When to Sell an Indivisible Object : Optimal Timing with Markovian Buyers

We study the problem of when to sell an indivisible object. There is a monopolistic seller who owns an indivisible object and plans to sell it over a given span of time to the set of potential buyers whose valuations for the object evolve over time. We formulate the seller's problem as a dynamic mechanism design problem. We provide a procedure for finding the optimal solution and show how to check incentive compatibility. We also examine sufficient conditions for the optimality of myopic stopping rule and ex-post individual rationality. In addition, we present some comparative static results regarding the seller's revenue and the selling time