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...
The problem MaxW-Light (MaxW-Heavy) for an undirected graph is to assign a direction to each edge so...
The problem Max W-Light (Max W-Heavy) for an undirected graph is to assign a direction to each edge ...
Abstract. We show that Edge Dominating Set, Hamiltonian Cycle, and Graph Coloring are W [1]-hard par...
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...
We show that some natural problems that are XNLP-hard (which implies W[t]-hardness for all t) when p...
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 (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 $k$...
International audienceRecently, hardness results for problems in P were achieved using reasonable co...
Let XNLP be the class of parameterized prob-lems such that an instance of size n with parameter k ca...
We described a simple algorithm running in linear time for each xed constant k, that either establis...
The problem MaxW-Light (MaxW-Heavy) for an undirected graph is to assign a direction to each edge so...
The problem Max W-Light (Max W-Heavy) for an undirected graph is to assign a direction to each edge ...
Abstract. We show that Edge Dominating Set, Hamiltonian Cycle, and Graph Coloring are W [1]-hard par...
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...
We show that some natural problems that are XNLP-hard (which implies W[t]-hardness for all t) when p...
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 (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 $k$...
International audienceRecently, hardness results for problems in P were achieved using reasonable co...
Let XNLP be the class of parameterized prob-lems such that an instance of size n with parameter k ca...
We described a simple algorithm running in linear time for each xed constant k, that either establis...
The problem MaxW-Light (MaxW-Heavy) for an undirected graph is to assign a direction to each edge so...
The problem Max W-Light (Max W-Heavy) for an undirected graph is to assign a direction to each edge ...
Abstract. We show that Edge Dominating Set, Hamiltonian Cycle, and Graph Coloring are W [1]-hard par...