Efficient Rare-event Simulation for Perpetuities

Abstract

We consider perpetuities of the form D = B1 exp(Y1) + B2 exp(Y1+Y2) + ... where the Yj's and Bj's might be i.i.d. or jointly driven by a suitable Markov chain. We assume that the Yj's satisfy the so-called Cramer condition with associated root thetaast in (0,infty) and that the tails of the Bj's are appropriately behaved so that D is regularly varying with index thetaast. We illustrate by means of an example that the natural state-independent importance sampling estimator obtained by exponentially tilting the Yj's according to thetaast fails to provide an efficient estimator (in the sense of appropriately controlling the relative mean squared error as the tail probability of interest gets smaller). Then, we construct estimators based on state-dependent importance sampling that are rigorously shown to be efficient.