If John Bender is right about options*—and, given his performance, there is good reason to believe he is—then virtually everyone else is wrong. Bender asserts that the option pricing theory developed by Nobel Prize–winning economists, which underlies virtually all option pricing models used by traders worldwide, is fundamentally flawed. This contention is not just a theoretical argument; Bender’s entire methodology is based on betting against the price implications of conventional option models. Bender places trades that will profit if his model’s estimates of price probabilities are more accurate than those implied by prevailing option prices, which more closely reflect standard option pricing models.
Bender has maintained a surprisingly low profile, in view of the large sums of money he is managing and his excellent performance. His fund did not show up in any of the industry databases I checked. As was the case for the majority of interview subjects in this book and its two predecessors, I found Bender through networking with industry contacts.
Bender graduated with high honors from the University of Pennsylvania in 1988, receiving a degree in biophysics. During his summers as an undergraduate, Bender held several scientific jobs, including positions at Livermore Labs and the Marine Biological Laboratories at Woods Hole. Although he liked science, he was disenchanted because the career scientists he observed were forced to spend much of their time seeking grants instead of doing research. At the same time, he became intrigued with the markets and saw that they provided a challenging application for his analytical skills.
Bender began trading his own account after graduation, but he had only a few thousand dollars of risk capital. After a year, he was able to raise $80,000 in financial backing. He traded this account from August 1989 through March 1995, averaging a compounded annual return of 187 percent during this period, with only three losing quarters, the worst being an 11 percent decline.
After taking a sabbatical, Bender launched his fund in August 1996, with returns over the subsequent three and a half years averaging 33 percent. Although still quite respectable, you might wonder what caused this steep decline in returns relative to the performance in his personal account in prior years. The answer is very simple: leverage. For the fund, Bender reduced his leverage by a factor of approximately 4 to 1 (which because of the effect of monthly compounding reduced the annual return by a greater amount), placing a strong emphasis on risk control. To date, the fund’s worst decline from an equity peak to a subsequent low has been only 6 percent. In addition to managing hundreds of millions in his own fund, Bender also manages an undisclosed allocation from the Quantum fund, for which he trades currency options.
It is quite common for Market Wizards to use a portion of their substantial trading profits to support favorite charities or causes. I found one of Bender’s uses for his winnings particularly noteworthy for its originality, long-lasting impact, and hands-on directness in mitigating a problem before the opportunity for action disappears: He is buying up thousands of acres of the Costa Rican rain forest to protect this area from destruction by developers.
A day before leaving for New York City to conduct interviews for this book, I learned that Bender was scheduled to be in the city at the same time. Since he lives in Virginia, which is not near any of the other traders I planned to interview, it seemed convenient to arrange a meeting on our mutually coincident visit to New York. The only problem was that my schedule was already booked solid. We decided to meet for a late dinner. To simplify the logistics, Bender booked a room at my hotel.
We met in our hotel lobby before leaving for dinner. It was an extremely warm summer evening. Bender was wearing a suit and tie, while I had considered substituting Dockers for jeans a sufficient concession to being dressed for dinner. Bender, who had made the reservations, expressed concern whether I would be allowed into the restaurant dressed as I was and suggested calling to make sure. I assured him that I usually did not encounter any problems because of my casual dress. He seemed almost disappointed when this proved to be the case. As the evening progressed, I became aware that Bender was clearly uncomfortable in his suit and tie, which was obviously atypical dress for him as well, and somewhat envious of the fact that I had gotten away going casual. His large frame seemed to strain in his more formal clothes.
The interview was conducted over a wonderful multicourse meal in a sushi restaurant. We left nearly four hours later, just short of midnight, when we suddenly realized that we were the last remaining diners and that the staff was milling about impatiently, waiting for us to depart. We took a brief break upon returning to the hotel, I to visit my orphaned wife, who had accompanied me to the city, and Bender to check on trades on the Tokyo Stock Exchange in which his firm is a heavy participant. When we met again in the hotel lobby fifteen minutes later, Bender was wearing shorts, a sloppy T-shirt, and a look of relief at having been freed from his suit and tie. The interview finished at three-thirty in the morning as the second of my three-hour tapes rolled to an end.
