Janka Möller
Signature Methods in Stochastic Portfolio Theory
Abstract
In the context of stochastic portfolio theory we introduce a novel class of portfolios which we call linear path-functional portfolios. These are portfolios which are determined by certain transformations of linear functions of a collection of feature maps that are non-anticipative path functionals of an underlying semimartingale. As main example for such feature maps we consider the signature of the (ranked) market weights. We prove that these portfolios are universal in the sense that every continuous, possibly path-dependent, portfolio function of the market weights can be uniformly approximated by signature portfolios. We also show that signature portfolios can approximate the growth-optimal portfolio in several classes of non-Markovian market models arbitrarily well and illustrate numerically that the trained signature portfolios are remarkably close to the theoretical growth-optimal portfolios. Besides these universality features, the main numerical advantage lies in the fact that several optimization tasks like maximizing (expected) logarithmic wealth or mean-variance optimization within the class of linear path-functional portfolios reduce to a convex quadratic optimization problem, thus making it computationally highly tractable. We apply our method also to real market data based on several indices. Our results point towards out-performance on the considered out-of-sample data, also in the presence of transaction costs.
Our speaker
Janka Möller is currently a PhD candidate in Mathematics at the University of Vienna under the supervision of Prof.~Christa Cuchiero. Her main research topics are the theory and applications of signature methods in portfolio theory and for financial modeling, as well as the study of existence of solutions to McKean-Vlasov SDEs. She holds a BSc and MSc degree from ETH Zurich and has gained working experience in the industry as quantitative researcher at the Zurich Insurance Group.
To become a member of the Rough Path Interest Group, register here for free.
