Limits of P\'olya urns with innovations
Abstract
We consider a version of the classical P\'olya urn scheme which incorporates innovations. The space S of colors is an arbitrary measurable set. After each sampling of a ball in the urn, one returns C balls of the same color and additional balls of different colors given by some finite point process on S. When the number of steps goes to infinity, the empirical distribution of the colors in the urn converges to the normalized intensity measure of , and we analyze the fluctuations. The ratio = E(C)/E(R) of the average number of copies to the average total number of balls returned plays a key role.
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