Selling a stock at the ultimate maximum

TL;DR

This paper analyzes optimal stopping strategies for selling stocks modeled as geometric Brownian motion, providing explicit solutions depending on the drift parameter, and supports the financial intuition of selling poor stocks early and holding good ones.

Contribution

It derives explicit optimal stopping rules for maximizing or minimizing expected ratios involving stock maxima, using advanced PDE and local time techniques.

Findings

Optimal strategies depend on the drift parameter μ relative to volatility σ.

Immediate sale is optimal when μ is low or high, with threshold-based strategies for intermediate μ.

Results reinforce the financial advice to sell bad stocks early and hold good stocks.

Abstract

Assuming that the stock price $Z=(Z_t)_{0\leq t\leq T}$ follows a geometric Brownian motion with drift $\mu\in\mathbb{R}$ and volatility $\sigma>0$, and letting $M_t=\max_{0\leq s\leq t}Z_s$ for $t\in[0,T]$, we consider the optimal prediction problems \[V_1=\inf_{0\leq\tau\leq T}\mathsf{E}\biggl(\frac{M_T}{Z_{\tau}}\biggr)\quadand\quad V_2=\sup_{0\leq\tau\leq T}\mathsf{E}\biggl(\frac{Z_{\tau}}{M_T}\biggr),\] where the infimum and supremum are taken over all stopping times $\tau$ of $Z$. We show that the following strategy is optimal in the first problem: if $\mu\leq0$ stop immediately; if $\mu\in (0,\sigma^2)$ stop as soon as $M_t/Z_t$ hits a specified function of time; and if $\mu\geq\sigma^2$ wait until the final time $T$. By contrast we show that the following strategy is optimal in the second problem: if $\mu\leq\sigma^2/2$ stop immediately, and if $\mu>\sigma^2/2$ wait until the final time $T$. Both solutions support and reinforce the widely held financial view that ``one should sell bad stocks and keep good ones.'' The method of proof makes use of parabolic free-boundary problems and local time--space calculus techniques. The resulting inequalities are unusual and interesting in their own right as they involve the future and as such have a predictive element.