ALBERT — All Library Books, journals and Electronic Records Telegrafenberg

1

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Cooperative games in permutational structure (1998)

van der Laan, Gerard ; Talman, Dolf ; Yang, Zaifu

Springer

Economic theory 11 (1998), S. 427-442

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ISSN: 1432-0479

Keywords: JEL Classification Numbers: C71 ; C62.

Source: Springer Online Journal Archives 1860-2000

Topics: Economics

Notes: Summary. By a cooperative game in coalitional structure or shortly coalitional game we mean the standard cooperative non-transferable utility game described by a set of payoffs for each coalition being a nonempty subset of the grand coalition of all players. It is well-known that balancedness is a sufficient condition for the nonemptiness of the core of such a cooperative non-transferable utility game. In this paper we consider non-transferable utility games in which for any coalition the set of payoffs depends on a permutation or ordering upon any partition of the coalition into subcoalitions. We call such a game a cooperative game in permutational structure or shortly permutational game. Doing so we extend the scope of the standard cooperative game theory in dealing with economic or political problems. Next we define the concept of core for such games. By introducing balancedness for ordered partitions of coalitions, we prove the nonemptiness of the core of a balanced non-transferable utility permutational game. Moreover we show that the core of a permutational game coincides with the core of an induced game in coalitional structure, but that balancedness of the permutational game need not imply balancedness of the corresponding coalitional game. This leads to a weakening of the conditions for the existence of a nonempty core of a game in coalitional structure, induced by a game in permutational structure. Furthermore, we refine the concept of core for the class of permutational games. We call this refinement the balanced-core of the game and show that the balanced-core of a balanced permutational game is a nonempty subset of the core. The proof of the nonemptiness of the core of a permutational game is based on a new intersection theorem on the unit simplex, which generalizes the well-known intersection theorem of Shapley.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/s001990050195

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2

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Intersection theorems on polytopes (1999)

van der Laan, Gerard ; Talman, Dolf ; Yang, Zaifu

Springer

Mathematical programming 84 (1999), S. 25-38

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ISSN: 1436-4646

Keywords: Key words: intersection theorem – unit simplex – polytope – closed covering – balancedness

Source: Springer Online Journal Archives 1860-2000

Topics: Computer Science , Mathematics

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/s10107980024a

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3

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Axiomatization of a class of share functions for n-person games (1998)

van der Laan, Gerard ; van den Brink, René

Springer

Theory and decision 44 (1998), S. 117-148

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ISSN: 1573-7187

Keywords: Cooperative game ; Characteristic function form ; Shapley value ; Banzhaf value ; Additivity axiom ; Simple game

Source: Springer Online Journal Archives 1860-2000

Topics: Sociology , Economics

Notes: Abstract The Shapley value is the unique value defined on the class of cooperative games in characteristic function form which satisfies certain intuitively reasonable axioms. Alternatively, the Banzhaf value is the unique value satisfying a different set of axioms. The main drawback of the latter value is that it does not satisfy the efficiency axiom, so that the sum of the values assigned to the players does not need to be equal to the worth of the grand coalition. By definition, the normalized Banzhaf value satisfies the efficiency axiom, but not the usual axiom of additivity. In this paper we generalize the axiom of additivity by introducing a positive real valued function σ on the class of cooperative games in characteristic function form. The so-called axiom ofσ -additivity generalizes the classical axiom of additivity by putting the weight σ(v) on the value of the gamev . We show that any additive function σ determines a unique share function satisfying the axioms of efficient shares, null player property, symmetry and σ-additivity on the subclass of games on which σ is positive and which contains all positively scaled unanimity games. The axiom of efficient shares means that the sum of the values equals one. Hence the share function gives the shares of the players in the worth of the grand coalition. The corresponding value function is obtained by multiplying the shares with the worth of the grand coalition. By defining the function σ appropiately we get the share functions corresponding to the Shapley value and the Banzhaf value. So, for both values we have that the corresponding share functions belong to this class of share functions. Moreover, it shows that our approach provides an axiomatization of the normalized Banzhaf value. We also discuss some other choices of the functionσ and the corresponding share functions. Furthermore we consider the axiomatization on the subclass of monotone simple games.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1023/A:1004972127482

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4

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On the level of cooperative behavior in a local-interaction model (2000)

