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Preprint Number 585
585. Tal Perri
A model theoretic construction for layered semifields
Submission date: 20 May 2013.
In this paper we introduce a model theoretic construction for the theories of uniform layered domains and semifields introduced in the paper of Izhakian, Knebusch and Rowen. We prove that, for a given layering semiring L, the theory of uniform L-layered divisibly closed semifields is complete. In the process of doing so, we prove that this theory has quantifier elimination and consequently is model complete. Model completeness of uniform L-layered divisibly closed has some important consequences regarding the uniform L-layered semifields theory. One example involves equating polynomials. Namely, model completeness insures us that if two polynomials are equal over a divisibly closed uniform L-layered semifield, then they are equal over any divisibly closed uniform L-layered extension of that semifield, and thus over any uniform L-layered domain extending the semifield (as it is contained in its divisible closure of its semifield of fractions). At the end of this paper we apply our results to the theory of max-plus algebras as a special case of uniform L -layered domains.
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