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[02391] Null controllability of semilinear differential inclusion with nonlocal condition

• Session Time & Room : 3C (Aug.23, 13:20-15:00) @G402
• Type : Contributed Talk
• Abstract : We discuss the null controllability of semilinear differential inclusion with the nonlocal condition using $L^p([0, a], U)$ control, where $U$ may be a separable Hilbert space or uniformly convex Banach space. Undoubtedly, exact controllability is much more beneficial than null controllability. But, null controllability plays its role in a system where exact controllability does not hold. Differential inclusion can properly define partial differential equations involving jump discontinuous functions.
• Classification : 34G10
• Format : Talk at Waseda University
• Author(s) :
  • BHOLANATH KUMBHAKAR (DEPARTMENT OF MATHEMATICS, INDIAN INSTITUTE OF TECHNOLOGY ROORKEE)
  • DWIJENDRA NARAIN PANDEY (DEPARTMENT OF MATHEMATICS, INDIAN INSTITUTE OF TECHNOLOGY ROORKEE)