A homomorphism ϕ from a guest graph G to a host graph H is locally bijective, injective or surjective if for every u∈V(G), the restriction of ϕ to the neighbourhood of u is bijective, injective or surjective, respectively. The corresponding decision problems, LBHOM, LIHOM and LSHOM, are well studied both on general graphs and on special graph classes. We prove a number of new FPT, W[1]-hard and para-NP-complete results by considering a hierarchy of parameters of the guest graph G. For our FPT results, we do this through the development of a new algorithmic framework that involves a general ILP model. To illustrate the applicability of the new framework, we also use it to prove FPT results for the ROLE ASSIGNMENT problem, which originates fr...
The universal cover T G of a connected graph G is the unique (possible infinite) tree covering G, i....
Graph homomorphism problems involve finding adjacency-preserving mappings between two given graphs...
We consider constrained variants of graph homomorphisms such as embeddings, monomorphisms, full homo...
A homomorphism φ from a guest graph G to a host graph H is locally bijective, injective or surjecti...
A homomorphism ϕ from a guest graph G to a host graph H is locally bijective, injective or surjectiv...
A homomorphism from a graph G to a graph H is locally bijective, surjective, or injective if its res...
A homomorphism from a graph G to a graph H is locally bijective, surjective, or injective if its res...
A graph homomorphism is an edge preserving vertex mapping between two graphs. Locally constrained ho...
Abstract. A homomorphism from a graph G to a graph H is locally bijective, surjective, or injective ...
A homomorphism from a graph G to a graph H is locally bijective, surjective, or injective if its res...
A homomorphism from a graph G to a graph H is locally bijective, injective, or surjective if its res...
The universal cover T G of a connected graph G is the unique (possibly infinite) tree covering G, i....
AbstractWe explore the connection between locally constrained graph homomorphisms and degree matrice...
The Surjective Homomorphism problem is to test whether a given graph G called the guest graph allows...
The Surjective Homomorphism problem is to test whether a given graphG called the guest graph allows ...
The universal cover T G of a connected graph G is the unique (possible infinite) tree covering G, i....
Graph homomorphism problems involve finding adjacency-preserving mappings between two given graphs...
We consider constrained variants of graph homomorphisms such as embeddings, monomorphisms, full homo...
A homomorphism φ from a guest graph G to a host graph H is locally bijective, injective or surjecti...
A homomorphism ϕ from a guest graph G to a host graph H is locally bijective, injective or surjectiv...
A homomorphism from a graph G to a graph H is locally bijective, surjective, or injective if its res...
A homomorphism from a graph G to a graph H is locally bijective, surjective, or injective if its res...
A graph homomorphism is an edge preserving vertex mapping between two graphs. Locally constrained ho...
Abstract. A homomorphism from a graph G to a graph H is locally bijective, surjective, or injective ...
A homomorphism from a graph G to a graph H is locally bijective, surjective, or injective if its res...
A homomorphism from a graph G to a graph H is locally bijective, injective, or surjective if its res...
The universal cover T G of a connected graph G is the unique (possibly infinite) tree covering G, i....
AbstractWe explore the connection between locally constrained graph homomorphisms and degree matrice...
The Surjective Homomorphism problem is to test whether a given graph G called the guest graph allows...
The Surjective Homomorphism problem is to test whether a given graphG called the guest graph allows ...
The universal cover T G of a connected graph G is the unique (possible infinite) tree covering G, i....
Graph homomorphism problems involve finding adjacency-preserving mappings between two given graphs...
We consider constrained variants of graph homomorphisms such as embeddings, monomorphisms, full homo...