Philip Maymin
Bio [2007]
I am a PhD candidate in finance at the University of Chicago and a founder and manager of a hedge fund in Greenwich,
CT. I'm also a Justice of the Peace, a
weekly columnist for the Fairfield County Weekly, a policy scholar for the Yankee Institute, in which role I have written for the
Connecticut
Post, Hartford Business Journal, and Waterbury Republican-American, among others, and a former Libertarian candidate for
the U.S. House of
Representatives from Connecticut's fourth Congressional district. I'm also a former sports journalist and quantitative
basketball analyst. I
got a Master's in Applied Math and a Bachelor's in Computer Science from Harvard after I graduated from Phillips Academy. I have also
completed two years of Northwestern California University School of Law's online J.D. program and passed the California Baby Bar exam.
Project Title
Minimal Models of the Complexity of Financial Security Prices
Project
What's the simplest rule to model the complexity and randomness of financial markets? Security prices have complex behavior in the time
series and cross section of prices, returns, volume, and liquidity. It's easy to mimic security prices by introducing randomness, either
externally like a random walk or internally through large structures such as cellular automata involving trade between many investors, but
what are the minimal models that generate complexity?
One Trader
I find that a single investor trading in a single security can generate complex price behavior all by himself. He makes trading decisions by
looking back at the signs of the price change over the past few days. Because he is the representative investor, the price adjusts with his
decisions.
The Simplest Rule with Complex Behavior
Rule 54 is the only interesting 2-state buy/sell rule with lookbacks up to 15. With fixed lookbacks, the price series will always cycle, but
rule 54 often achieves near maximal cycle lengths, which can be quite long. For example, a 15-business-day lookback will cycle in about 130
years.
More Complicated Rules
Surprisingly, allowing an infinite lookback window, so that the trader looks back over each price change in the security's history back to
its very first day, removes complexity. There are no rules with either two or three internal states that produce interesting behavior: all
cycle very quickly. Allowing the lookback window to grow on a log scale, so that the trader looks back one more day before he is likely to
cycle, does produce complex behavior arbitrarily far, though sometimes with long periods of high predictability interspersed.
Multiple Traders
When several rules trade in the same security, we can also generate the trading volume and measures of liquidity. Sometimes complex rules
trade and remove complexity and sometimes simple rules trade and create complexity. Liquidity falls, even though volume is constant, before a
crash.
Project Demonstration
Trader Dynamics in
Minimal Models of Financial Complexity
Favorite Outer Totalistic 3-Color Rule
Rule chosen: 3892055
My favorite 3-color outer totalistic cellular automaton is rule 3892055.
Because outer totalistic CAs are symmetrical around the middle when starting with a single black cell, I started with
the simplest possible
non-symmetrical two-color initial conditions: {{1,0,1,1},0}. Then I did a random search, filtering by
complexity.
Rule 3892055 starts off slow and gets more and more complex with time. The attached notebook and the pictures below shows its evolution for
the first 7,500 steps, the 5,000 steps after that, and the 5,000 steps after that, each snapshot zoomed in to the most interesting part.
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