Efficient evaluation of expectations of functions of a stable L\'evy process and its extremum

Abstract

Integral representations for expectations of functions of a stable L\'evy process X and its supremum X are derived. As examples, cumulative probability distribution functions (cpdf) of XT, T, the joint cpdf of XT and T, and the expectation of ( XT-T)+, >1, are considered, and efficient numerical procedures for cpdfs are developed. The most efficient numerical methods use the conformal acceleration technique and simplified trapezoid rule.