Distinguishing finite and infinite trees of arbitrary cardinality

Abstract

Let G be a finite or infinite graph and m(G) the minimum number of vertices moved by the non-identity automorphisms of G. We are interested in bounds on the supremum (G) of the degrees of the vertices of G that assure the existence of vertex colorings of G with two colors that are preserved only by the identity automorphism, and, in particular, in the number a(G) of such colorings that are mutually inequivalent. For trees T with finite m(T) we obtain the bound (T)≤2m(T)/2 for the existence of such a coloring, and show that a(T)= 2|T| if T is infinite. Similarly, we prove that a(G) = 2|G| for all tree-like graphs G with (G) 20. For rayless or one-ended trees T with arbitrarily large infinite m(T), we prove directly that a(T)= 2|T| if (T) 2m(T).