What was your career goal in college?
My plan was to be a research physicist.
What area of physics were you interested in?
I majored in biophysics. One of the projects I spent a lot of time on was trying to develop a method for displaying three-dimensional information using a light microscope. When you look at very small structures inside of a cell, you essentially have two choices: you can look at them with an electron microscope or you can look at them with a light microscope. If you use an electron microscope, you have the advantage that it magnifies objects very well. The problem is that you don’t have any idea whether the cell you see bears any resemblance to what it looked like when it was alive because in order for the image to show up, you first have to infuse the cell with heavy metals. I don’t know about you, but I’m sure that if someone shot me and placed me in a vat of molten lead, I wouldn’t come out looking anything like what I look like. The method of observation changed the object being observed. People would write papers saying that they had found a new structure in a cell, but then it would turn out to be merely an artifact of metal crystals precipitating inside the cell.
Everyone recognized the problem with using electron microscopes. Therefore the preferable approach was to try to use light microscopes. The main problem with light microscopes, however, is that when you use the extremely high magnification needed to look at very small objects, the depth of field approaches zero. You can see one flat slice in focus and everything else is out of focus, which makes it very difficult to view three-dimensional objects. If you try to view more than one layer, all you get is mud because the out-of-focus information wins out. To circumvent this obstacle, we had to come up with programs that would filter out the out-of-focus information. It’s a very interesting mathematical problem.
Why did you gravitate away from physics?
Physics was a lot of fun as a student. Everyone wants you to provide research help. You get a chance to work on stuff you find interesting, write research papers, and show everyone how smart you are. When you are no longer a student, however, you have to support yourself in the eyes of the institution, which means writing endless grant proposals and churning out papers for the main reason of getting tenure. You end up spending 90 percent of your time not doing physics. I would be busy working on physics all day while the other people in the lab would be tearing their hair out writing grant proposals. I realized that wasn’t for me.
When did you first get interested in the market?
When I was growing up, I spent all my time thinking about math and physics. I was a bit of a twisted kid. I started looking at the options market as early as high school because I thought it was a fun way to apply the mathematics I was learning.
When did you start trading?
In my senior year of college. The thing that I liked about trading was that the only limitation you had was yourself.
What did you trade?
Stocks and stock options on the Philadelphia Stock Exchange.
How did you end up trading on the floor?
I had a friend who was a market maker. I went down to the floor with him a few times and decided it was a perfect job for me. I had always been interested in the markets and mathematics, and option trading combined the two perfectly.
How did you get the money to trade when you first started out on the floor of the exchange?
I was able to raise $80,000 from a few backers who were professional gamblers. Because I was a serious Go and backgammon player, I had met some of the world’s best backgammon and poker players. One of my investors had just won the World Series of poker and another investor was one of the most successful backgammon players in world.
What did they get for backing you?
Initially, 50 percent of my profits. I eventually bought them out. There are a lot of similarities between gambling and trading, although gambling is a bad term.
Because?
Because it implies that your results depend on luck. The people that I’m talking about look at poker or backgammon as a business, not a game of chance. There are a few things that are essential to success in both trading as well as playing gambling games as a business. First, you have to understand edge and maximize your edge. Second, you have to be able to deal with losing. For example, a world-ranked backgammon player could lose $100,000 to a total pigeon because of bad luck. If that happens, he can’t lose his head. He has to stay calm and continue to do what he is supposed to be doing. Third, you have to understand gambler’s ruin—not playing too big for your bankroll.
It might seem that if you have an edge, the way to maximize the edge is to trade as big as you can. But that’s not the case, because of risk. As a professional gambler or as a trader, you are constantly walking the line between maximizing edge and minimizing your risk of tapping out.
How do you decide what is the right balance?
