Criteria for the less-equal-relation between partial Lov\'asz-vectors of digraphs

Abstract

Finite digraphs R and S are studied with \# H(G,R) ≤ \# H(G,S) for every finite digraph G ∈ D ', where H(G,H) is the set of order homomorphisms from G to H and D ' is a class of finite digraphs. It is shown that for several classes D ' of digraphs and R ∈ D ', the relation \# H(G,R) ≤ \# H(G,S) for every G ∈ D ' is implied by the relation \# S(G,R) ≤ \# S(G,S) for every G ∈ D ', where S(G,H) is the set of homomorphisms from G to H mapping all proper arcs of G to proper arcs of H. Under an application-oriented regularity condition, the two relations are even equivalent. A method is developed for the rearrangement of a digraph R, resulting in a digraph S with \# H(G,R) ≤ \# H(G,S) for every digraph G. The method is applied in constructing pairs of partially ordered sets R and S with \# H(P,R) ≤ \# H(P,S) for every partially ordered set P. The main part of the results holds also for undirected graphs.