A potential-theoretic approach to optimal stopping in a spectrally Lévy Model

Abstract: We present a systematic solution method for optimal stopping problem of one-dimensional spectrally negative L\'evy processes. Our main tools are based on potential theory, particularly the Riesz decomposition and the maximum principle. This novel approach allows us to handle a broad class of reward functions. That is, we solve the problem in a general setup without relying on specific form of the reward function or on the fluctuation identities. We provide a step-by-step solution procedure, which is applicable to complex solution structures including multiple double-sided continuation regions.