Higman's Embedding Theorem in a General Setting and Its Application to Existentially Closed Algebras

Notre Dame Journal of Formal Logic 37 (4):613-624 (1996)
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Abstract

For a quasi variety of algebras K, the Higman Theorem is said to be true if every recursively presented K-algebra is embeddable into a finitely presented K-algebra; the Generalized Higman Theorem is said to be true if any K-algebra which is recursively presented over its finitely generated subalgebra is embeddable into a K-algebra which is finitely presented over this subalgebra. We suggest certain general conditions on K under which the Higman Theorem implies the Generalized Higman Theorem; a finitely generated K-algebra A is embeddable into every existentially closed K-algebra containing a finitely generated K-algebra B if and only if the word problem for A is Q-reducible to the word problem for B. The quasi varieties of groups, torsion-free groups, and semigroups satisfy these conditions

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10.1305/ndjfl/1040046145

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Citations of this work

$$sQ_1$$ -degrees of computably enumerable sets.Roland Sh Omanadze - 2023 - Archive for Mathematical Logic 62 (3):401-417.

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References found in this work

Omitting quantifier-free types in generic structures.Angus Macintyre - 1972 - Journal of Symbolic Logic 37 (3):512-520.
Subgroups of Finitely Presented Groups.G. Higman - 1964 - Journal of Symbolic Logic 29 (4):204-205.

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