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UID:20260527T201552EDT-5685XuGmED@132.216.98.100
DTSTAMP:20260528T001552Z
DESCRIPTION:Schroedingerian subharmonic functions\n\nSchroedingerian subhar
 monic functions are weak subsolutions of the stationary Schroedinger equat
 ion −∆u(x) + c(x)u(x) = 0 under appropriate assumptions on the potential c
 \, defined in an n-dimensional domain in R^n. For these functions\, we con
 sider the generalizations and analogs of properties of the classical subha
 rmonic functions\, such as\, e.g.\, the Phragmen-Lindelof principle\, the 
 Fatou pointwise theorem\, the Blaschke\, Hayman-Azarin\, Matsaev theorems.
  If the potential c(x) is dominated by the inverse square |x|^(−2) \, then
  the results are similar to those in the classical case\, while if the pot
 ential grows faster\, certain properties are essentially different.\n
DTSTART:20171124T190000Z
DTEND:20171124T200000Z
LOCATION:Room VCH-2820\, CA\, Université Laval
SUMMARY:Alexander Kheyfits\, CUNY
URL:https://www.mcgill.ca/mathstat/channels/event/alexander-kheyfits-cuny-2
 82956
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