English

Back and Forth Systems of Condensations

Logic 2018-07-03 v1

Abstract

If LL is a relational language, an LL-structure X{\mathbb X} is condensable to an LL-structure Y{\mathbb Y}, we write XcY{\mathbb X} \preccurlyeq _c {\mathbb Y}, iff there is a bijective homomorphism (condensation) from X{\mathbb X} onto Y{\mathbb Y}. We characterize the preorder c\preccurlyeq _c, the corresponding equivalence relation of bi-condensability, XcY{\mathbb X} \sim _c {\mathbb Y}, and the reversibility of LL-structures in terms of back and forth systems and the corresponding games. In a similar way we characterize the Pω{\mathcal P}_{\infty \omega}-equivalence (which is equivalent to the generic bi-condensability) and the P{\mathcal P}-elementary equivalence of LL-structures, obtaining analogues of Karp's theorem and the theorems of Ehrenfeucht and Fra\"iss\'e. In addition, we establish a hierarchy between the similarities of structures considered in the paper. Applying these results we show that homogeneous universal posets are not reversible and that a countable LL-structure X{\mathbb X} is weakly reversible (that is, satisfies the Cantor-Schr\"oder-Bernstein property for condensations) iff its PωNω{\mathcal P}_{\infty \omega}\cup {\mathcal N}_{\infty \omega}-theory is countably categorical.

Keywords

Cite

@article{arxiv.1807.00338,
  title  = {Back and Forth Systems of Condensations},
  author = {Miloš S. Kurilić},
  journal= {arXiv preprint arXiv:1807.00338},
  year   = {2018}
}

Comments

22 pages

R2 v1 2026-06-23T02:47:21.286Z