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SUMMARY:Sidon sets\, generalized jacobians and monodromy
DTSTART;VALUE=DATE-TIME:20230125T141500
DTEND;VALUE=DATE-TIME:20230125T151500
UID:025193681536e4bcd1014c886c06958b7f68bb9b207e10a1e69e11a3
CATEGORIES:Conferences - Seminars
DESCRIPTION:Emmanuel Kowalski (ETHZ)\n(joint work with A. Forey and J. Fre
sán)\nA subset of an abelian group such that the sum of two elements from
that subset determine the summands is called a Sidon set. We will explain
how algebraic curves embedded in their generalized jacobians are very oft
en Sidon sets\, and describe how some of these give new examples of intere
st for combinatorics. We will also explain the applications of Sidon sets
in the computation of monodromy groups using Larsen's Alternative.
LOCATION:GR A3 32 https://plan.epfl.ch/?room==GR%20A3%2031
STATUS:CONFIRMED
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