Interacting urn models with strong reinforcement
2023
Online
report
We disprove a conjecture by Launay that almost surely one color monopolizes all the urns for the interacting urn model with polynomial reinforcement and parameter $p>0$. Moreover, we prove that the critical parameter $p_m$ converges to $1/2$ as $m$, the degree of the polynomial, goes to infinity. In the case $p=1$, Launay proved that a.s. one color monopolizes all the urns if the reinforcement sequence is non-decreasing and reciprocally summable. We give a short proof of that result and generalize it to a larger class of reinforcement sequences.
Comment: 26 pages
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Interacting urn models with strong reinforcement
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Autor/in / Beteiligte Person: | Qin, Shuo |
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Veröffentlichung: | 2023 |
Medientyp: | report |
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