There is no single right answer to that question. It depends on the individual person’s risk tolerance. Let’s say you saved up enough money to live out your life in relative comfort but without the ability to make extravagant expenditures. I come along and offer to give you ten-to-one odds on the flip of a coin. The only catch is that you have to bet your entire net worth. That bet has a tremendous edge, but it is probably a bet that you wouldn’t want to make, because the value of what you can gain, even though it is a much larger sum of money, is much less than the value of what you could lose. If, however, you are just out of college with $10,000 in savings and your whole earnings career ahead of you, you would probably want to take the same bet. As a fund manager, the correct answer as to how to maximize your edge will depend not only on your own risk characteristics, but also on your perception of the risk profiles of your investors.
How long did you trade on the floor of the Philadelphia stock exchange?
Just over five years.
How did you do?
By the time I left, I had turned my initial $80,000 stake into over $7 million after paying back my investors.
If you were doing so well, why did you leave the floor?
As I made more money, it became increasingly difficult to invest it trading only two or three stocks; it made sense to go off the floor in order to be able to diversify.
How have you been able to make such consistent gains trading options?
To make money in options, you don’t need to know what the price of the stock is going to be; all you need to know is the probability distribution [the probabilities of a stock being at different price levels at the time of the option expiration].*
[The Black-Scholes formula (or one of its variations) is the widely used equation for deriving an option’s theoretical value. An implicit assump tion in the formula is that the probabilities of prices being at different levels at the time of the option expiration can be described by a normal curve*—the highest probabilities being for prices that are close to the current level and the probabilities for any price decreasing the further above or below the market it is.]
If the Almighty came to me and said, “I won’t tell you where IBM is going to be one month from now, but you’ve been a pretty good boy, so I will give you the probability distribution,” I could do the math—and it’s not very complicated math—and tell you exactly what every option that expires on that date is worth. The problem is that the Almighty is not giving me or anyone else the probability distribution for the price of IBM a month from now.
A normal distribution would be appropriate if stock price movements were analogous to what is commonly called “the drunkard’s walk.” If you have a drunkard in a narrow corridor, and all he can do is lurch forward or backward, in order for his movements to be considered a random walk, the following criteria would have to be met:
Those are pretty strict requirements. Not many variables meet these conditions. Stock prices, I would argue, don’t even come close [substituting daily price changes for the drunkard’s steps].
I don’t mean to suggest that Black and Scholes made stupid assumptions; they made the only legitimate assumptions possible, not being traders themselves. In fact, they won the Nobel Prize for it. Although, to be honest, that always seemed a bit strange to me because all they used was high school mathematics. All my trading operates on the premise that the most important part is the part that Black-Scholes left out—the assumption of the probability distribution.
Why do you say with such assurance that stock prices don’t even come close to a random walk?
As one example, whether you believe in it or not, there is such a thing as technical analysis, which tries to define support and resistance levels and trends. Regardless of whether technical analysis has any validity, enough people believe in it to impact the market. For example, if people expect a stock to find support at 65, lo and behold, they’re willing to buy it at 66. That is not a random walk statement.
I’ll give you another example. Assume people get excited about tech stocks for whatever reason and start buying them. Which funds are going to have the best performance next quarter when mom-and-pop public decide where to invest their money?—the tech funds. Which funds are going to have the best inflows during the next quarter?—the tech funds. What stocks are they going to buy?—not airlines, they’re tech funds. So the tech funds will go up even more. Therefore they’re going to have better performance and get the next allocation, and so on. You have all the ingredients for a trend. Again, this is not price behavior that is consistent with a random walk assumption.
You’ve seen this pattern increasingly in the recent run-up in the U.S. stock market. The rampant uptrend has been fueled by constant inflows into the same funds that are buying the same stocks, driving these stocks to values that are ridiculous by any historical valuation. You have stocks that have reproduction values of $20 million—someone’s Web page system—trading at $1 billion or more. Are they really worth that? I don’t want to be the one to say no—after all, they are trading there—but I think ultimately you’re going to see the same thing you saw with RCA during the TV boom: a run-up to stratospheric levels and then a crash.
