Cooperation under interval uncertainty

S.Z. Alparslan-Gok, S. Miquel, S.H. Tijs

Research output: Contribution to journalArticleScientificpeer-review

Abstract

In this paper, the classical theory of two-person cooperative games is extended to two-person cooperative games with interval uncertainty. The core, balancedness, superadditivity and related topics are studied. Solutions called ψ α-values are introduced and characterizations are given.
Original languageEnglish
Pages (from-to)99-109
JournalMathematical Methods of Operations Research
Volume69
Issue number1
Publication statusPublished - 2009

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Two-person Games
Cooperative Game
Superadditivity
Balancedness
Uncertainty
Interval
Cooperative game
Classical theory

Cite this

Alparslan-Gok, S. Z., Miquel, S., & Tijs, S. H. (2009). Cooperation under interval uncertainty. Mathematical Methods of Operations Research, 69(1), 99-109.
Alparslan-Gok, S.Z. ; Miquel, S. ; Tijs, S.H. / Cooperation under interval uncertainty. In: Mathematical Methods of Operations Research. 2009 ; Vol. 69, No. 1. pp. 99-109.
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Alparslan-Gok, SZ, Miquel, S & Tijs, SH 2009, 'Cooperation under interval uncertainty', Mathematical Methods of Operations Research, vol. 69, no. 1, pp. 99-109.

Cooperation under interval uncertainty. / Alparslan-Gok, S.Z.; Miquel, S.; Tijs, S.H.

In: Mathematical Methods of Operations Research, Vol. 69, No. 1, 2009, p. 99-109.

Research output: Contribution to journalArticleScientificpeer-review

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AU - Alparslan-Gok, S.Z.

AU - Miquel, S.

AU - Tijs, S.H.

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PY - 2009

Y1 - 2009

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AB - In this paper, the classical theory of two-person cooperative games is extended to two-person cooperative games with interval uncertainty. The core, balancedness, superadditivity and related topics are studied. Solutions called ψ α-values are introduced and characterizations are given.

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JO - Mathematical Methods of Operations Research

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Alparslan-Gok SZ, Miquel S, Tijs SH. Cooperation under interval uncertainty. Mathematical Methods of Operations Research. 2009;69(1):99-109.