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Article

Kala, Vítězslav ; Kepka, Tomáš ; Korbelář, Miroslav
Notes on commutative parasemifields. (English). Commentationes Mathematicae Universitatis Carolinae, vol. 50 (2009), issue 4, pp. 521-533
MSC: 16Y60 | MR 2583130 | Zbl 1203.16038
Keywords:
semiring; ideal-simple; parasemifield; finitely generated
Summary:
Parasemifields (i.e., commutative semirings whose multiplicative semigroups are groups) are considered in more detail. We show that if a parasemifield $S$ contains $\Bbb Q^+$ as a subparasemifield and is generated by $\Bbb Q^{+}\cup \{a\}$, $a\in S$, as a semiring, then $S$ is (as a semiring) not finitely generated.
References:
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[2] Kala V., Kepka T.: A note on finitely generated ideal-simple commutative semirings. Comment. Math. Univ. Carolin. 49 (2008), 1--9. MR 2432815 | Zbl 1192.16045
[3] Weinert H.J., Wiegandt R.: On the structure of semifields and lattice-ordered groups. Period. Math. Hungar. 32 (1996), 147--162. DOI 10.1007/BF01879738 | MR 1407915 | Zbl 0896.12001
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