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Discrete arbitration procedure

Discrete arbitration procedure. Yulia Tokareva Zabaikalie State Pedagogical University Chita Russia. . -n, -(n-1), …, -1, 0, 1, …, (n-1), n. [ - a, a ]. p=1/(2n+1). g(y)=f(-y).  < a.  = a.

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Discrete arbitration procedure

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  1. Discrete arbitration procedure Yulia Tokareva Zabaikalie State Pedagogical University Chita Russia

  2. -n, -(n-1), …, -1, 0, 1, …, (n-1), n [-a, a] p=1/(2n+1) g(y)=f(-y)

  3. <a =a

  4. V.V. Mazalov, A.E. Mentcher, J.S. Tokareva, On A Discrete Arbitration Procedure, Scientiae Mathematica Japonica, no.3 (2006) • A.E. Mentcher, J.S. Tokareva, On A Discrete Arbitration Scheme, Survey of Applied and Industrial Mathematics (2007) • H. Farber An analysis of final-offer arbitration, Journal of conflict resolution 35 (1980) • K. Chatterjee, Comparison of arbitration procedures: Models with complete and incomplete information, IEEE Transactions on Systems, Man, and Cybernetics smc-11, no. 2 (1981) • R. Gibbons, A Primer in Game Theory, Prentice Hall, 1992 • D.M. Kilgour, Game-theoretic properties of final-offer arbitration, Group Decision and Negot. 3 (1994) • V.V. Mazalov, A.A. Zabelin, Equilibrium in an arbitration procedure, Advances in Dynamic Games 7 (2004), Birkhauser • V.V. Mazalov, A.E. Mentcher, J.S. Tokareva, On a discrete arbitration procedure in three points, Game Theory and Applications 11 (2005), Nova Science Publishers, N.Y. • M. Sakaguchi, A time-sequential game related to an arbitration procedure, Math. Japonica 29, no. 3 (1984) • V.V. Mazalov, M.Sakaguchi, A.A. Zabelin, Multistage arbitration game with random offers, Game Theory and Applications 8 (2002), Nova Science Publishers, N.Y.

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