Branger, NicoleNicoleBrangerMuck, MatthiasMatthiasMuck0000-0003-2364-9833Seifried, FrankFrankSeifriedWeisheit, StefanStefanWeisheit2019-09-192017-12-0720170165-1889https://fis.uni-bamberg.de/handle/uniba/42907We analyze the optimal portfolio choice in a multi-asset Wishart-model in which return variances and correlations are stochastic and subject to jump risk. The optimal portfolio is characterized by the positions in stock diffusion risk, variance-covariance diffusion risk, and jump risk. We find that including jumps in the second moments changes the optimal positions and particularly variance-covariance hedging demands significantly. Erroneously omitting these jumps gives rise to substantial model risk. Furthermore, variance-covariance jump risk can have a significant impact on potential utility gains when the market is completed by adding derivatives. As a robustness check, we compare our results to those obtained for other parametrizations of Wishart-models from the literature as well as to various single-asset models.engOptimal portfolio choiceJump riskCovariance jumpsWishart processDerivativesarticle10.1016/j.jedc.2017.09.008