In general, game theory is an academic field that applies pure mathematical results to the analysis of various interaction relationships and related models among agents and coalitions. In addition to theoretical analysis, game-theoretical results could also be adopted to provide optimal conditions and equilibrium for real-world models. In particular, improvements in the efficiency of sports management could potentially be realized by applying the theoretical results from analyses of various other fields. Therefore, the purpose of this paper is to adopt some game-theoretical results to investigate the relations among some results of the interval Shapley value and the field of sports management. The main investigative steps are as follows: (1) We introduced basic mathematical models of game theory under uncertainty, and extended these models to the framework of sports management. (2) Different from the potential approach on interval transferable-utility games, we adopted the dividend approach to provide an alternative viewpoint for the interval Shapley value. Further, we applied the dividend approach to show that the interval Shapley value satisfies consistency. (3) The real-world relevance of this approach and related game-theoretical results can be confirmed by some results related to management science. (4) Finally, we applied these game-theoretical results of the interval Shapley value to the framework of sports management. We conclude that the interval Shapley value can be applied to the field of sports management. The extended suggestions also pointed out that other game-theoretical methods under uncertainty may be applied to the field of sports management.