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SUMMARY:V-monotone independence in noncommutative probability
DTSTART:20260616T075000Z
DTEND:20260616T085000Z
DTSTAMP:20260615T170100Z
UID:indico-event-16420@indico.math.cnrs.fr
DESCRIPTION:Speakers: Adrian Dacko (Wrocław University)\n\nWe introduce a
 nd study V-monotone independence\, which can be considered as a combinatio
 n of two twin models of independence\, monotone independence and antimonot
 one independence\, into one model. We investigate the combinatorics of mix
 ed moments of V-monotone independent random variables and prove the centra
 l and Poisson limit theorem. We obtain a combinatorial formula for the lim
 it moments and we find the limit measures.\n[1] Adrian Dacko. V-monotone i
 ndependence. Colloq. Math.\, 162(1):77–107\, 2020.[2] Adrian Dacko. Cent
 ral limit theorem for V-monotone independence. Complex Anal. Oper. Th.\, 1
 9(128)\, 2025.[3] Adrian Dacko. Poisson limit theorems for V-monotone inde
 pendence. in preparation\, 2026.[4] Adrian Dacko and Lahcen Oussi. Distrib
 ution for nonsymmetric V-monotone position operators. arXiv:2603.19842\, 2
 026.\n\nhttps://indico.math.cnrs.fr/event/16420/
LOCATION:Johnson (1R3 - 1st floor)
URL:https://indico.math.cnrs.fr/event/16420/
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