In a market with an asset price described by fractional Brownian motion, which can be traded with temporary nonlinear price impact, we find asymptotically optimal strategies for the maximization of expected terminal wealth. Exploiting the autocorrelation in increments while limiting trading costs, these strategies generate an average terminal wealth that grows with a power of the horizon, the exponent depending on both the Hurst and the price-impact parameters. The resulting Sharpe ratios are bounded, insensitive to the horizon, and asymmetric with respect to the Hurst expo- nent. These results extend to Gaussian processes with long memory and to a class of self-similar processes. © 2019 Society for Industrial and Applied Mathematics.
Guasoni P, Nika Z, Rasonyi M (2019). Trading Fractional Brownian Motion. SIAM JOURNAL ON FINANCIAL MATHEMATICS, 10(3), 769-789 [10.1137/17M113592X].
Trading Fractional Brownian Motion
Guasoni P;
2019
Abstract
In a market with an asset price described by fractional Brownian motion, which can be traded with temporary nonlinear price impact, we find asymptotically optimal strategies for the maximization of expected terminal wealth. Exploiting the autocorrelation in increments while limiting trading costs, these strategies generate an average terminal wealth that grows with a power of the horizon, the exponent depending on both the Hurst and the price-impact parameters. The resulting Sharpe ratios are bounded, insensitive to the horizon, and asymmetric with respect to the Hurst expo- nent. These results extend to Gaussian processes with long memory and to a class of self-similar processes. © 2019 Society for Industrial and Applied Mathematics.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
