Laxmi Parida, Pier F. Palamara, et al.
BMC Bioinformatics
In this paper, a dynamic theory for the kernel of n-person games given by Billera is studied. In terms of the (bargaining) trajectories associated with a game (i.e. solutions to the differential equations defined by the theory), an equivalence relation is defined. The "consistency" of these equivalence classes is examined. Then, viewing the pre-kernel as the set of equilibrium points of this system of differential equations, some topological, geometric, symmetry and stability properties of the pre-kernel are given. © 1977 Physica-Verlag.
Laxmi Parida, Pier F. Palamara, et al.
BMC Bioinformatics
Igor Devetak, Andreas Winter
ISIT 2003
Yi Zhou, Parikshit Ram, et al.
ICLR 2023
Robert Manson Sawko, Malgorzata Zimon
SIAM/ASA JUQ