L\'evy processes conditioned on having a large height process

Abstract

In the present work, we consider spectrally positive L\'evy processes (Xt,t≥0) not drifting to +∞ and we are interested in conditioning these processes to reach arbitrarily large heights (in the sense of the height process associated with X) before hitting 0. This way we obtain a new conditioning of L\'evy processes to stay positive. The (honest) law of this conditioned process is defined as a Doob h-transform via a martingale. For L\'evy processes with infinite variation paths, this martingale is (∫(dz)eα z+It)\2t≤ T0 for some α and where (It,t≥0) is the past infimum process of X, where (,t≥0) is the so-called exploration process defined in Duquesne, 2002, and where T0 is the hitting time of 0 for X. Under , we also obtain a path decomposition of X at its minimum, which enables us to prove the convergence of as x0. When the process X is a compensated compound Poisson process, the previous martingale is defined through the jumps of the future infimum process of X. The computations are easier in this case because X can be viewed as the contour process of a (sub)critical splitting tree. We also can give an alternative characterization of our conditioned process in the vein of spine decompositions.