Grandits, P. (2025). A singularly perturbed ruin problem for a two-dimensional Brownian motion in the positive quadrant. Journal of Applied Probability, 62(1), 269–283. https://doi.org/10.1017/jpr.2024.68
E105-01 - Forschungsbereich Risikomanagement in Finanz- und Versicherungsmathematik
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Journal:
Journal of Applied Probability
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ISSN:
0021-9002
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Date (published):
2025
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Number of Pages:
15
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Publisher:
CAMBRIDGE UNIV PRESS
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Peer reviewed:
Yes
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Keywords:
free boundary problem; optimal control problem; Ruin probability; singular perturbation
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Abstract:
We consider the following problem: the drift of the wealth process of two companies, modelled by a two-dimensional Brownian motion, is controllable such that the total drift adds up to a constant. The aim is to maximize the probability that both companies survive. We assume that the volatility of one company is small with respect to the other, and use methods from singular perturbation theory to construct a formal approximation of the value function. Moreover, we validate this formal result by explicitly constructing a strategy that provides a target functional, approximating the value function uniformly on the whole state space.
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Research Areas:
Mathematical Methods in Economics: 30% Modeling and Simulation: 10% Fundamental Mathematics Research: 60%
