Singular Games in bv'NA
Every simple monotonic game in bv'NA is a weighted majority game. Every game v \in bv'NA has a representation v=u+\sum_{i=1}^{\infty}f_i o \mu_i where u \in pNA, \mu_i \in NA^1 and f_i is a sequence of bv' functions with \sum_{i=1}^{\infty}||f_i||<\infty. Moreover, the representation is unique if we require f_i to be singular and that for every i <> j, \mu_i <>\mu_j.
Year of publication: |
2001-08
|
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Authors: | Neyman, Abraham |
Institutions: | Center for the Study of Rationality, Hebrew University of Jerusalem |
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