Log-modulated rough stochastic volatility models

Abstract

We propose a new class of rough stochastic volatility models obtained by modulating the power-law kernel defining the fractional Brownian motion (fBm) by a logarithmic term, such that the kernel retains square integrability even in the limit case of vanishing Hurst index H. The so-obtained log-modulated fractional Brownian motion (log-fBm) is a continuous Gaussian process even for H = 0. As a consequence, the resulting super-rough stochastic volatility models can be analysed over the whole range 0 H < 1/2 without the need of further normalization. We obtain skew asymptotics of the form (1/T)-p TH-1/2 as T 0, H 0, so no flattening of the skew occurs as H 0.