Several of the statistics can be calculated using either an arithmetic or geometric linking method used to derive the fund, benchmark and risk free returns used in the risk statistics. This is described in the following table.
Measure | Arithmetic Linking | Geometric Linking |
|---|---|---|
Value Added | Sum of the Excess Returns (Rpi–Rmi) divided by the Count of Returns. | (Single Period Geometrically Linked Portfolio Return–Single Period Geometrically Linked Market Return). |
Annualized Value Added | (Arithmetic Value Added) * nObsPerYear. | (Annualized Period Geometrically Linked Portfolio Return–Annualized Period Geometrically Linked Market Return). |
Information Ratio | (Arithmetic Value Added) divided by Standard Deviation of Excess Returns (Tracking Risk). | (Geometric Value Added) divided by Standard Deviation of Excess Returns (Tracking Risk). |
Annualized Information Ratio | (Arithmetic Annualized Value Added) divided by (Annualized Tracking Risk). | (Geometric Annualized Value Added) divided by (Annualized Tracking Risk). |
Sharpe Ratio | (Annual Mean Portfolio Return–Annual Mean Risk Free Rate) divided by Annualized Standard Deviation of Portfolio Return. | (Annualized Geometrically Linked Portfolio Return–Annualized Geometrically Linked Target Return) divided by Annualized Standard Deviation of Portfolio Return. |
Treynor Ratio | (Annual Mean Portfolio Return–Annual Mean Risk Free Rate) divided by the Portfolio Beta. | (Annualized Geometrically Linked Portfolio Return–Annualized Geometrically Linked Target Return) divided by the Portfolio Beta. |
Sortino Ratio | (Annual Mean Portfolio Return–Annual Mean Risk Free Return) divided by the Annualized Downside Deviation. | (Annualized Geometrically Linked Portfolio Return–Annualized Geometrically Linked Target Return) divided by the Annualized Downside Deviation. |
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When Daily Data Frequency is chosen you must specify the number of Days in the year to annualize. The default is 252.
There are some subtleties involving different data frequencies and annualized risk statistics. Daily annualized return values can differ slightly from monthly or quarterly annualized returns. For example, consider 2 years of monthly data. For annualized returns, the cumulative returns for two years are raised to (12 / 24) in the case of monthly frequency and (4 / 8) for quarterly frequency. The annualized values are the same.
However, for daily frequency the cumulative returns are raised to (365 / actual number of days found in 2 years). The denominator varies depending on how many returns are available in the PERF_SEC_RETURNS table during those 2 years.
Additionally, enabling the business calendar on option has an effect on this. It is not necessarily twice of 365, for example, 730. Even if returns are available for all the calendar days, the denominator can be 731, if one of the years is a leap year.
Hence, the daily annualized return value can differ from the monthly or quarterly annualized return value.
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The Capital Asset Pricing Model treats risk equally across both down and up markets. However, finance literature suggests that at least a portion of investors place more importance on losses compared to gains. Such loss aversion causes these investors to expect to receive a return premium for holding assets with greater downside risk. This leads to the specification and implementation of measures that can be used to assess investor exposure to one sided downside risk.
Beta, the CAPM measure of risk, is the covariance between excess stock returns and the excess market return divided by the variance of the excess market return.
where:
= covariance of a portfolio's returns to the excess market returns.
= variance of the excess market returns
The problem with beta is it treats gains the same as losses, yet investors like gains while only perceiving the losses as risk. A high-beta can be the result of the portfolio gaining more than the market when the market goes up even though the portfolio does not lose more than the market when the market goes down.
The downside beta, 
, is defined as:
Where:
= return of the portfolio at time t
= return of the market portfolio at time t
= target return for the portfolio
= target return for the market portfolio
The target returns and are adjustable. They can be set as:
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The Drawdown Measures Type option includes 10 drawdown risk measures. A drawdown is any losing period during an investment record. Drawdown is defined as the percent retrenchment from a peak to a valley. A drawdown is from the time a retrenchment begins until a new high is reached.
Maximum Drawdown is the largest percentage drawdown that has occurred in an investment data record during a defined time period (any length).
The Calmar ratio is calculated by taking the Compound Annualized Rate of Return (the Eagle Performance Annual Mean Return statistic) over the last three Years and dividing by the value of the Maximum Drawdown over the last 3 years (default time period). It measures the return in comparison to the greatest amount of risk over the period.
The Shortfall Risk statistic is part of the Drawdown Measures Type option.
There are also seven Max Drawdown measures available for the period that provided the Max Drawdown or the Max Drawdown Duration. These are two different drawdown periods. Max Drawdown identifies the period associated with the largest percentage drop in return and recovery. Max Drawdown Duration identifies the longest drawdown period and recovery regardless of the percentage drop in return.
The five new measures for Max Drawdown period are:
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In addition, there are eight Active Drawdown risk measures that measures portfolio drawdown relative to a market index rather than calculating an absolute drawdown.
These eight new active measures are configured and calculated similarly to the absolute measures. The active configuration includes an underlying field for a Market Portfolio return which is subtracted from the Primary Portfolio return in order to calculate the active return for each observation in the analysis period. The drawdown calculations are then run using the active return in place of the portfolio's return.
The eight Active Drawdown risk measures are:
Active Max Drawdown Date
Active Max Drawdown Duration Period Count
Active Max Drawdown Duration Start and End
Active Max Drawdown Period Count
Active Max Drawdown Recovery Date
Active Max Drawdown Recovery Period Count
Active Max Drawdown Start Date
Active Maximum Drawdown
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M-Squared Ratio is the risk adjusted return measure named for Modigliani and Modigliani.
Unlike the Sharpe Ratio, the M-Squared Ratio attempts to measure the return result as if the portfolio had taken on the same level of risk (standard deviation) as the market. This return is the expected rate of return that would be earned by the portfolio if it was levered up or down so that its standard deviation was equal to that of the benchmark. Eagle Performance implements a full geometric variant of M-squared.