Semi-Static and Sparse Variance-Optimal Hedging
Mathematical Finance
2017-09-19 v1 Probability
Abstract
We consider hedging of a contingent claim by a 'semi-static' strategy composed of a dynamic position in one asset and static (buy-and-hold) positions in other assets. We give general representations of the optimal strategy and the hedging error under the criterion of variance-optimality and provide tractable formulas using Fourier-integration in case of the Heston model. We also consider the problem of optimally selecting a sparse semi-static hedging strategy, i.e. a strategy which only uses a small subset of available hedging assets. The developed methods are illustrated in an extended numerical example where we compute a sparse semi-static hedge for a variance swap using European options as static hedging assets.
Keywords
Cite
@article{arxiv.1709.05519,
title = {Semi-Static and Sparse Variance-Optimal Hedging},
author = {Paolo Di Tella and Martin Haubold and Martin Keller-Ressel},
journal= {arXiv preprint arXiv:1709.05519},
year = {2017}
}
Comments
4 figures