Tieman, Alexander F. ; Houba, Harold ; Laan, Gerard

Springer

Journal of economics 71 (2000), S. 1-30

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ISSN: 1617-7134

Keywords: evolution ; local interaction ; cooperation ; prisoner's dilemma ; Markov processes ; C78

Source: Springer Online Journal Archives 1860-2000

Topics: Economics

Notes: Abstract We study local interaction within a population located on a connected graph. Subjects engage in several bilateral interactions during each round in a generalized Prisoners' Dilemma (PD). In each round of play one randomly selected player gets the possibility to update the action he plays in this PD. All individuals use the update rule “Win Cooperate, Lose Defect,” a multi-player variant of Tit-for-Tat. Theoretical results on the set of stable states of the associated dynamics are provided for the cases with and without rare mutations. Simulations provide insight into the probability distribution over these stable states. In both cases a rather high probability is assigned to stable states with a moderate level of cooperation implying that dominated strategies are used. Furthermore, the probability of reaching the stable state with Nash equilibrium play is small.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01227494

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Evolutionary Game Theory and the Modeling of Economic Behavior (1998)

Van der Laan, Gerard ; Tieman, Xander

Springer

De economist 146 (1998), S. 59-89

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ISSN: 1572-9982

Keywords: noncooperative symmetric bimatrix game ; evolutionary stable strategy ; replicator dynamics ; learning and imitation ; metastrategy ; stable population

Source: Springer Online Journal Archives 1860-2000

Topics: Economics

Notes: Abstract Since the 1950s economists have applied game-theoretical concepts to a wide variety of economic problems. The Nash equilibrium concept has proven to be a powerful instrument in analyzing the outcome of economic processes. Since the late 1980s economists have also shown a growing interest in the application of evolutionary game theory. This paper discusses the main concepts of evolutionary game theory and their applicability to economic issues. Whereas traditional game theory focusses on the static Nash equilibria as the possible outcomes of the game, evolutionary game theory teaches us to explicitly model the behavior of individuals outside equilibrium. This may provide us with a better understanding of the dynamic forces within a society of interacting individuals.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1023/A:1003253925406

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6

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On the existence and computation of an equilibrium in an economy with constant returns to scale production (1993)

Laan, Gerard ; Kremers, Hans

Springer

Annals of operations research 44 (1993), S. 143-160

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ISSN: 1572-9338

Keywords: Constant returns to scale production ; equilibrium ; adjustment process ; simplicial approximation

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics , Economics

Notes: Abstract In this paper we consider the problem of finding an equilibrium in an economy with non-linear constant returns to scale production activities. To find an equilibrium we propose an adjustment process in which the prices of the commodities and the activity levels of production adjust simultaneously. The process starts at a price vector at which each production activity has non-positive profit. We show that the process follows a path which connects the starting point with an equilibrium of the economy. From this it follows that the existence of a price vector at which each production activity has non-positive profit implies the existence of an equilibrium. The equilibrium can be computed by using a simplicial algorithm or by solving a sequence of Linear Variational Inequality Problems.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF02061064

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7

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Axiomatizations of the normalized Banzhaf value and the Shapley value (1998)

van den Brink, René ; van der Laan, Gerard

Springer

Social choice and welfare 15 (1998), S. 567-582

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ISSN: 1432-217X

Source: Springer Online Journal Archives 1860-2000

Topics: Sociology , Economics

Notes: Abstract. A cooperative game with transferable utilities– or simply a TU-game – describes a situation in which players can obtain certain payoffs by cooperation. A solution concept for these games is a function which assigns to every such a game a distribution of payoffs over the players in the game. Famous solution concepts for TU-games are the Shapley value and the Banzhaf value. Both solution concepts have been axiomatized in various ways. An important difference between these two solution concepts is the fact that the Shapley value always distributes the payoff that can be obtained by the `grand coalition' consisting of all players cooperating together while the Banzhaf value does not satisfy this property, i.e., the Banzhaf value is not efficient. In this paper we consider the normalized Banzhaf value which distributes the payoff that can be obtained by the `grand coalition' proportional to the Banzhaf values of the players. This value does not satisfy certain axioms underlying the Banzhaf value. In this paper we introduce some new axioms that characterize the normalized Banzhaf value. We also provide an axiomatization of the Shapley value using similar axioms.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/s003550050125

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