After the Great Recession (2008 to the present), it is in vogue to criticize the risk-free rate of return as a spurious concept. This is not surprising given the twin sovereign debt crises of the European Union and the United States; both countries’ debt instruments previously served as proxies for the risk-free rate of return.
Lost in the current discussion, and perhaps from the concept's very intellectual beginnings, is an examination of first principles. Put differently, what exactly does risk-free mean? Is this measure philosophically sound and reflective of reality? Here is a rethinking of the risk-free rate that should help to frame discussions about rewards versus risks.
First principle: Actions are always risky.
Why are actions always risky? Because the future is always unknowable. While it is appropriate to assign probabilities to uncertain outcomes, probability is in an asymptotic relationship to 100% certainty. Probabilities will never be 100%. One cannot even state with 100% certainty that there will always be change as, in the future, that may be the final change.
Until an event has occurred the success of a probabilistic prediction cannot be measured. Due to the unknowable nature of the future, all actions always contain a component of risk. Confidence can only be stated in calculus-like terms: for example, “the probability of x occurring approaches 100%.”
Lying at the heart of this discussion is an implication: we live in a universe of action. When in history has there been a time when there was no action? Never.
Rewinding effects back from their causes and all the way back through history leads to whatever came before the Big Bang. At this moment, if it can even be called a moment, there was no action and therefore no risk.
Everything that we know subsequent to the Big Bang has involved unfolding action and, hence, risk. Risk is therefore inescapable as action is inescapable. As an investor, even doing nothing is a risk that we call an opportunity cost.
Furthermore, any theory, no matter the discipline, and even including finance, must be in accord with the laws of nature. It does not make sense to talk of a risk-free rate of return and simultaneously associate that with an action — namely, investing.
Second principle: Investing is always risky.
Investing is always risky, because investing is an act in which outcomes can only be stated at probabilities of less than 100%.
Third principle: Expected return is the inducement for taking on risk.
What would induce an investor to surrender his/her low-risk liquid position? Higher expected return in an asset in which that return is high enough to induce the investor to surrender his/her liquidity.
Fourth principle: The risk-free rate of return is always zero and is in accord with a state of zero action.
Inherent in the concept of a risk-free rate of return and in the context of a reward-versus-risk framework is a glaring paradox: Rewards compensate risks, so how can there be a reward for no risk, or no action as is implied by the term “risk-free rate of return”? Put another way, since return is the price paid to induce risk taking, why pay a return for zero risk? Therefore the risk-free rate of return does exist, and it is always zero.
What we are left with then are several conclusions about the risk-free rate of return:
- The very name “risk-free rate of return” as traditionally used is oxymoronic and logically inconsistent with the reward-versus-risk theory it was designed to support.
- That the very concept of a risk-free rate of return as described in the past is out of accord with how the universe has actualized.
- To be in accord with reality, the concept of the risk-free rate of return needs modification.
All of this said, the idea that expected rates of return contain a bedrock component, a starting point if you will, is a good concept. It is a practical concept and provides a natural basis for philosophical discussion about reward versus risk.
For example, the bedrock rate of return implies a continuum on which investments may be placed in order of the magnitude of their reward-versus-risk tradeoff. This is intelligent. However, the bedrock component of expected rates of return should never have been named the “risk-free rate of return” as all investments entail risk. This also implies that all investments have expected rates of return greater than zero. Unfortunately, the nomenclature confusion of the risk-free rate of return has led to confused and oxymoronic investor expectations of certain return in exchange for zero risk.
A proposal: Renaming the concept of the “risk-free rate of return” to the:
Lowest-available-risk expected rate of return
This suggestion has several merits:
- Its meaning, unlike its predecessor, is clear from its name, and it avoids the distorted thinking associated with the risk-free rate of return.
- Its meaning is in accord with nature, in which actions inexorably lead to risks. That is, the lowest-available-risk expected rate of return is nonzero.
- It recognizes that the bedrock expected rate of return is not absolute, but instead is relative to all other expected rates of return. Hence, the use of the word "lowest."
- It recognizes that the bedrock expected rate of return changes over time, relative to the conditions of the moment. Hence, the use of the word "available."
In conclusion, there is no such thing as a risk-free rate of return, just as there is no such thing as our world without action. Yet, the concept of a bedrock expected rate of return is a good one in need of a better description that is more reflective of reality.
