Local time and the pricing of time-dependent barrier options

Abstract

A time-dependent double-barrier option is a derivative security that delivers the terminal value φ(ST) at expiry T if neither of the continuous time-dependent barriers b:[0,T] + have been hit during the time interval [0,T]. Using a probabilistic approach we obtain a decomposition of the barrier option price into the corresponding European option price minus the barrier premium for a wide class of payoff functions φ, barrier functions b and linear diffusions (St)t∈[0,T]. We show that the barrier premium can be expressed as a sum of integrals along the barriers b of the option's deltas :[0,T] at the barriers and that the pair of functions (+,-) solves a system of Volterra integral equations of the first kind. We find a semi-analytic solution for this system in the case of constant double barriers and briefly discus a numerical algorithm for the time-dependent case.