Large rigid sets of algebras with respect to embeddability
-
Gábor Czédli
and
Danica Jakubíková-Studenovská
Abstract
Let τ be a nonempty similarity type of algebras. A set H of τ-algebras is called rigid with respect to embeddability, if whenever A, B ∈ H and φ: A → B is an embedding, then A = B and φ is the identity map. We prove that if τ is a nonempty similarity type and 𝖒 is a cardinal such that no inaccessible cardinal is smaller than or equal to m, then there exists a set H of τ-algebras such that H is rigid with respect to embeddability and |H| = 𝖒. This result strengthens a result proved by the second author in 1980.
Dedicated to Anatolij Dvurečenskij on his 65th birthday
(Communicated by Sylvia Pulmannová)
This research of the first author was supported by the European Union and co-funded by the European Social Fund under the project “Telemedicine-focused research activities on the field of Mathematics, Informatics and Medical sciences” of project number “TÁMOP-4.2.2.A-11/1/KONV-2012-0073”, and by NFSR of Hungary (OTKA), grant number K83219. The work of the second author was supported by VEGA Grant No. 1/0063/14.
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© 2016 Mathematical Institute Slovak Academy of Sciences
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