The Omega ratio is a risk-return performance measure of an investment asset, portfolio, or strategy. It was devised by Con Keating and William F. Shadwick in 2002 and is defined as the probability weighted ratio of gains versus losses for some threshold return target.[1] The ratio is an alternative for the widely used Sharpe ratio and is based on information the Sharpe ratio discards.

Omega is calculated by creating a partition in the cumulative return distribution in order to create an area of losses and an area for gains relative to this threshold.

The ratio is calculated as:

where is the cumulative probability distribution function of the returns and is the target return threshold defining what is considered a gain versus a loss. A larger ratio indicates that the asset provides more gains relative to losses for some threshold and so would be preferred by an investor. When is set to zero the gain-loss-ratio by Bernardo and Ledoit arises as a special case.[2]

Comparisons can be made with the commonly used Sharpe ratio which considers the ratio of return versus volatility.[3] The Sharpe ratio considers only the first two moments of the return distribution whereas the Omega ratio, by construction, considers all moments.

Optimization of the Omega ratio

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The standard form of the Omega ratio is a non-convex function, but it is possible to optimize a transformed version using linear programming.[4] To begin with, Kapsos et al. show that the Omega ratio of a portfolio is: If we are interested in maximizing the Omega ratio, then the relevant optimization problem to solve is: The objective function is still non-convex, so we have to make several more modifications. First, note that the discrete analogue of the objective function is: For   sampled asset class returns, let   and  . Then the discrete objective function becomes: With these substitutions, we have been able to transform the non-convex optimization problem into an instance of linear-fractional programming. Assuming that the feasible region is non-empty and bounded, it is possible to transform a linear-fractional program into a linear program. Conversion from a linear-fractional program to a linear program gives us the final form of the Omega ratio optimization problem: where   are the respective lower and upper bounds for the portfolio weights. To recover the portfolio weights, normalize the values of   so that their sum is equal to 1.

See also

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References

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  1. ^ Keating & Shadwick. "A Universal Performance Measure" (PDF). The Finance Development Centre Limited. UK. S2CID 16222368. Archived from the original (PDF) on 2019-08-04.
  2. ^ Bernardo, Antonio E.; Ledoit, Olivier (2000-02-01). "Gain, Loss, and Asset Pricing". Journal of Political Economy. 108 (1): 144–172. CiteSeerX 10.1.1.39.2638. doi:10.1086/262114. ISSN 0022-3808. S2CID 16854983.
  3. ^ "Assessing CTA Quality with the Omega Performance Measure" (PDF). Winton Capital Management. UK.
  4. ^ Kapsos, Michalis; Zymler, Steve; Christofides, Nicos; Rustem, Berç (Summer 2014). "Optimizing the Omega Ratio using Linear Programming" (PDF). Journal of Computational Finance. 17 (4): 49–57. doi:10.21314/JCF.2014.283.
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