E. Algaba, J. M. Bilbao, R. Van-den, A. Brink, and . Jiménez-losada, Cooperative games on antimatroids, Discrete Mathematics, vol.282, issue.1-3, pp.1-15, 2004.
DOI : 10.1016/j.disc.2003.10.019
URL : http://doi.org/10.1016/j.disc.2003.10.019

J. Barthélemy, Monotone Functions on Finite Lattices: An Ordinal Approach to Capacities, Belief and Necessity Functions, Preferences and Decisions under Incomplete Knowledge, pp.195-208
DOI : 10.1007/978-3-7908-1848-2_11

J. M. Bilbao, N. Jiménez, E. Lebrón, and H. Peters, The selectope for games with partial cooperation, Discrete Mathematics, vol.216, issue.1-3, pp.11-27, 2000.
DOI : 10.1016/S0012-365X(99)00294-0

O. Bondareva, Some applications of linear programming to the theory of 480 cooperative games, Problemy Kibernet, vol.10, pp.119-139, 1963.

A. Chateauneuf and J. Jaffray, Some characterizations of lower probabilities 482 and other monotone capacities through the use of Möbius inversion

U. Faigle, W. Kern, S. Fekete, and W. Hochstättler, The nucleon of cooperative 488 games and an algorithm for matching games [9] S. Fujishige. Submodular functions and optimization, Mathematical Programming, pp.195-211, 1998.

]. J. Harsanyi-]-t, . Ichiishi-]-p, M. Miranda, and . Grabisch, A simplified bargaining model for the n-person cooperative 495 game Super-modularity: applications to convex games and to the greedy 497 algorithm for LP [13] L. Lovász. Submodular function and convexity Optimization issues for fuzzy measures, Fuzzy Sets and Systems Mathematical programming. The state of the art 502 of Uncertainty, Fuzziness, and Knowledge-Based Systems [15] P. Miranda and M. Grabisch. k-balanced capacities Proc. of the Int. Fuzzy 504, pp.167-189, 1963.

]. G. Rota and L. S. Shapley, On the foundations of combinatorial theory I. Theory of Möbius 507 functions Zeitschrift für Wahrscheinlichkeitstheorie und Verwandte Gebiete Core of convex games, Int. J. Game Theory, vol.50817, issue.1, pp.340-368, 1964.