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SUMMARY:Hunter Spink (Stanford University)
DTSTART:20220922T180000Z
DTEND:20220922T190000Z
DTSTAMP:20260423T035738Z
UID:OLS/105
DESCRIPTION:Title: <a href="https://researchseminars.org/talk/OLS/105/">Ra
 ndom walks and combinatorial dimensions in o-minimal groups</a>\nby Hunter
  Spink (Stanford University) as part of Online logic seminar\n\n\nAbstract
 \nI will discuss some ideas that go into showing that $n$-independent-step
  random walks in o-minimally definable group over the real numbers (like a
  semi-algebraic group) has at most an $n^{-C}$ probability of finishing on
  a lower-dimensional target set unless the target set contains an ``expone
 ntial arc''\, where $C$ only depends on the dimension of the target set.\n
LOCATION:https://researchseminars.org/talk/OLS/105/
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