Controlled Markov Processes and Viscosity SolutionsThis book is intended as an introduction to optimal stochastic control for continuous time Markov processes and to the theory of viscosity solutions. |
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Page xiv
... respectively . We denote the gradient vector and matrix of second - order partial deriva- tives of by Do = ( x1 , ··· , xn ) , ... D2 = ( Px 、 x , ) , i , j = 1 , ··· , n . Sometimes these are denoted instead by or , Prz , respectively ...
... respectively . We denote the gradient vector and matrix of second - order partial deriva- tives of by Do = ( x1 , ··· , xn ) , ... D2 = ( Px 、 x , ) , i , j = 1 , ··· , n . Sometimes these are denoted instead by or , Prz , respectively ...
Page 3
... respectively , the inventory and control vectors at times , and the demand vector . The rate of change of the inventory x ( s ) € R " is ( 2.1 ) d + x ( s ) = -x ( s ) = u ( s ) – d . ds - Let us consider the production planning problem ...
... respectively , the inventory and control vectors at times , and the demand vector . The rate of change of the inventory x ( s ) € R " is ( 2.1 ) d + x ( s ) = -x ( s ) = u ( s ) – d . ds - Let us consider the production planning problem ...
Page 247
... respectively . Assume ( 8.1 ) and that W , V are upper semicontinuous and lower semicontinuous on Q , respectively . Then ( 8.3 ) holds . In particular WV on Q if this inequality holds on * Q . The elliptic version of the comparison ...
... respectively . Assume ( 8.1 ) and that W , V are upper semicontinuous and lower semicontinuous on Q , respectively . Then ( 8.3 ) holds . In particular WV on Q if this inequality holds on * Q . The elliptic version of the comparison ...
Contents
Viscosity Solutions | 53 |
Controlled Markov Diffusions in R | 157 |
SecondOrder Case | 213 |
Copyright | |
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Controlled Markov Processes and Viscosity Solutions Wendell H. Fleming,Halil Mete Soner Limited preview - 2006 |
Controlled Markov Processes and Viscosity Solutions Wendell H. Fleming,Halil Mete Soner No preview available - 2006 |
Common terms and phrases
admissible control assume assumptions boundary condition boundary data bounded c₁ C¹(Q calculus of variations Chapter classical solution consider constant convergence convex Corollary cylindrical region D₂V defined definition denote dynamic programming equation dynamic programming principle Dynkin formula Example exists exit finite first-order formulation given Hamilton-Jacobi equation Hence HJB equation holds implies inequality initial condition initial data lateral boundary Lebesgue left endpoint Lemma linear Lipschitz continuous Markov chain Markov control policy Markov processes maximum principle minimizing Moreover nonlinear obtain optimal control optimal control problems partial derivatives partial differential equation proof of Theorem prove R₁ reference probability system result satisfies second-order Section stochastic control stochastic differential equation Suppose t₁ Theorem 5.1 tion unique value function variations problem Verification Theorem viscosity solution viscosity subsolution viscosity supersolution yields