If these companies do their job right and the Internet is what it’s supposed to be, with every company having access to every customer, they’re going to be cutting one another’s margins to the point where very few companies will make much money. If you pick up an issue of The New Yorker, you can find twenty ads for booksellers on the Internet. It’s a classic example of an industry with perfect competition. There will be some exceptions because there are brand names and some people will do their job better than others, but can the structure support the valuations that are currently out there for the industry? I doubt it.
Why are we seeing valuations for stocks that are so far above their historical levels? Has something changed fundamentally?
Because of the repetitive cycle of price strength bringing in new buying, which causes more price strength. An important factor that has amplified the rally in the Internet stocks is the limited supply of shares in these companies. Most Internet stocks float only about 20 percent or less of their shares.
Another major development during the past five to ten years has been a substantial upward shift in the amount of money insurance companies and pension funds allocate to stock investments. As hedge fund managers, we think we are huge if we are trading one billion dollars. That is nothing compared with insurance companies and pension funds that have assets of trillions of dollars.
If I understand you correctly, your basic premise is that stock price movements are not random and therefore the assumption that prices are normally distributed, which everyone uses to determine option values, cannot be the accurate mathematical representation of the true market. Does that imply that you’ve come up with an alternative mathematical option pricing model?
Not in the sense that you are probably thinking. It’s not a matter of coming up with a one-size-fits-all model that is better than the standard Black-Scholes model. The key point is that the correct probability distribution is different for every market and every time period.
The probability distribution has to be estimated on a case-by-case basis.
If your response to Bender’s last comment, which challenges the core premises assumed by option market participants, could best be summarized as “Huh?,” and assuming that you really care, then you should probably reread the explanation of probability distribution (footnote, page 228). In essence, Bender is saying that not only are conventional option pricing models wrong because they make the unwarranted assumption that prices are normally distributed, but the very idea that any single model could be used to estimate option prices for different markets (or stocks) is inherently wrong. Instead, it is necessary to use a different model for every market (or stock).
How do you estimate the probability distribution?
By looking at everything from the fundamentals to technical factors to who is doing what in the market. Each stock has its own probability distribution that depends on a host of factors: Who has what position? Where did the major buyers accumulate their positions? Where are their stop-loss points? What price levels are likely to be technically significant?
Can you get that type of information reliably?
I get that information off the floors in the case of stocks and stock options and from the banks in the case of currencies.
How do you turn information like who is doing what into an alternative option pricing model?
The best example I can think of involves the gold market rather than stocks. Back in 1993, after a thirteen-year slide, gold rebounded above the psychologically critical $400 level. A lot of the commodity trading advisors [money managers in the futures markets, called CTAs for short], who are mostly trend followers, jumped in on long side of gold, assuming that the long-term downtrend had been reversed. Most of these people use models that will stop out or reverse their long positions if prices go down by a certain amount. Because of the large number of CTAs in this trade and their stop-loss style of trading, I felt that a price decline could trigger a domino-effect selling wave. I knew from following these traders in the past that their stops were largely a function of market volatility. My perception was that if the market went back down to about the $390 level, their stops would start to get triggered, beginning a chain reaction.
I didn’t want to sell the market at $405, which is where it was at the time, because there was still support at $400. I did, however, feel reasonably sure that there was almost no chance the market would trade down to $385 without setting off a huge calamity. Why? Because if the market traded to $385, you could be sure that the stops would have started to be triggered. And once the process was under way, it wasn’t going to stop at $385. Therefore, you could afford to put on an option position that lost money if gold slowly traded down to $385–$390 and just sat there because it wasn’t going to happen. Based on these expectations, I implemented a strategy that would lose if gold declined moderately and stayed there, but would make a lot of money if gold went down huge, and a little bit of money if gold prices held steady or went higher. As it turned out, Russia announced they were going to sell gold, and the market traded down gradually to $390 and then went almost immediately to $350 as each stop order kicked off the next stop order.
