Small-time expansions of the distributions, densities, and option prices of stochastic volatility models with L\'evy jumps

Abstract

We consider a stochastic volatility model with L\'evy jumps for a log-return process Z=(Zt)t≥ 0 of the form Z=U+X, where U=(Ut)t≥ 0 is a classical stochastic volatility process and X=(Xt)t≥ 0 is an independent L\'evy process with absolutely continuous L\'evy measure . Small-time expansions, of arbitrary polynomial order, in time-t, are obtained for the tails (Zt≥ z), z>0, and for the call-option prices (ez+Zt-1)+, z≠ 0, assuming smoothness conditions on the density of away from the origin and a small-time large deviation principle on U. Our approach allows for a unified treatment of general payoff functions of the form φ(x) 1x≥z for smooth functions φ and z>0. As a consequence of our tail expansions, the polynomial expansions in t of the transition densities ft are also obtained under mild conditions.