Solving the dual Russian option problem by using change-of-measure arguments

We apply the change-of-measure arguments of Shepp and Shiryaev [38]to study the dual Russian option pricing problem proposed by Shepp and Shiryaev [39] as an optimal stopping problem for a one-dimensional diffusion process with reflection. We recall the solution to the associated free-boundary problem and give a solution to the resulting onedimensional optimal stopping problem by using the martingale approach of Beibel and Lerche [6] and [7].