We settle the parameterized complexities of several variants of independent set reconfiguration and dominating set reconfiguration, parameterized by the number of tokens. We show that both problems are XL-complete when there is no limit on the number of moves and XNL-complete when a maximum length ℓ for the sequence is given in binary in the input. The problems are known to be XNLP-complete when ℓ is given in unary instead, and W[1]- and W[2]-hard respectively when ℓ is also a parameter. We complete the picture by showing membership in those classes. Moreover, we show that for all the variants that we consider, token sliding and token jumping are equivalent under pl-reductions. We introduce partitioned variants of token jumping and token sl...
International audienceIn the Token Sliding problem we are given a graph G and two independent sets I...
We present the first results on the parameterized complexity of reconfiguration problems, where a re...
Sliding Token is a natural reconfiguration problem in which vertices of independent sets are iterati...
We settle the parameterized complexities of several variants of independent set reconfiguration and ...
We settle the parameterized complexities of several variants of independent set reconfiguration and ...
Suppose that we are given two independent sets Io and Ir of a graph such that |Io|=|Ir|, and imagine...
AbstractWe study problems of reconfigurability of independent sets in graphs. We consider three diff...
Independent Set Reconfiguration is one of the most well-studied problems in the setting of combinato...
In a reconfiguration version of a decision problem Q the input is an instance of Q and two feasible ...
In the Token Jumping problem we are given a graph G = (V,E) and two independent sets S and T of G, e...
In this paper, we present novel algorithms that efficiently compute a shortest reconfiguration seque...
Let $G$ be a graph and $D_{\sf s}$ and $D_{\sf t}$ be two dominating sets of $G$ of size $k$. Does t...
International audienceGiven two $k$-independent sets $I$ and $J$ of a graph $G$, one can ask if it i...
We consider the complexity of the Independent Set Reconfiguration problem under the Token Sliding ru...
For given two independent sets I_b and I_r of a graph, the sliding token problem is to determine if ...
International audienceIn the Token Sliding problem we are given a graph G and two independent sets I...
We present the first results on the parameterized complexity of reconfiguration problems, where a re...
Sliding Token is a natural reconfiguration problem in which vertices of independent sets are iterati...
We settle the parameterized complexities of several variants of independent set reconfiguration and ...
We settle the parameterized complexities of several variants of independent set reconfiguration and ...
Suppose that we are given two independent sets Io and Ir of a graph such that |Io|=|Ir|, and imagine...
AbstractWe study problems of reconfigurability of independent sets in graphs. We consider three diff...
Independent Set Reconfiguration is one of the most well-studied problems in the setting of combinato...
In a reconfiguration version of a decision problem Q the input is an instance of Q and two feasible ...
In the Token Jumping problem we are given a graph G = (V,E) and two independent sets S and T of G, e...
In this paper, we present novel algorithms that efficiently compute a shortest reconfiguration seque...
Let $G$ be a graph and $D_{\sf s}$ and $D_{\sf t}$ be two dominating sets of $G$ of size $k$. Does t...
International audienceGiven two $k$-independent sets $I$ and $J$ of a graph $G$, one can ask if it i...
We consider the complexity of the Independent Set Reconfiguration problem under the Token Sliding ru...
For given two independent sets I_b and I_r of a graph, the sliding token problem is to determine if ...
International audienceIn the Token Sliding problem we are given a graph G and two independent sets I...
We present the first results on the parameterized complexity of reconfiguration problems, where a re...
Sliding Token is a natural reconfiguration problem in which vertices of independent sets are iterati...