![]() Visit Performance Disclosure for information about the performance numbers displayed above. ![]() Certain Zacks Rank stocks for which no month-end price was available, pricing information was not collected, or for certain other reasons have been excluded from these return calculations. Zacks Ranks stocks can, and often do, change throughout the month. Only Zacks Rank stocks included in Zacks hypothetical portfolios at the beginning of each month are included in the return calculations. The monthly returns are then compounded to arrive at the annual return. A simple, equally-weighted average return of all Zacks Rank stocks is calculated to determine the monthly return. Zacks Rank stock-rating system returns are computed monthly based on the beginning of the month and end of the month Zacks Rank stock prices plus any dividends received during that particular month. These returns cover a period from Januthrough July 3, 2023. ![]() Since 1988 it has more than doubled the S&P 500 with an average gain of +24.26% per year. This dedication to giving investors a trading advantage led to the creation of our proven Zacks Rank stock-rating system. and Morningstar, Inc.Ĭopyright 2023 Zacks Investment Research | 10 S Riverside Plaza Suite #1600 | Chicago, IL 60606Īt the center of everything we do is a strong commitment to independent research and sharing its profitable discoveries with investors. Forbes Media, LLC Investor's Business Daily, Inc. Each of the company logos represented herein are trademarks of Microsoft Corporation Dow Jones & Company Nasdaq, Inc. Roman, "Maximum Drawdown Distributions with Volatility Persistence", working paper, 2005.This page has not been authorized, sponsored, or otherwise approved or endorsed by the companies represented herein. Steiner, Andreas, "Ambiguity in Calculating and Interpreting Maximum Drawdown," working paper (December), 2010.Atiya, "Maximum Drawdown", Risk Magazine (October), 2004. Kim, Daehwan, "Relevance of Maximum Drawdown in the Investment Fund Selection Problem when Utility is Nonadditive", working paper (July), 2010.T., "Maximum Drawdowns of Hedge Funds with Serial Correlation", Journal of Alternative Investments (vol 8, no 4) (Spring), pp. 26–38, 2006. Hoesli, "The Maximum Drawdown as a Risk Measure: The Role of Real Estate in the Optimal Portfolio Revisited", working paper (June 24), 2003. Zhou, "Optimal Investment Strategies for Controlling Drawdowns", Mathematical Finance 3, pp. 241–276, 1993. Mahmoud, "On a Convex Measure of Drawdown Risk", working paper, Center for Risk Management Research, UC Berkeley, 2014. Eckholdt, H., "Risk Management: Using SAS to Model Portfolio Drawdown, Recovery and Value at Risk" (February), 2004.Liu, "Understanding Drawdowns", working paper, Carr Futures (September 4), 2003 ![]() International Journal of Theoretical and Applied Finance. "Drawdown Measure in Portfolio Optimization" (PDF). ^ Chekhlov, Alexei Uryasev, Stanislav Zabarankin, Michael (2005)."Portfolio Optimization with Drawdown Constraints" (PDF). ^ Chekhlov, Alexei Uryasev, Stanislav Zabarankin, Michael (2003)."On the Maximum Drawdown of a Brownian Motion" (PDF). MDD ( T ) = max τ ∈ ( 0, T ) D ( τ ) = max τ ∈ ( 0, T ) is a vector of portfolio returns, that is defined by: ![]()
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