Callan periodic table of investment returns

First published in 1999, the  is patterned after Mendeleev's periodic table of the elements and shows returns for 10 asset classes, ranked from best to worst. Each asset class is color-coded for easy tracking.

Overview
The chart is intended to show the importance of diversification across asset classes (stocks versus bonds), investment styles (growth versus value), capitalizations (large versus small) and equity markets (U.S. versus international).

Refer to the table below. The rankings change every year, thereby demonstrating two key principles of investing:


 * Diversification: by owning the entire market (all of the asset classes), susceptibility to changes in market returns is minimized.
 * Past performance does not predict future performance.

How to read the table
For example: Real estate (a measure of the stock performance of companies engaged in specific real estate activities in the North American, European, and Asian real estate markets). Starting at the left side, this measure ranked:


 * 2000 - 1st
 * 2001 - 7th
 * 2002 - 2003 - 3rd (2 consecutive years)
 * 2004 - 1st
 * 2005 - 2nd
 * 2006 - 1st
 * 2007 - 9th
 * 2008 - 8th
 * 2009 - 3rd
 * 2010 - 2nd
 * 2011 - 7th
 * 2012 - 1st
 * 2013 - 5th
 * 2014 - 1st
 * 2015 - 4th
 * 2016 - 5th
 * 2017 - 2018 - 6th (2 consecutive years)
 * 2019 - 4th

Putting the table into perspective
Periodic tables provide a great visual about diversification benefits, but tend to be more qualitative than quantitative. The simple ranking from best to worse notably does not allow one to easily appreciate the scaling of annual returns.

The following dispersion graph (distribution spread of returns over time) is therefore useful to put such a periodic table in perspective. Notice how the difference between the highest return (blue) and lowest return (red) changes over time.

In addition, it is challenging to get a sense of returns averaged over a period of time with a periodic table. The following table of statistics is therefore useful to consider.

One statistic that is sometimes informative is the "Coefficient of Variation" (CV), which is simply the standard deviation divided by the mean. This is sometimes called the "coefficient of relative variation." It is the inverse of a signal-to-noise ratio, thus it's a noise to signal ratio. The lower the ratio of standard deviation to mean return, the better your risk-return tradeoff.

Over the past 20 years (1998 - 2017), the lowest coefficient of variation is "Aggregate Bonds" (0.69); the highest is World Ex USA (2.77).

Create your own periodic table
A spreadsheet for creating your own periodic table is available in this.

The latest version and download instructions are in this post, which is a direct download from Google Drive.

Detailed instructions and revision history are in the "README" tab.

Forum discussions

 * . A comprehensive list of asset class returns compiled by forum member Tamales.
 * . A comprehensive list of asset class returns compiled by forum member Tamales.
 * . A comprehensive list of asset class returns compiled by forum member Tamales.