Abstract
If $Y_n$ is 1 or 0 depending on whether the $n$th ball drawn in a Polya urn scheme is red or not, then the variables $Y_1, Y_2,\ldots$ are exchangeable. It is shown for a generalized class of urn models that no other scheme gives rise to exchangeable variables unless the $Y_n$ are either independent and identically distributed, or deterministic (that is, all of the $Y_n$'s have the same value with probability 1).
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