Variational Inequalities and Smooth-Fit Principle for Singular Stochastic Control Problems in Hilbert Spaces
Federico S, Ferrari G, Riedel F, Röckner M (2024) Center for Mathematical Economics Working Papers; 692.
Bielefeld: Center for Mathematical Economics.
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| Veröffentlicht | Englisch
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Abstract / Bemerkung
We consider a class of infinite-dimensional singular stochastic control problems. These can be thought of as spatial monotone follower problems and find applications in spatial models of production and climate transition. Let $(D,\mathcal{M},\mu)$ be a finite measure space and consider the Hilbert space $H:=L^2(D,\mathcal{M},\mu; \mathbb{R})$. Let then $X$ be an $H$-valued stochastic process on a suitable complete probability space, whose evolution is determined through an SPDE driven by a self-adjoint linear operator $\mathcal{A}$ and affected by a cylindrical Brownian motion. The evolution of $X$ is controlled linearly via an $H$-valued control consisting of the direction and the intensity of action, a real-valued nondecreasing right-continuous stochastic process, adapted to the underlying filtration. The goal is to minimize a discounted convex cost-functional over an infinite time-horizon. By combining properties of semiconcave functions and techniques from viscosity theory, we first show that the value function of the problem $V$ is a $C^{1,Lip}(H)$-viscosity solution to the corresponding dynamic programming equation, which here takes the form of a variational inequality with gradient constraint. Then, by allowing the decision maker to choose only the intensity of the control and requiring that the given control direction $\hat{n}$ is an eigenvector of the linear operator $\mathcal{A}$, we establish that the directional derivative $V_{\hat{n}}$ is of class $C^1(H)$, hence a second-order smooth-fit principle in the controlled direction holds for $V$. This result is obtained by exploiting a connection to optimal stopping and combining results and techniques from convex analysis and viscosity theory.
MSC2020 subject classification: 93E20, 37L55, 35D40, 49J40, 60G40, 91B72
MSC2020 subject classification: 93E20, 37L55, 35D40, 49J40, 60G40, 91B72
Stichworte
infinite-dimensional singular stochastic control;
viscosity solution;
variational inequality;
infinite-dimensional optimal stopping;
smooth-fit principle
Erscheinungsjahr
2024
Serientitel
Center for Mathematical Economics Working Papers
Band
692
Seite(n)
37
Urheberrecht / Lizenzen
ISSN
0931-6558
Page URI
https://pub.uni-bielefeld.de/record/2990509
Zitieren
Federico S, Ferrari G, Riedel F, Röckner M. Variational Inequalities and Smooth-Fit Principle for Singular Stochastic Control Problems in Hilbert Spaces. Center for Mathematical Economics Working Papers. Vol 692. Bielefeld: Center for Mathematical Economics; 2024.
Federico, S., Ferrari, G., Riedel, F., & Röckner, M. (2024). Variational Inequalities and Smooth-Fit Principle for Singular Stochastic Control Problems in Hilbert Spaces (Center for Mathematical Economics Working Papers, 692). Bielefeld: Center for Mathematical Economics.
Federico, Salvatore, Ferrari, Giorgio, Riedel, Frank, and Röckner, Michael. 2024. Variational Inequalities and Smooth-Fit Principle for Singular Stochastic Control Problems in Hilbert Spaces. Vol. 692. Center for Mathematical Economics Working Papers. Bielefeld: Center for Mathematical Economics.
Federico, S., Ferrari, G., Riedel, F., and Röckner, M. (2024). Variational Inequalities and Smooth-Fit Principle for Singular Stochastic Control Problems in Hilbert Spaces. Center for Mathematical Economics Working Papers, 692, Bielefeld: Center for Mathematical Economics.
Federico, S., et al., 2024. Variational Inequalities and Smooth-Fit Principle for Singular Stochastic Control Problems in Hilbert Spaces, Center for Mathematical Economics Working Papers, no.692, Bielefeld: Center for Mathematical Economics.
S. Federico, et al., Variational Inequalities and Smooth-Fit Principle for Singular Stochastic Control Problems in Hilbert Spaces, Center for Mathematical Economics Working Papers, vol. 692, Bielefeld: Center for Mathematical Economics, 2024.
Federico, S., Ferrari, G., Riedel, F., Röckner, M.: Variational Inequalities and Smooth-Fit Principle for Singular Stochastic Control Problems in Hilbert Spaces. Center for Mathematical Economics Working Papers, 692. Center for Mathematical Economics, Bielefeld (2024).
Federico, Salvatore, Ferrari, Giorgio, Riedel, Frank, and Röckner, Michael. Variational Inequalities and Smooth-Fit Principle for Singular Stochastic Control Problems in Hilbert Spaces. Bielefeld: Center for Mathematical Economics, 2024. Center for Mathematical Economics Working Papers. 692.
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