The Black-Scholes model doesn’t make these types of distinctions. If gold is trading at $405, it assumes that the probability that it will be trading at $360 a month from now is tremendously smaller than the probability that it will be trading at $385. What I’m saying is that under the right circumstances, it might actually be more likely that gold will be trading at $360 than at $385. If my expectations, which assume nonrandom price behavior, are correct, it will imply profit opportunities because the market is pricing options on the assumption that price movements will be random.
Could you give me a stock market example?
I’ll give you a stock index example. Last year [1998], it was my belief that stocks were trading on money inflows rather than their own intrinsic fundamentals. IBM wasn’t going up because the analysts were looking at IBM and saying, “Here’s the future earning stream and we predict the price should rise to this level.” IBM was going up because people were dumping money into the market, and managers were buying IBM and other stocks because they had to invest the money somewhere.
A market that is driven by inflows can have small corrections, but it has to then immediately recover to new highs to keep generating new money inflows. Otherwise, money inflows are likely to dry up, and the market will fall apart. Therefore, this type of market is likely to either trend higher or break sharply. There is a much smaller-than-normal chance that the market will go down 5 or 6 percent and stay there. Based on this assumption, last year I implemented an option strategy that would make a lot of money if the market went down big, make a little bit if the market went up small, and lose a small amount if the market went down small and stayed there. The market kept up its relentless move upward for the first half the year, and I made a small amount of money. Then the market had a correction and didn’t recover right away; the next stop was down 20 percent. I made an enormous amount of money on that move.
Each of your examples has been very market specific. If I said to you that you could come up with any alternative model you wished instead of Black-Scholes, but you had to apply it to all markets, could you do any better than Black-Scholes?
No, given that restriction, the assumption that prices are random is as good as any other assumption. However, just because Black and Scholes used a one-size-fits-all approach doesn’t mean it’s correct.
Don’t other firms such as Susquehanna [a company whose principal was interviewed in The New Market Wizards] also trade on models based on perceived mispricings implied by the standard Black-Scholes model?
When I was on the floor of the Philadelphia Stock Exchange, I was typically trading on the other side of firms such as Susquehanna. They thought they had something special because they were using a pricing model that modified the Black-Scholes model. Basically, their modifications were trivial.
I call what they were doing TV set–type adjustments. Let’s say I have an old-fashioned TV with an aerial. I turn it on, and the picture is not quite right. I know it’s supposed to be Mickey Mouse, but one ear is fuzzy and he is a funny color green. What do I do? Do I sit down and calculate where my aerial should be relative to the location of the broadcast antenna? No, I don’t do that. What I do is walk up to the TV, whack it a couple of times, and twist the aerial. What am I doing? I’m operating totally on feedback. I have never thought once about what is really going on. All I do is twist the aerial until the picture looks like what I think it should—until I see Mickey Mouse in all of his glory.
The market-making firms would make minor adjustments to the Black-Scholes model—the same way I twisted the aerial to get Mickey Mouse’s skin color to be beige instead of green—until their model showed the same prices that were being traded on the floor. Then they would say, “Wow, we solved it; here is the model!” They would use this model to print out option price sheets and send in a bunch of kids, whom we called “sheet monkeys,” to stand on the floor and make markets. But did they ever stop to think about what the right model would be instead of Black-Scholes?” No. They merely twisted the aerial on the TV set until the picture matched the picture on the floor.
This approach may be okay if you are a market maker and all you are trying to do is profit from the price spread between the bid and the offer rather than make statements about which options are fundamentally overpriced or underpriced. As a trader, however, I’m trying to put on positions that identify when the market is mispriced. I can’t use a model like that. I need to figure out fundamentally what the real prices should be, not to re-create the prices on the floor.
Even though you manage a quarter of a billion dollars you seem to keep an incredibly low profile. In fact, I’ve never seen your name in print. Is this deliberate?
As a policy, I don’t do interviews with the media.
