
The skew-stickiness-ratio (SSR), examined in detail by Bergomi in his book, is critically important to options traders, especially market makers. We present a model-free expression for the SSR in terms of the characteristic function. In the diffusion setting, it is well-known that the short-term limit of the SSR is 2; a corollary of our results is that this limit is $H+3/2$ where $H$ is the Hurst exponent of the volatility process. The general formula for the SSR simplifies and becomes particularly tractable in the affine forward variance case. We explain the qualitative behavior of the SSR with respect to the shape of the forward variance curve, and thus also path-dependence of the SSR.
22 pages, 4 figures
FOS: Economics and business, Quantitative Finance - Computational Finance, Quantitative Finance - Mathematical Finance, Computational Finance (q-fin.CP), Mathematical Finance (q-fin.MF)
FOS: Economics and business, Quantitative Finance - Computational Finance, Quantitative Finance - Mathematical Finance, Computational Finance (q-fin.CP), Mathematical Finance (q-fin.MF)
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