On Future Drawdowns of L\'evy processes

Abstract

For a given L\'evy process X=(Xt)t∈R+ and for fixed s∈ R+\∞\ and t∈R+ we analyse the future drawdown extremes that are defined as follows: eqnarray* D*t,s = 0≤ u≤ t ∈fu≤ w < t+s(Xw-Xu), D*t,s = ∈f0≤ u≤ t ∈fu≤ w < t+s(Xw-Xu). eqnarray* The path-functionals D*t,s and D*t,s are of interest in various areas of application, including financial mathematics and queueing theory. In the case that X has a strictly positive mean, we find the exact asymptotic decay as x∞ of the tail probabilities P( D*t<x) and P( D*t<x) of D*t=s∞ D*t,s and D*t = s∞ D*t,s both when the jumps satisfy the Cram\'er assumption and in a heavy-tailed case. Furthermore, in the case that the jumps of the L\'evy process X are of single sign and X is not subordinator, we identify the one-dimensional distributions in terms of the scale function of X. By way of example, we derive explicit results for the Black-Scholes-Samuelson model.