Why is that?
My feeling is that it is very difficult for a money manager to give an honest interview. Why would I want to be interviewed and tell the world all my best investment ideas? Let’s say I am a fund manager and I have just identified XYZ as being the best buy around. Why should I go on TV and announce that to the world? If I really believe that is true, shouldn’t I be buying the stock? And if I am buying it, why would I want any competition?
Well, you may already be in the position.
Exactly. The only time anyone touts a position is when they have it on and want to get out. When you turn on some financial TV program and see someone tell you to buy a stock, there’s a good chance he’s telling you to buy what he wants to sell. I’ve seen fund managers recommend the stock on TV and then seen their sell orders on the floor the same day.
There is an alternative scenario. You could be bullish on XYZ and have just bought your entire position. If that is the case, it would be beneficial for you to have other people buying the stock, even if you have no intention of selling it.
Isn’t that also self-serving and unethical?
No, I would argue that if I own XYZ and want to get out of it, and then I go on TV to tout the stock—that is unethical. But if I have just bought XYZ and own all I want, and I am a long-term investor who doesn’t intend to get out of the stock for another six to eight months, I don’t see anything wrong with recommending the stock.
Maybe not in that case. But being on the floor, I’ve seen all sorts of conflicts between trade recommendations and a firm’s own trading activity.
Such as?
I’ll give you an example that is a matter of public record and involves over-the-counter stocks—those total dens of thievery. It became recognized that some companies recommended stocks to their clients and then sold the same stocks themselves all day long. Not only were these firms the largest sellers of a stock on the day after they recommended it, but they were also the largest buyers of the stock during the preceding week. Here is how they explained it—I’m paraphrasing, but I am not making any of this up: “These over-the-counter stocks have very little liquidity. If we just recommend the stock, our clients won’t be able to buy it because the market will run away. Therefore we have a to buy a few million shares of the stock before we recommend it, so that when we do, we have supply to sell our customers.” The SEC, which looked into this practice, accepted their argument, and they continue to do this. It’s perfectly legal.
If you took the cynical attitude that all Wall Street recommendations are made to get the firm’s large clients or the firm itself out of positions, you would make money. I had a friend who made money using exactly that strategy. In my own trading, when I am estimating the price probability distribution for a stock, and a number of Wall Street firms put out buy recommendations on that stock, it grossly changes the probability distribution—the chances of that stock dropping sharply become much larger.
Why is that?
If a bunch of brokerage firms recommend AOL, after two or three weeks, we figure that everyone who wanted to buy the stock has already bought it. That’s the same reason why most fund managers underperform the S&P: They buy the trendy stocks and the stocks where all the good news is. The fact is that they may be buying a good company, but they’re getting it at a bad price. Conversely, when a stock gets hit by really bad news, and every analyst downgrades the stock, it’s probably a good buy. It may be a bad company, but you are getting a good price—not necessarily right away, but after a few weeks when all the selling on the news has taken place. It’s not the current opinion on the stock that matters, but rather the potential change in the opinion.
It doesn’t sound like you have a very high regard for Wall Street analysts.
If you tune in CNBC and see a stock that has announced horrendous earnings and is down 40 percent, the next morning, you’ll see every analyst on the Street dropping the stock from their recommended list. Where were they the day before? Even though the news is already out and the stock is down 40 percent in after-hours trading, they get credit for recommending liquidation of the stock on the previous day’s close because the market hasn’t officially opened yet. When you look at their track record, it appears that they recommended liquidating the stock at $50, even though at the time, the stock was trading at $30 in the off-the-floor market before the official exchange opening. Conversely, if a stock announces good news, and the stock is trading sharply higher before the official exchange opening, analysts can recommend a buy and get credit for issuing the recommendation on the previous close.
