2020
DOI: 10.1016/j.jpaa.2019.106243
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Projective systemic modules

Abstract: We develop the basic theory of projective modules and splitting in the more general setting of systems. Systems provide a common language for most tropical algebraic approaches including supertropical algebra, hyperrings (specifically hyperfields), and fuzzy rings. This enables us to prove analogues of classical theorems for tropical and hyperring theory in a unified way. In this context we prove a Dual Basis Lemma and versions of Schanuel's Lemma.

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Cited by 8 publications
(4 citation statements)
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“…One can easily see that with Definition 3.19, any free module is projective. We also note that in [JMR19] and [JMR20], more general versions of projective modules are introduced in a framework of systems which include modules over hyperfields.…”
Section: Free Modules and Projective Modules Over Semiringsmentioning
confidence: 99%
“…One can easily see that with Definition 3.19, any free module is projective. We also note that in [JMR19] and [JMR20], more general versions of projective modules are introduced in a framework of systems which include modules over hyperfields.…”
Section: Free Modules and Projective Modules Over Semiringsmentioning
confidence: 99%
“…See [35] for a relatively brief introduction of systems; more details are given in [25], [27], and [34]. Throughout the paper, we let N be the additive monoid of nonnegative integers.…”
Section: Basic Notionsmentioning
confidence: 99%
“…Meanwhile an extensive literature developed around hyperstructures [5,7,16,26,38] and fuzzy rings [10,11]. These constructions were unified by Lorscheid in "blueprints" [30,31], and carried further into a "systemic" algebraic approach taken by [34], and developed in [2,13,25,27] in order to unify classical algebra with the algebraic theories of supertropical algebra, symmetrized semirings, hyperfields, and fuzzy rings, with some success especially in obtaining theorems about matrices, polynomials, and linear algebra.…”
Section: Introductionmentioning
confidence: 99%
“…Semirings in this case seem to provide a reasonable algebraic structure on which homological algebra in characteristic one can be built as it was shown in [CC19] by Connes and Consani. Also, for an approach which simultaneously deals with homological algebra for semirings and hyperfields, we refer the reader to [JMR19].…”
Section: Introductionmentioning
confidence: 99%