Risk over Time(danluu.com)
danluu.com
Risk over Time
https://danluu.com/norstad/risk-time/
7 comments
There is an interesting rebuttal to the option pricing argument by Zvi Bodie [1] (you can view a free copy via Google Scholar), which I don't claim to fully understand. Warren Buffett famously sold 15-year European puts in the S&P 500, FTSE, euro stoxx 50, Nikkei 225 and received premiums of $4.5B. To me, it feels like invoking Black-Scholes in this way, Bodie may be making the error of citing a mathematical formula without satisfying all of its assumptions. Perhaps Black-Scholes works for accurately pricing short-term options, but not for 15-year or higher time horizons that more closely match an average adult working career?
[1] On the risk of stocks in the long run: A note. R Taylor, DJ Brown. Financial Analysts Journal, 1996
[1] On the risk of stocks in the long run: A note. R Taylor, DJ Brown. Financial Analysts Journal, 1996
It does seem that Black-Scholes cannot apply here. I think the main issue is timing the strike: for a normal option, if it is ever in the money, it will get exercised. For a "portfolio insurance" argument, it seems like we don't really care if the portfolio is down 99.9% for only a single day in the 20 year timespan. But neglecting that possibility would be ruinous to someone underwriting a normal option.
I know very little about finance but I did notice that the author specifically notes that the insurance is the same as an European put option (ie can only be exercised at expiry), to which Black-Scholes can be applied.
I knew that overlooking the word "European" which I did not understand would be a mistake. Thank you.
This article was written two decades ago. It is excellent work, although as you’re considering how to put into action the insights therein, note that deposit rates being at 6% are very much of that era.
Also, slightly tangential to the content of the article but nevertheless of great interest to those thinking about risk over time is the work of Mark Spitznagel of Universa (with which Nassim Taleb is also involved) on tail-risk hedging.
Bloomberg ran a profile of him back at the beginning of the pandemic: https://www.bloomberg.com/news/articles/2020-04-08/taleb-adv...
Also, slightly tangential to the content of the article but nevertheless of great interest to those thinking about risk over time is the work of Mark Spitznagel of Universa (with which Nassim Taleb is also involved) on tail-risk hedging.
Bloomberg ran a profile of him back at the beginning of the pandemic: https://www.bloomberg.com/news/articles/2020-04-08/taleb-adv...
The two fundamental problems of Risk Management are that nobody can define risk, and you can't manage something that you can't define. :-)
To talk about "increasing risk" you need define risk and what ordering you put on risk. This article does neither.
Luckily, I kept reading, because the option pricing argument seems extremely solid to me. The common sense notion that your expected downside gets smaller over time is actually wrong according to options pricing - actually, longer-term put options are more expensive. I don’t see a way around that.