Bender provides some very important insights for option traders, and we’ll get to those in a moment. But the most important message of this chapter is: Don’t accept anything; question everything. This principle is equally relevant to all traders, and I suspect to all professions. The breakthroughs are made by those that question what is obviously “true.” As but one example, before Einstein, the idea that time was a constant seemed so apparent that the alternative was not even considered. By questioning the obvious and realizing that the accepted view had to be wrong (that is, time was variable and dependent on relative velocity), Einstein made the greatest strides in the history of science.
One of the basic tenets of option theory is that the probabilities of different prices on a future date can be described by a normal curve.* Many traders have tweaked this model in various ways. For example, many option market participants have realized that rare events (very large price increases and decreases, such as the October 19, 1987, stock market crash) were far more common in reality than predicted by a normal curve and have adjusted the curve accordingly. (They made the tails of the curve fatter.) Bender, however, has gone much further. He has questioned the very premise of using a normal curve as the starting point for describing prices. He has also questioned the convention of using a single model to describe the price behavior—and by implication option prices—of different markets and stocks. By ditching the concept that price movements behave in the random fashion implicitly assumed by a normal distribution and by dropping the assumption of a universal model, Bender was able to derive much more accurate option pricing models.
Ideally, options should be used to express trades where the trader’s expectations differ from the theoretical assumptions of standard option pricing models. For example, if you believe that a given stock has a chance that is much greater than normal of witnessing a large, rapid price rise before the option expiration date, then purchasing out-of-the-money call options might be a much better trade (in terms of return versus risk) than buying the stock. (Out-of-the-money call options are relatively cheap because they will only have value at expiration if the stock price rises sharply.)
As another example, let’s say there is an upcoming event for a stock that has an equal chance of being bullish or bearish. But if it is bullish, you expect that a large price rise will be more likely than a moderate price rise. Standard option pricing models, of course, assume that a moderate price rise is always more likely than a large price rise. Insofar as your assumptions are correct and not already discounted by prevailing option prices, it would be possible to construct an option trade that would stack the odds in your favor. As one example, you might sell at-the-money call options and use the premium collected to buy a much larger number of cheaper out-of-the-money call options. This strategy will break even if prices decline, lose moderately if prices rise a little, and win big if prices rise a lot.
The key to using options effectively is to sketch out your expectations of the probabilities of a stock moving to different price levels. If these expectations differ from the neutral price assumptions that underlie a normal distribution curve and standard option pricing models, it implies that there are option strategies that offer a particularly favorable bet—assuming, of course, that your expectations tend to be more accurate than random guesses.
Update on John Bender
Bender closed his fund in late 2000, a consequence of a brain aneurysm he suffered earlier in the year. While the stock markets plunged in 2000 (declines of 10 percent in the S&P 500 and 39 percent in Nasdaq), his fund registered an astonishing 269 percent return.
Since closing his fund, Bender has devoted his energies to preserving the Costa Rican rain forest. Bender has used his market winnings to establish a reserve in which he has accumulated ownership of over 5,000 acres. Bender is thrilled that there are already indications of a marked recovery in animal numbers on the reserve. Speaking of poachers, he explains, “Since our land is patrolled and there is land fifty miles away that isn’t, they go there.” Next, he is planning to reintroduce near-extinct wildlife species into the preserve. Bender’s desire to expand the reserve is a primary reason he is considering resuming his trading career, albeit at a much less frenzied pace.
I don’t want to ask questions that are too personal, but I don’t know how to avoid the subject. Just tell me if you feel uncomfortable talking about it. Did the aneurysm occur while you were trading?
Ironically, it occurred while I was on a long weekend vacation in Costa Rica. At the time, I thought that was kind of weird. I subsequently found out that it is more common for aneurysms to occur when there is a break from high stress than during a period of stress. For example, it is much more common for aneurysms to occur on a weekend than during a weekday.
I know your fund closed a little over a half year after you suffered your aneurysm. Did you recover quickly enough to have any involvement with the fund before it closed, or did your staff just gradually liquidate the positions?
