Proof of non-convergence of the short-maturity expansion for the SABR model

Abstract

We study the convergence properties of the short maturity expansion of option prices in the uncorrelated log-normal (β=1) SABR model. In this model the option time-value can be represented as an integral of the form V(T) = ∫0∞ e-u22T g(u) du with g(u) a "payoff function" which is given by an integral over the McKean kernel G(s,t). We study the analyticity properties of the function g(u) in the complex u-plane and show that it is holomorphic in the strip |(u) |< π. Using this result we show that the T-series expansion of V(T) and implied volatility are asymptotic (non-convergent for any T>0). In a certain limit which can be defined either as the large volatility limit σ0 ∞ at fixed ω=1, or the small vol-of-vol limit ω 0 limit at fixed ωσ0, the short maturity T-expansion for the implied volatility has a finite convergence radius Tc = 1.32ωσ0.