TY - JOUR
T1 - Supertropical monoids
T2 - Basics and canonical factorization
AU - Izhakian, Zur
AU - Knebusch, Manfred
AU - Rowen, Louis
N1 - Funding Information: The research of the first author was supported by the Oberwolfach Leibniz Fellows Programme (OWLF), Mathematisches Forschungsinstitut Oberwolfach, Germany. The research of the first and third authors has been supported by the Israel Science Foundation (grant No. 448/09). The research of the second author was supported in part by the Gelbart Institute at Bar-Ilan University, the Minerva Foundation at Tel-Aviv University, the Department of Mathematics of Bar-Ilan University, and the Emmy Noether Institute at Bar-Ilan University.
PY - 2013/11
Y1 - 2013/11
N2 - A supertropical monoid is a monoid U together with a projection onto a totally ordered submonoid eU (where e∈ U is idempotent). Supertropical monoids are slightly more general than the supertropical semirings that were introduced and used by the first and the third authors for refinements of tropical geometry and matrix theory, and then studied systematically by the authors in connection with " supervaluations", and they permit a finer investigation of the supertropical theory.In the present paper we extend our earlier study of the category STROP of supertropical semirings to a category STROPm of supertropical monoids whose morphisms are "transmissions", defined analogously as for supertropical semirings. Moreover, there is associated to every supertropical monoid V a canonical supertropical semiring V̂.A central problem in Izhakian etal. (2011)[8-10] has been to find the quotient U/E of a supertropical semiring U by a "TE-relation", which is a certain kind of congruence. This quotient always exists in STROPm, and is the natural quotient in STROP in case U/E happens to be a supertropical semiring. Otherwise, analyzing (U/E)∧, we obtain a mild modification of E to a TE-relation E' such that U/E'=(U/E)∧ in STROP.In this way we now can solve problems about universality in the category STROP that were left open in our earlier work, and gain further insight into the structure of transmissions and supervaluations which leads to new results on totally ordered supervaluations and monotone transmissions.
AB - A supertropical monoid is a monoid U together with a projection onto a totally ordered submonoid eU (where e∈ U is idempotent). Supertropical monoids are slightly more general than the supertropical semirings that were introduced and used by the first and the third authors for refinements of tropical geometry and matrix theory, and then studied systematically by the authors in connection with " supervaluations", and they permit a finer investigation of the supertropical theory.In the present paper we extend our earlier study of the category STROP of supertropical semirings to a category STROPm of supertropical monoids whose morphisms are "transmissions", defined analogously as for supertropical semirings. Moreover, there is associated to every supertropical monoid V a canonical supertropical semiring V̂.A central problem in Izhakian etal. (2011)[8-10] has been to find the quotient U/E of a supertropical semiring U by a "TE-relation", which is a certain kind of congruence. This quotient always exists in STROPm, and is the natural quotient in STROP in case U/E happens to be a supertropical semiring. Otherwise, analyzing (U/E)∧, we obtain a mild modification of E to a TE-relation E' such that U/E'=(U/E)∧ in STROP.In this way we now can solve problems about universality in the category STROP that were left open in our earlier work, and gain further insight into the structure of transmissions and supervaluations which leads to new results on totally ordered supervaluations and monotone transmissions.
UR - http://www.scopus.com/inward/record.url?scp=84878367328&partnerID=8YFLogxK
U2 - https://doi.org/10.1016/j.jpaa.2013.02.004
DO - https://doi.org/10.1016/j.jpaa.2013.02.004
M3 - مقالة
SN - 0022-4049
VL - 217
SP - 2135
EP - 2162
JO - Journal of Pure and Applied Algebra
JF - Journal of Pure and Applied Algebra
IS - 11
ER -