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SUMMARY:Stephanie Mui (NYU Courant)
DTSTART:20230223T151500Z
DTEND:20230223T170000Z
DTSTAMP:20260422T070132Z
UID:CJCS/106
DESCRIPTION:Title: <a href="https://researchseminars.org/talk/CJCS/106/">O
 n the $L^p$ dual Minkowski problem for $−1 < p < 0$</a>\nby Stephanie Mu
 i (NYU Courant) as part of Copenhagen-Jerusalem Combinatorics Seminar\n\n\
 nAbstract\nThe $L^p$ dual curvature measure was introduced by Lutwak\, Yan
 g\, and Zhang in 2018. The associated Minkowski problem\, known as the $L^
 p$ dual Minkowski problem\, asks about existence of a convex body with pre
 scribed $L^p$ dual curvature measure. This question unifies the previously
  disjoint $L^p$ Minkowski problem with the dual Minkowski problem\, two op
 en questions in convex geometry. In this talk\, we will discuss the existe
 nce of a solution to the $L^p$ dual Minkowski problem for the case of $q <
  p + 1\,$ $−1 < p < 0\,$ and $p\\neq q$ for even measures.\n
LOCATION:https://researchseminars.org/talk/CJCS/106/
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