Continuous Values are Diagonal
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It is proved that every continuous value is diagonal, which in particular implies that every value on a closed reproducing space is diagonal. We deduce also that there are noncontinuous values.
[1] A. Bellow. A problem in LP-spaces , 1976 .
[2] L. Shapley,et al. Values of Non-Atomic Games , 1974 .
[3] Yair Tauman,et al. The Existence of Nondiagonal Axiomatic Values , 1976, Math. Oper. Res..
[4] Yair Tauman. A Nondiagonal Value on a Reproducing Space , 1977, Math. Oper. Res..
[5] D. L. Hanson,et al. On the mean ergodic theorem for subsequences , 1960 .