J. F. Banzhaf, Weighted voting does not work: A mathematical analysis, Rutgers Law Review, vol.19, pp.317-343, 1965.

A. Charnes, B. Golany, M. Keane, and J. Rousseau, Extremal principle solutions of games in characteristic function form: core, Chebychev and Shapley value generalizations, Econometrics of Planning and Efficiency, pp.123-133, 1988.

J. Derks, H. Haller, and H. Peters, The selectope for cooperative games, Int. J. of Game Theory, vol.29, pp.23-38, 2000.

G. Ding, R. Lax, J. Chen, P. Chen, and B. Marx, Transforms of pseudo-boolean random variables, Discrete Applied Mathematics, vol.158, pp.13-24, 2010.

U. Faigle, W. Kern, and G. Still, Algorithmic Principles of Mathematical Programming, 2002.

U. Faigle and J. Voss, A system-theoretic model for cooperation, interaction and allocation, Discrete Applied Mathematics, vol.159, pp.1736-1750, 2011.

M. Grabisch, Set Functions, Games and Capacities in Decision Making, Theory and Decision Library C, vol.46, 2016.
URL : https://hal.archives-ouvertes.fr/hal-01372911

M. Grabisch and C. Labreuche, Fuzzy measures and integrals in MCDA, Multiple Criteria Decision Analysis, pp.563-608, 2005.
URL : https://hal.archives-ouvertes.fr/halshs-00268985

M. Grabisch, J. Marichal, and M. Roubens, Equivalent representations of set functions, Mathematics of Operations Research, vol.25, issue.2, pp.157-178, 2000.
URL : https://hal.archives-ouvertes.fr/hal-01194919

P. L. Hammer and R. Holzman, On approximations of pseudo-Boolean functions, 1987.

P. L. Hammer and R. Holzman, On approximations of pseudo-Boolean functions. ZOR -Methods and Models of Operations Research, vol.36, pp.3-21, 1992.

P. L. Hammer and S. Rudeanu, Boolean Methods in Operations Research and Related Areas, 1968.

K. Kultti and H. Salonen, Minimum norm solutions for cooperative games, Int. J. of Game Theory, vol.35, pp.591-602, 2007.

J. Marichal and P. Mathonet, Weighted Banzhaf power and interaction indexes through weighted approximations of games, Eur. J. of Operations Research, vol.211, pp.352-358, 2011.

B. Peleg and P. Sudhölter, Introduction to the theory of cooperative games, 2003.

L. M. Ruiz, F. Valenciano, and J. M. Zarzuelo, The family of least-square values for transferable utility games, Games and Economic Behavior, vol.24, pp.109-130, 1998.

L. M. Ruiz, F. Valenciano, and J. M. Zarzuelo, Some new results on least square values for tu games, TOP, vol.6, pp.139-158, 1998.

D. Schmeidler, Subjective Probability and Expected Utility without Additivity, Econometrica, vol.57, issue.3, pp.571-587, 1989.

L. S. Shapley, A value for n-person games, Contributions to the Theory of Games, vol.II, pp.307-317, 1953.

H. Sun, Z. Hao, and G. Xu, Optimal solutions for TU-games with decision approach, 2013.

T. Tanino, One-point solutions obtained from best approximation problems for cooperative games, Kybernetika, vol.49, pp.395-403, 2013.

R. J. Weber, Probabilistic values for games, The Shapley Value, pp.101-120, 1988.