A Lower Bound for the First Passage Time Density of the Suprathreshold Ornstein-Uhlenbeck Process

Abstract

We prove that the first passage time density (t) for an Ornstein-Uhlenbeck process X(t) obeying dX=-β X dt + σ dW to reach a fixed threshold θ from a suprathreshold initial condition x0>θ>0 has a lower bound of the form (t)>k [-p e6β t] for positive constants k and p for times t exceeding some positive value u. We obtain explicit expressions for k, p and u in terms of β, σ, x0 and θ, and discuss application of the results to the synchronization of periodically forced stochastic leaky integrate-and-fire model neurons.