Levy preservation and associated properties for $f$-divergence minimal equivalent martingale measures

Published 14 Jun 2011 in math.PR | (1106.2743v1)

Abstract: We study such important properties of $f$-divergence minimal martingale measure as Levy preservation property, scaling property, invariance in time property for exponential Levy models. We give some useful decomposition for $f$-divergence minimal martingale measures and we answer on the question which form should have $f$ to ensure mentioned properties. We show that $f$ is not necessarily common $f$-divergence. For common $f$-divergences, i.e. functions verifying $f"(x) = ax^ {\gamma},\, a>0,\, \gamma \in \mathbb R$, we give necessary and sufficient conditions for existence of $f$-minimal martingale measure.