Multifunctions and Integrands [electronic resource] : Stochastic Analysis, Approximation and Optimization Proceedings of a Conference held in Catania, Italy, June 7–16, 1983 /
Variational systems, an introduction -- Extension of the class of Markov controls -- Limit laws for multifunctions applied to an optimization problem -- Variational properties of EPI-convergence, applications to limit analysis problems in mechanics and duality theory -- Slow and heavy viable trajectories of controlled problems. Smooth viability domains -- A new class of evolution equation in a Hilbert space -- A fixed point theorem for subsets of L1 -- Modelling sets -- On a definition of ?-convergence of measures -- Strong laws of large numbers for multivalued random variables -- Approaches to weak convergence -- Critical points and evolution equations -- Decomposability as a substitute for convexity -- Multifunctions associated with parameterized classes of constrained optimization problems -- Continuity of measurable convex multifunctions -- Some bang-bang theorems.
Main Authors: | , |
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Format: | Texto biblioteca |
Language: | eng |
Published: |
Berlin, Heidelberg : Springer Berlin Heidelberg : Imprint: Springer,
1984
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Subjects: | Mathematics., System theory., Calculus of variations., Probabilities., Probability Theory and Stochastic Processes., Systems Theory, Control., Calculus of Variations and Optimal Control; Optimization., |
Online Access: | http://dx.doi.org/10.1007/BFb0098799 |
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Summary: | Variational systems, an introduction -- Extension of the class of Markov controls -- Limit laws for multifunctions applied to an optimization problem -- Variational properties of EPI-convergence, applications to limit analysis problems in mechanics and duality theory -- Slow and heavy viable trajectories of controlled problems. Smooth viability domains -- A new class of evolution equation in a Hilbert space -- A fixed point theorem for subsets of L1 -- Modelling sets -- On a definition of ?-convergence of measures -- Strong laws of large numbers for multivalued random variables -- Approaches to weak convergence -- Critical points and evolution equations -- Decomposability as a substitute for convexity -- Multifunctions associated with parameterized classes of constrained optimization problems -- Continuity of measurable convex multifunctions -- Some bang-bang theorems. |
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