Antichains of Copies of Ultrahomogeneous Structures

Abstract: We investigate possible cardinalities of maximal antichains in the poset of copies P(X), ⊂ of a countable ultrahomogeneous relational structure X. It turns out that if the age of X has the strong amalgamation property, then, defining a copy of X to be large iff it has infinite intersection with each orbit of X, the structure X can be partitioned into countably many large copies, there are almost disjoint families of large copies of size continuum and, hence, there are (maximal) antichains of size continuum in … Show more

“…Results on the theme of copies of an homogeneous structure have been developped in a series of papers by Kurilić, Kuzeljević and Todorcević (e.g. [9,10,11,12]). Some of the results presented here have been the subject of a lecture by the third author in March 2019 at the FG1 Seminar of the Technical University of Vienna [18].…”

The poset of copies for automorphism groups of countable relational structures

“…Results on the theme of copies of an homogeneous structure have been developped in a series of papers by Kurilić, Kuzeljević and Todorcević (e.g. [9,10,11,12]). Some of the results presented here have been the subject of a lecture by the third author in March 2019 at the FG1 Seminar of the Technical University of Vienna [18].…”

The poset of copies for automorphism groups of countable relational structures