XNLP-hard (which implies W[t]-hardness for all t) when p...
A large number of NP-hard graph problems are solvable in XP time when parameterized by some width pa...
The main focus of this thesis is on using the divide and conquer technique to efficiently solve grap...
We show that some natural problems that are XNLP-hard (hence $$\textrm{W}[t]$$ -hard for all t) when...
Let XNLP be the class of parameterized problems such that an instance of size $n$ with parameter $k$...
A large number of NP-hard graph problems are solvable in XP time when parameterized by some width pa...
We described a simple algorithm running in linear time for each xed constant k, that either establis...
We investigate the parameterized complexity of Binary CSP parameterized by the vertex cover number a...
In the last decades, considerable efforts have been spent to characterize what makes NP-hard problem...
In this paper, we showcase the class XNLP as a natural place for many hard problems parameterized by...
In this paper, we showcase the class XNLP as a natural place for many hard problems parameterized by...
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 show that the $b$-Coloring problem is complete for the class XNLP when parameterized by the pathw...
We show that the $b$-Coloring problem is complete for the class XNLP whenparameterized by the pathwi...
We show that some natural problems that are XNLP-hard (which implies W[t]-hardness for all t) when p...
A large number of NP-hard graph problems are solvable in XP time when parameterized by some width pa...
The main focus of this thesis is on using the divide and conquer technique to efficiently solve grap...
We show that some natural problems that are XNLP-hard (hence $$\textrm{W}[t]$$ -hard for all t) when...
Let XNLP be the class of parameterized problems such that an instance of size $n$ with parameter $k$...
A large number of NP-hard graph problems are solvable in XP time when parameterized by some width pa...
We described a simple algorithm running in linear time for each xed constant k, that either establis...
We investigate the parameterized complexity of Binary CSP parameterized by the vertex cover number a...
In the last decades, considerable efforts have been spent to characterize what makes NP-hard problem...