Svante Janson
Published 2017-11-27Version 1
We consider the general version of P\'olya urns recently studied by Bandyopadhyay and Thacker (2016+) and Mailler and Marckert (2017), with the space of colours being any Borel space $S$ and the state of the urn being a finite measure on $S$. We consider urns with random replacements, and show that these can be regarded as urns with deterministic replacements using the colour space $S\times[0,1]$.
Limits of Pólya urns with innovations
A.s. convergence for infinite colour Pólya urns associated with random walks
Pólya urns with immigration at random times
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