Actually, I was back to watching the markets and supervising the portfolio in terms of risk management within about a month. I wasn’t that active in trading, though, because I had speech problems. I couldn’t pick up the phone and place an order because it would have been impossible for someone to understand me, and even if I could be understood, I was embarrassed by my speech. I could, however, relay important information to my wife, Ann, who could then relay the message to the appropriate people.
Given the seriousness of your medical condition, why did you return to such stressful activity so quickly?
The fund held huge positions. I felt an obligation to my investors to watch those positions so that they could be closed down in an orderly fashion. As it turned out, during the period before the fund closed—the second and third quarters of 2000—a lot of the events I had anticipated would happen in the markets occurred, and the fund made a huge amount of money.
Was the aneurysm the reason you gave up trading?
It was certainly a wake-up call that my lifestyle had degraded to a point where something had to change. I realized that trading twenty hours a day and sleeping two hours during weekdays was not a sustainable schedule. I also had a friend who was a trader and had just suffered a heart attack at forty-one. Another very important influence was my growing involvement in preserving the Costa Rican rain forest. I felt I wanted to devote my life to the preserve. All of these factors contributed to my decision to quit trading.
Did you view this as a permanent exit or did you expect to return to trading at some future point?
If you asked me at the time, I would have said I probably wouldn’t come back. But that would have been my best guess; I didn’t know for sure.
Have you begun trading again?
No, but I did start watching the market seriously several weeks ago. If I do resume trading, it will be on a limited basis, trading only in the U.S. time zone, not the twenty-hour days I was doing before.
We’ve seen a dramatic slide in stock prices since our original interview. Any thoughts about this situation?
I don’t want to come off sounding too high and mighty, but this is what I thought would happen when we did our interview.
Namely?
Namely what Warren Buffett has been saying all along: The widespread adoption of a new technology doesn’t mean that anyone is going to make a profit. As he points out, most airline companies failed, even though the airplane was a wonderful invention, which lots of people use. Similarly, most car manufacturers also failed, even though almost everyone uses cars. During the late stages of the bull market, you had all these people running around saying that the Internet was going to change the world, and therefore you had to invest. Well, yes the Internet will change the world, but that doesn’t mean it’s a good investment.
There was also the distortion of the positive feedback loop—higher Internet stock prices influenced more buying of Internet stocks, causing still higher prices and so on. This can only go on for so long before a negative feedback develops. Consider what happened with IPOs during the latter stages of the bull market. Companies with $10 million of computer equipment and an idea that had no barrier to entry were selling at capitalizations of $4 billion. The day when somebody pays billions for a company that takes millions to set up is the day you are going to see twenty smart people start twenty more companies that look exactly the same. And that is precisely what happened.
It’s obvious that the combination of wildly inflated stock prices and the absence of barriers to entry had striking bearish implications for Internet companies. But why would the Internet be bearish for other companies?
Because the Internet lowers the barriers to entry into a huge range of different businesses. Unless there is intellectual property involved, your competition is endless. Anyone can now put up a web site for minimal cost and sell the same products as established companies with lots of infrastructure. They don’t need a marketing department; they can use the Internet. They don’t need a distribution center; they can use UPS. The Internet also makes it easier for consumers to do searches and buy on price comparisons. Unless you are producing an item that involves intellectual property, I would argue that eventually you are going to see your profits go to zero.
Are you still bearish now with stock prices having already declined very sharply from their 2000 highs? What is your long-term view for the market at this juncture?
Have we reached a correct valuation for stocks compared with other bear market lows? No, but I don’t think this bear market will end in the usual way with stock prices falling to extreme low valuation levels as is typical at market bottoms. There is just too much money available for investment for that to happen. It’s a demographic argument. We are at the threshold of a time period when the baby boomers will be at their peak earning years. At the same time, their expenses will be declining, as more of their mortgages are paid off and their kids get out of college or leave the household. This combination of trends will create a huge pool of money that needs to be invested somewhere. A lot of people right now are willing to let their money sit in cash because they’re scared. But cash investments are paying almost nothing. It won’t take much to sway people to start putting money back into stocks because the alternative implies almost no return.