English

Permutation monoids and MB-homogeneity for graphs and relational structures

Group Theory 2019-02-12 v2 Combinatorics

Abstract

In this paper, we investigate the connection between infinite permutation monoids and bimorphism monoids of first-order structures. Taking our lead from the study of automorphism groups of structures as infinite permutation groups and the more recent developments in the field of homomorphism-homogeneous structures, we establish a series of results that underline this connection. Of particular interest is the idea of MB-homogeneity; a relational structure M\mathcal{M} is MB-homogeneous if every monomorphism between finite substructures of M\mathcal{M} extends to a bimorphism of M\mathcal{M}. The results in question include a characterisation of closed permutation monoids, a Fra\"{i}ss\'{e}-like theorem for MB-homogeneous structures, and the construction of 202^{\aleph_0} pairwise non-isomorphic countable MB-homogeneous graphs. We prove that any finite group arises as the automorphism group of some MB-homogeneous graph and use this to construct oligomorphic permutation monoids with any given finite group of units. We also consider MB-homogeneity for various well-known examples of homogeneous structures and in particular give a complete classification of countable homogeneous undirected graphs that are also MB-homogeneous.

Keywords

Cite

@article{arxiv.1802.04166,
  title  = {Permutation monoids and MB-homogeneity for graphs and relational structures},
  author = {Thomas D. H. Coleman and David M. Evans and Robert D. Gray},
  journal= {arXiv preprint arXiv:1802.04166},
  year   = {2019}
}

Comments

34 pages, 12 figures; to appear in the European Journal of Combinatorics

R2 v1 2026-06-23T00:19:32.786Z