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Open Accesshttps://doi.org/10.1016/j.spa.2009.11.007
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Cite Publication Date: Dec 5, 2009 | |
 Citations: 1 |  License type: publisher-specific-oa |
Affiliation: KTH Royal Institute of Technology
We prove pointwise ergodic theorems for a class of random measures which occurs in Laplacian growth models, most notably in the anisotropic Hastings–Levitov random cluster models. The proofs are based on the theory of quasi-orthogonal functions and uniform Wiener–Wintner theorems.
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