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Please use this identifier to cite or link to this item: https://oldena.lpnu.ua/handle/ntb/40254
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dc.contributor.authorPalancı, Osman-
dc.contributor.authorSırma Zeynep Alparslan Gök-
dc.contributor.authorAyşen Gül Yılmaz Büyükyağcı-
dc.date.accessioned2018-04-11T12:10:19Z-
dc.date.available2018-04-11T12:10:19Z-
dc.date.issued2016-
dc.identifier.citationPalancı O. On the interval game-theoretic solutions and their axiomatizations / Osman Palancı, Sırma Zeynep Alparslan Gök, Ayşen Gül Yılmaz Büyükyağcı // Litteris et Artibus : proceedings of the 6th International youth science forum, November 24–26, 2016, Lviv, Ukraine / Lviv Polytechnic National University. – Lviv : Lviv Polytechnic Publishing House, 2016. – P. 67–70. – Bibliography: 9 titles.uk_UA
dc.identifier.urihttps://ena.lpnu.ua/handle/ntb/40254-
dc.description.abstractNatural questions for people or businesses that face interval uncertainty in their data when dealing with cooperation are: Which coalitions should form? How to distribute the collective gains or costs? The theory of cooperative interval games is a suitable tool for answering these questions. In this paper, we introduced and characterizated the new interval solutions concepts, i.e. interval CIS-value, interval ENSC-value and interval equal division solution by using cooperative interval games. Finally, we characterizd these interval solutions for two-player games.uk_UA
dc.language.isoenuk_UA
dc.publisherLviv Polytechnic Publishing Houseuk_UA
dc.subjectcooperative game theoryuk_UA
dc.subjectuncertaintyuk_UA
dc.subjectCIS-valueuk_UA
dc.subjectENSC-valueuk_UA
dc.subjectED-valueuk_UA
dc.titleOn the interval game-theoretic solutions and their axiomatizationsuk_UA
dc.typeConference Abstractuk_UA
dc.contributor.affiliationSüleyman Demirel Universityuk_UA
dc.coverage.countryUAuk_UA
dc.format.pages67-70-
dc.relation.referencesen[1] Alparslan Gök, S.Z., Branzei, R., Tijs, S., 2009. Convex Interval Games. Journal of Applied Mathematics and Decision Sciences, Article ID 342089, 14 pages. [2] Alparslan Gök, S.Z., Branzei, R., Tijs, S., 2010. The interval Shapley value: an axiomatization. Central Euro-pean Journal of Operations Research, 18(2), 131-140. [3] Alparslan Gök, S.Z., Miquel, S., Tijs, S., 2009. Cooperation under interval uncertainty. Mathematical Methods of Operations Research, 69, 99-109. [4] Branzei, R., Dimitrov, D., Tijs, S., 2008. Models in Cooperative Game Theory. Springer-Verlag, 204 pages, Berlin. [5] Driessen, T.S.H., Funaki, Y., 1991. Coincidence of and collinearity between game theoretic solutions. OR Spektrum, 13, 15-30. [6] Hans, P., 2008. Game Theory: A Multi-Leveled Approach. Springer-Verlag, Berlin Heidelberg, 494 pages, Berlin. [7] Moore, R., 1979. Methods and Applications of Interval Analysis. SIAM Studies in Applied Mathematics, 190 pages, Philadelphia. [8] Shapley, L.S., 1953. A value for n-person games. Annals of Mathematics Studies, 28, 307-317. [9] van den Brink, R., Funaki, Y., 2009. Axiomatizations of a class of equal surplus sharing solutions for cooperative games with transferable utility, Theory and Decision, 67, 303-340.uk_UA
dc.citation.conferenceLitteris et Artibus-
dc.coverage.placenameLvivuk_UA
Appears in Collections:Litteris et Artibus. – 2016 р.

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