Limits of P\'olya urns with innovations
2022
Online
report
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 $\xi$ 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 $\xi$, and we analyze the fluctuations. The ratio $\rho= E(C)/E(R)$ of the average number of copies to the average total number of balls returned plays a key role.
Comment: We consider much more general replacement scheme compared to the first version. The guiding lines are similar; nonetheless several steps require new arguments
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Limits of P\'olya urns with innovations
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Autor/in / Beteiligte Person: | Bertoin, Jean |
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Veröffentlichung: | 2022 |
Medientyp: | report |
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