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SUMMARY:On the Rate of Convergence of Numerical Schemes for Nonlocal Bellm
 an–Isaacs Equations
DTSTART:20260610T090000Z
DTEND:20260610T093000Z
DTSTAMP:20260606T070500Z
UID:indico-event-16762@indico.math.cnrs.fr
DESCRIPTION:Speakers: Indranil Chowdhury\n\nWe discuss convergence rates f
 or monotone approximation schemes for fractional and nonlocal Hamilton–J
 acobi–Bellman and Isaacs equations\, which arise\, for example\, in cont
 rol and game theory as dynamic programming equations. These equations are 
 fully nonlinear and of order less than 2. They may also be degenerate\, an
 d their solutions are generally non-smooth and therefore interpreted in th
 e viscosity sense. We study diffusion-corrected difference–quadrature-ty
 pe monotone numerical schemes and analyze their convergence rates. The rat
 es obtained depend on the regularity of the solutions and their analysis v
 aries significantly across different settings. \n\nhttps://indico.math.cn
 rs.fr/event/16762/
LOCATION:XR203 (XLIM)
URL:https://indico.math.cnrs.fr/event/16762/
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