The Moreau sweeping process is a first-order differential inclusion involving the normal cone to a family of closed moving sets defined on a Hilbert space. Since its introduction by J. J. Moreau in the seventies, the sweeping process has allowed the development of various applications in contact mechanics, electrical circuits, and crowd motion, among others. Recently, and motivated for applications, the optimal control of sweeping processes and their stochastic versions have attracted the attention of researchers. This workshop will be dedicated to recent trends on this subject.
Organizing Committee:
Samir Adly, Henri Massias, Francisco J. Silva (University of Limoges, XLIM, France) and Emilio Vilches (Universidad de O'Higgins, Chile).
Registration:
The registration is free of charge but mandatory.
Registration deadline : june, 28 2024
Funding:
- CNRS through the IEA project "Stochastic Stability Results for Sweeping Processes"
- ANID-Chile through the project "Fondecyt regular 1220886".
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