The opinions expressed in this piece are those of Jason A. Voss, CFA alone.
Super nova photo from Shutterstock.
31 Comments
Nice and thought provoking article Jason !
Hello Nimita,
Thank you for your feedback and I am pleased that you found it thought provoking...yea!
With smiles,
Jason
Hi Jason, no environment is risk free and certainly stakes in investment related decisions are very high. In Bhagwad Geeta (the teachings of Lord Krishna to Arjuna on various matters agitating Arjuna's mind) Krishna says that an individual should be prepared for consequences of one's own action! At the time of making investment decision, the perceived risk may not be high. However, with the passage of time, the "assumed" circumstances change and what was perceived to be an excellent risk becomes a bad risk and difficult for recovery of even principal amount! The doer has to be prepared to face the consequences of his/her decision. Your suggestion of renaming the concept looks prima facie more rational but is nothing short of "self deception" as the risk remains where it was! I found the article quite interesting.
Hi Sudhir,
Thank you for your comments and also for the tie in to Bhagwad Geeta. The concept of zero was originally a metaphysical concept and meant a time before there was the 1, or the creation. So our views are completely in alignment. In the follow up piece to this one I said that the lowest-available-risk expected rate of return must be non-zero as there is a universe of action. So no delusions here, only accord with the principles I outlined.
With smiles,
Jason
Liked your response
Hi Jason,
This is a brilliant article on a topic that is considered fundumental in finance. Hopefully this will lead to further analysis of the term 'risk-free' to the ultimate realisation that in reality no action comes without a certain degree of risk (as you rightly pointed out). Well said!
Please keep us posted with more articles like this.
Hi Adrian,
Such high praise! Thank you for sharing your thoughts. You might really like the follow up post to this piece where I discuss possible proxies for the "lowest-available-risk expected rate of return": http://blogs.stage.cfainstitute.org/investor/2012/10/04/rethinking-the-…
Also, I tend to be a bit more philosophical in my blog posts so you might also like:
Capitalism: It's as Much About Cooperation as Competition http://blogs.stage.cfainstitute.org/investor/2012/07/16/capitalism-it-i…
With smiles!
Jason
Dear Mr. Jason
I believe your thoughts goes very well with the Idea of Islamic Finance as the risk free is prohibited instead offers the idea of sharing both of risks and returns (Musharaka) , but someone could say that risk free rate is only a compensation for the inflation rate, don't you think?
again thanks for sharing your thoughts
regards,,,
Osama Hussein
Hello Osama,
Thank you for taking the time to share your thoughts!
Your thought about comparing the risk-free rate to compensating for inflation is an interesting one. You could extend the argument out even further. That is, theoreticlaly the true risk-free rate could be the one that exactly compensates you for your risks. However, the risk-free rate is used prospectively by investment professionals, not retroactively. So this would require you have accounted for every possibility, not just probability. I think this is an impossible task.
On the other side, is my theory that all actions entail preferences, and consequently they also entail risk. Thus, the only way to avoid risk is to have no preferences, or to engage in no actions - an impossibility. In this theoretical direction risk is equal to zero, and is always equal to zero. Zero return for zero risk. If you believe in a returns compensating for risks, which I believe is intelligent, then the zero point must have zero return and zero risk.
Yours, in service,
Jason
Hi Jason
I like your theory on the risk free rate (perhaps because I agree that a true theoretical risk free rate should be zero.) When I was in graduate school many years ago it was said to be 3%, and that always struck me as very arbitrary. The way I think about it now is that for short-term periods for US government securities, our proxy for risk free, it should approach zero, but, for the reasons you mention, should not be zero. For longer-term periods it should include inflation expectations so that the "real", rather than "nominal", risk free rate remains zero.
The risk free, or lowest possible risk investment rate, is also usually compared to available alternative investments, and by holding the asset one incurs opportunity cost. However, a risk free investment also solves practical problems that aren't addressed in theoretical discussions. Suppose I have a suitcase with $1 million dollars in it. There is risk of me holding that suitcase beyond what I could earn by making an investment. My house could burn, I could be robbed, I could lose the suitcase at the train station. Not so with a risk free investment, so perhaps there is an argument for a negative return on a risk free rate since it not only compensates for the risk of action, but also for the risk of inaction.
Thanks again for your interesting article.
Jeff Caira