AbstractWe study the following problem: given a tree G and a finite set of trees H, find a subset O of the edges of G such that G-O does not contain a subtree isomorphic to a tree from H, and O has minimum cardinality. We give sharp boundaries on the tractability of this problem: the problem is polynomial when all the trees in H have diameter at most 5, while it is NP-hard when all the trees in H have diameter at most 6. We also show that the problem is polynomial when every tree in H has at most one vertex with degree more than 2, while it is NP-hard when the trees in H can have two such vertices.The polynomial-time algorithms use a variation of a known technique for solving graph problems. While the standard technique is based on defining...
Motivated by applications in network epidemiology, we consider the problem of determining whether it...
AbstractThe problems to decide whether H⩽G for input graphs H, G where ⩽ is ‘isomorphic to a subgrap...
In this note we consider the following problem: Given a graph G and a subgraph H, what is the smalle...
AbstractWe study the following problem: given a tree G and a finite set of trees H, find a subset O ...
Tree-Decompositions are the corner-stone of many dynamic programming algorithms for solving graph pr...
For a fixed graph H, the H-IS-Deletion problem asks, given a graph G, for the minimum size of a set ...
AbstractThe subgraph isomorphism problem, that of finding a copy of one graph in another, has proved...
For a fixed property (graph class) $\Pi$, given a graph $G$ and an integer $k$, the $\Pi$-deletion p...
International audienceFor a fixed graph H, the HIS Deletion problem asks, given a graph G, for the m...
It is known that evaluating the Tutte polynomial, $T(G; x, y)$, of a graph, $G$, is $\#$P-hard at al...
In the Block Graph Deletion problem, we are given a graph G on n vertices and a positive integer k, ...
AbstractWe present a clear demarcation between classes of bounded tree-width graphs for which the su...
AbstractWe construct a polynomial-time algorithm to approximate the branch-width of certain symmetri...
Abstract. Tree-Decompositions are the corner-stone of many dynamic programming algorithms for solvin...
For a fixed set H of graphs, a graph G is H-subgraph-free if G does not contain any H∈H as a (not ne...
Motivated by applications in network epidemiology, we consider the problem of determining whether it...
AbstractThe problems to decide whether H⩽G for input graphs H, G where ⩽ is ‘isomorphic to a subgrap...
In this note we consider the following problem: Given a graph G and a subgraph H, what is the smalle...
AbstractWe study the following problem: given a tree G and a finite set of trees H, find a subset O ...
Tree-Decompositions are the corner-stone of many dynamic programming algorithms for solving graph pr...
For a fixed graph H, the H-IS-Deletion problem asks, given a graph G, for the minimum size of a set ...
AbstractThe subgraph isomorphism problem, that of finding a copy of one graph in another, has proved...
For a fixed property (graph class) $\Pi$, given a graph $G$ and an integer $k$, the $\Pi$-deletion p...
International audienceFor a fixed graph H, the HIS Deletion problem asks, given a graph G, for the m...
It is known that evaluating the Tutte polynomial, $T(G; x, y)$, of a graph, $G$, is $\#$P-hard at al...
In the Block Graph Deletion problem, we are given a graph G on n vertices and a positive integer k, ...
AbstractWe present a clear demarcation between classes of bounded tree-width graphs for which the su...
AbstractWe construct a polynomial-time algorithm to approximate the branch-width of certain symmetri...
Abstract. Tree-Decompositions are the corner-stone of many dynamic programming algorithms for solvin...
For a fixed set H of graphs, a graph G is H-subgraph-free if G does not contain any H∈H as a (not ne...
Motivated by applications in network epidemiology, we consider the problem of determining whether it...
AbstractThe problems to decide whether H⩽G for input graphs H, G where ⩽ is ‘isomorphic to a subgrap...
In this note we consider the following problem: Given a graph G and a subgraph H, what is the smalle...