Gambling for Resurrection and the Heat Equation on a Triangle

Gambling for Resurrection and the Heat Equation on a Triangle

We consider the problem of controlling the diffusion coefficient of a diffusion with constant negative drift rate such that the probability of hitting a given lower barrier up to some finite time horizon is minimized. We assume that the diffusion rate can be chosen in a progressively measurable way...

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Veröffentlicht in:Applied mathematics & optimization 2021-12, Vol.84 (3), p.3111-3136
Hauptverfasser: Ankirchner, Stefan, Blanchet-Scalliet, Christophette, Kazi-Tani, Nabil, Zhou, Chao
Format: Artikel
Sprache:eng
Schlagworte:
Applied mathematics
Boundary conditions
Calculus of Variations and Optimal Control
Optimization
Control
Diffusion coefficient
Diffusion rate
Drift rate
Gambling
Mathematical and Computational Physics
Mathematical Methods in Physics
Mathematics
Mathematics and Statistics
Numerical and Computational Physics
Optimization
Optimization and Control
Probability
Quantitative Finance
Reinsurance
Simulation
Systems Theory
Theoretical
Thermodynamics
Volatility
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Zusammenfassung:We consider the problem of controlling the diffusion coefficient of a diffusion with constant negative drift rate such that the probability of hitting a given lower barrier up to some finite time horizon is minimized. We assume that the diffusion rate can be chosen in a progressively measurable way with values in the interval [0, 1]. We prove that the value function is regular, concave in the space variable, and that it solves the associated HJB equation. To do so, we show that the heat equation on a right triangle, with a boundary condition that is discontinuous in the corner, possesses a smooth solution.
ISSN:0095-4616
1432-0606
DOI:10.1007/s00245-020-09741-9