# What is the difference between Sharpe, Jensen, and Treynor ratios?

## Sharpe Ratio

Named after William F. Sharpe, who developed it in 1966 (revised in 1994), the Sharpe Ratio is a risk-adjusted measure of return that uses standard deviation to represent risk. The Sharpe ratio is simply the return per unit of risk (represented by variance). The higher the Sharpe ratio, the better the combined performance of “risk” and return.

Using an annualized Sharpe Ratio is useful for comparison of multiple return streams. The annualized Sharpe ratio is computed by dividing the annualized mean monthly excess return by the annualized monthly standard deviation of excess return. Like any other mathematical model, it relies on the data being correct – Ponzi schemes have high Sharpe ratios.

Original Sharpe ratio equation:

Revised Sharpe ratio equation:

### Information Ratio

William Sharpe recommends the Information Ratio preferentially to the original Sharpe Ratio.

The information ratio is similar to the Sharpe ratio, the main difference being that the Sharpe ratio uses a risk-free return as benchmark whereas the information ratio uses a risky index as benchmark (such as the S&P500). While the information ratio is widely used in practice, it is still often referred to as the Sharpe ratio.

### Weaknesses of Sharpe (and Information) Ratios

For negative returns, the Sharpe ratio is not a particularly useful tool of analysis. This is because a negative Sharpe ratio can be brought closer to zero by either increasing returns (a good thing) or increasing volatility (a bad thing).

For returns that are not normally distributed, the Sharpe ratio is a poor tool of analysis. Abnormalities like kurtosis, fatter tails and higher peaks, or skewness on the distribution can be problematic for the ratio, as standard deviation doesn’t have the same effectiveness when these problems exist. Returns can be of any frequency (i.e. daily, weekly, monthly or annually), as the returns can always be annualized.

## Treynor Ratio

The Treynor ratio, named after Jack L. Treynor, is a measurement of the returns earned in excess of that which could have been earned on an investment that has no diversifiable risk (e.g., Treasury bills or a completely diversified portfolio), per each unit of market risk assumed. It works only with systematic risk of a portfolio whereas the Sharpe ratio observes both systematic and idiosyncratic risks.

### Portfolio risks

Total risk of an asset is a combination of idiosyncratic risk and systemic risk. Idiosyncratic risk is the inherent risk involved in investing in a specific asset that doesn’t affect the entire market (or an entire investment portfolio). It is the opposite of systemic risk, which affects all assets. Systemic risks include things such as changing interest rates or inflation.

### Weaknesses of Treynor Ratio

Because the Treynor ratio uses systematic risk instead of total risk, it will not reveal risks in an investors portfolio if it lacks diversity.

## Jensen Measure

Named after Michael C. Jensen, the Jensen measure calculates the excess return that a portfolio generates over its expected return. This measure of return is also known as alpha.

Similar to the Treynor measure, however, Jensen’s alpha calculates risk premiums in terms of beta (systematic, undiversifiable risk) and, therefore, assumes the portfolio is already adequately diversified. As a result, this ratio is best applied to an investment such as a mutual fund.

The measure is calculated using the Capital Asset Pricing Model (CAPM).

## Special Guest: Sortino Ratio

Developed by Frank A. Sortino in 1994, the Sortino ratio is a modification of the Sharpe ratio but penalizes only those returns falling below a user-specified target.

Because the Sortino ratio focuses only on the negative deviation of a portfolio’s returns from the mean, it is thought to give a better view of a portfolio’s risk-adjusted performance since positive volatility is a benefit.

In the ratio, the downside risk (denominator) is target semi-deviation (the square root of target semi-variance). An intuitive way to view downside risk is the annualized standard deviation of returns below the target.

Sortino ratio equation: