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Hereditary undecidability of some theories of finite structures
Journal of Symbolic Logic 59 (4):1254-1262 (1994)
Abstract
Using a result of Gurevich and Lewis on the word problem for finite semigroups, we give short proofs that the following theories are hereditarily undecidable: (1) finite graphs of vertex-degree at most 3; (2) finite nonvoid sets with two distinguished permutations; (3) finite-dimensional vector spaces over a finite field with two distinguished endomorphismsLinks
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Citations of this work
An optimal construction of Hanf sentences.Benedikt Bollig & Dietrich Kuske - 2012 - Journal of Applied Logic 10 (2):179-186.
References found in this work
Decidable discriminator varieties from unary varieties.Stanley Burris, Ralph Mckenzie & Matthew Valeriote - 1991 - Journal of Symbolic Logic 56 (4):1355-1368.
The word problem for cancellation semigroups with zero.Yuri Gurevich & Harry R. Lewis - 1984 - Journal of Symbolic Logic 49 (1):184-191.
On the undecidability of finite planar cubic graphs.Solomon Garfunkel & Herbert Shank - 1972 - Journal of Symbolic Logic 37 (3):595-597.
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