Necessary players and values (2401.16930v1)

Abstract: In this paper we introduce the $\Gamma$ value, a new value for cooperative games with transferable utility. We also provide an axiomatic characterization of the $\Gamma$ value based on a property concerning the so-called necessary players. A necessary players of a game is one without which the characteristic function is zero. We illustrate the performance of the $\Gamma$ value in a particular cost allocation problem that arises when the owners of the apartments in a building plan to install an elevator and share its installation cost; in the resulting example we compare the proposals of the $\Gamma$ value, the equal division value and the Shapley value in two different scenarios. In addition, we propose an extension of the $\Gamma$ value for cooperative games with transferable utility and with a coalition structure. Finally, we provide axiomatic characterizations of the coalitional $\Gamma$ value and of the Owen and Banzhaf-Owen values using alternative properties concerning necessary players.