TY - JOUR
T1 - Cores of partitioning games
AU - Kaneko, Mamoru
AU - Wooders, Myrna Holtz
PY - 1982
Y1 - 1982
N2 - A generalization of assignment games, called partitioning games, is introduced. Given a finite set N of players, there is an a priori given set π of coalitions of N and only coalitions in π play an essential role. Necessary and sufficient conditions for the nonemptiness of the cores of all games with essential coalitions π are developed. These conditions appear extremely restrictive. However when N is 'large', there are relatively few 'types' of players, and members of π are 'small' and defined in terms of numbers of players of each type contained in subsets, then approximate cores are nonempty.
AB - A generalization of assignment games, called partitioning games, is introduced. Given a finite set N of players, there is an a priori given set π of coalitions of N and only coalitions in π play an essential role. Necessary and sufficient conditions for the nonemptiness of the cores of all games with essential coalitions π are developed. These conditions appear extremely restrictive. However when N is 'large', there are relatively few 'types' of players, and members of π are 'small' and defined in terms of numbers of players of each type contained in subsets, then approximate cores are nonempty.
KW - approximate core
KW - Assignment game
KW - nonempty core
KW - partitioning game
KW - replication
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U2 - 10.1016/0165-4896(82)90015-4
DO - 10.1016/0165-4896(82)90015-4
M3 - Article
AN - SCOPUS:0000561798
SN - 0165-4896
VL - 3
SP - 313
EP - 327
JO - Mathematical Social Sciences
JF - Mathematical Social Sciences
IS - 4
ER -