We study a continuous time optimal portfolio allocation problem with volatility and co- jump risk, allowing prices, variances and covariances to jump simultaneously. Differently from the traditional approach, we deviate from affine models by specifying a flexible Wishart jump-diffusion for the co-precision (the inverse of the covariance matrix). The optimal portfolio weights that solve the dynamic programming problem are genuinely dy- namic and proportional to the instantaneous co-precision, reconciling optimal dynamic al- location with the static Markowitz-type economic intuition. An application to the optimal allocation problem across hedge fund investment styles illustrates the importance of hav- ing jumps in volatility associated with jumps in price.
Optimal portfolio allocation with volatility and co-jump risk that Markowitz would like
Oliva, I.
;Renò, R.
2018-01-01
Abstract
We study a continuous time optimal portfolio allocation problem with volatility and co- jump risk, allowing prices, variances and covariances to jump simultaneously. Differently from the traditional approach, we deviate from affine models by specifying a flexible Wishart jump-diffusion for the co-precision (the inverse of the covariance matrix). The optimal portfolio weights that solve the dynamic programming problem are genuinely dy- namic and proportional to the instantaneous co-precision, reconciling optimal dynamic al- location with the static Markowitz-type economic intuition. An application to the optimal allocation problem across hedge fund investment styles illustrates the importance of hav- ing jumps in volatility associated with jumps in price.
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