The right time to sell a stock whose price is driven by Markovian noise
Abstract
We consider the problem of finding the optimal time to sell a stock, subject to a fixed sales cost and an exponential discounting rate . We assume that the price of the stock fluctuates according to the equation dYt=Yt(μ dt+σ(t) dt), where ((t)) is an alternating Markov renewal process with values in 1, with an exponential renewal time. We determine the critical value of under which the value function is finite. We examine the validity of the ``principle of smooth fit'' and use this to give a complete and essentially explicit solution to the problem, which exhibits a surprisingly rich structure. The corresponding result when the stock price evolves according to the Black and Scholes model is obtained as a limit case.
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