Optimal Ratcheting of Dividends in a Brownian Risk Model
Loading...
Date
relationships.isAdvisorOf
Journal Title
Journal ISSN
Volume Title
Publisher
Abstract
We study the problem of optimal dividend payout from a surplus process governed by Brownian motion with drift under the additional constraint of ratcheting,
i.e. the dividend rate can never decrease. We solve the resulting two-dimensional
optimal control problem, identifying the value function to be the unique viscosity
solution of the corresponding Hamilton-Jacobi-Bellman equation. For finitely many
admissible dividend rates we prove that threshold strategies are optimal, and for
any finite continuum of admissible dividend rates we establish the ε-optimality of
curve strategies. This work is a counterpart of [2], where the ratcheting problem was
studied for a compound Poisson surplus process with drift. In the present Brownian
setup, calculus of variation techniques allow to obtain a much more explicit analysis
and description of the optimal dividend strategies. We also give some numerical
illustrations of the optimality results.
Description
Keywords
optimal dividends, viscosity solution, HJB equation, ratcheting
Citation
Citation
Muler N., (2022) Optimal Ratcheting of Dividends in a Brownian Risk Model. SIAM Journal on Financial Mathematics, 13, 657-701. https://doi.org/10.1137/20M1387171
