VIX options in the SABR model

Abstract

We study the pricing of VIX options in the SABR model dSt = σt Stβ dBt, dσt = ω σt dZt where Bt,Zt are standard Brownian motions correlated with correlation <0 and 0 ≤ β < 1. VIX is expressed as a risk-neutral conditional expectation of an integral over the volatility process vt = Stβ-1 σt. We show that vt is the unique solution to a one-dimensional diffusion process. Using the Feller test, we show that vt explodes in finite time with non-zero probability. As a consequence, VIX futures and VIX call prices are infinite, and VIX put prices are zero for any maturity. As a remedy, we propose a capped volatility process by capping the drift and diffusion terms in the vt process such that it becomes non-explosive and well-behaved, and study the short-maturity asymptotics for the pricing of VIX options.