Abstract
We study an optimal dividend problem under a bankruptcy constraint. Firms face a trade‐off between potential bankruptcy and extraction of profits. In contrast to previous works, general cash flow drifts, including Ornstein–Uhlenbeck and CIR processes, are considered. We provide rigorous proofs of continuity of the value function, whence dynamic programming, as well as comparison between discontinuous sub‐ and supersolutions of the Hamilton–Jacobi–Bellman equation, and we provide an efficient and convergent numerical scheme for finding the solution. The value function is given by a nonlinear partial differential equation (PDE) with a gradient constraint from below in one direction. We find that the optimal strategy is both a barrier and a band strategy and that it includes voluntary liquidation in parts of the state space. Finally, we present and numerically study extensions of the model, including equity issuance and gambling for resurrection.
Replaces
H. Mete Soner, Max Reppen, and Jean-Charles Rochet, “Optimal dividend policies with random profitability”, TSE Working Paper, n. 18-886, January 2018.
H. Mete Soner, Max Reppen, and Jean-Charles Rochet, “Optimal dividend policies with random profitability”, IDEI Working Paper, n. 882, January 2018.
Reference
Jean-Charles Rochet, Max Reppen, and Mete Soner, “Optimal dividend policies with random profitability”, Mathematical Finance, vol. 30, n. 1, January 2020, pp. 228–259.
See also
Published in
Mathematical Finance, vol. 30, n. 1, January 2020, pp. 228–259