@article {Durand91, author = {Robert B. Durand and Hedieh Jafarpour and Claudia Kl{\"u}ppelberg and Ross Maller}, title = {Maximize the Sharpe Ratio and Minimize a VaR}, volume = {13}, number = {1}, pages = {91--102}, year = {2010}, doi = {10.3905/JWM.2010.13.1.091}, publisher = {Institutional Investor Journals Umbrella}, abstract = {In addition to its role as the optimal ex ante combination of risky assets for a risk-averse investor, possessing the highest potential return-for-risk trade-off, the tangency or maximum Sharpe ratio portfolio in the Markowitz [1952, 1991] procedure plays an important role in asset management because it minimizes the probability that a future portfolio return falls below the risk-free, or reference, rate; this is a kind of Value at Risk (VaR) property of the portfolio. In this article the authors demonstrate the way this VaR, and related quantities, vary along the efficient frontier, emphasizing the special role played by the tangency portfolio. The results are illustrated with an analysis of the market crash of October 1987, as an episode of extreme negative market movements, in which the tangency portfolio performs best (loses least!) among a variety of portfolios.TOPICS: Portfolio theory, VAR and use of alternative risk measures of trading risk, performance measurement, financial crises and financial market history}, issn = {1534-7524}, URL = {https://jwm.pm-research.com/content/13/1/91}, eprint = {https://jwm.pm-research.com/content/13/1/91.full.pdf}, journal = {The Journal of Wealth Management} }