CHAPTER 5: N-PERIOD Binomial Option Pricing Model
5.1
Overview
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ne limitation of the one-period and two-period binomial
models is that the set of possible terminal stock values is quite small.
This limitation is overcome in a multi-period model of stock price
movements. For example, suppose
there are five hours remaining in a trading day and one period equals one hour.
At the end of the day, the multi-period binomial model would allow for 32
(25) possible end-of-day prices.
If a period equals one minute, we have 2300
possible ending values.
We extend the two-period binomial option pricing model to n-periods
in topic 5.2, Binomial Option Pricing: N-Periods. Appendix
C Chapter 5 Technical Topic: Limiting Results,
provides the formal derivation of this n- period model, Binomial Option
Pricing: N-Period Derivation.
The limiting behavior of this approach, as periods become
smaller and smaller, is discussed in topic 5.4, called Binomial Option Pricing: Limiting
Results. The n-period
model converges in the limit to the Black-Scholes option pricing model.
One advantage of the binomial approach is that not only does it
accommodate a wide range of option pricing problems, but also it provides an
interpretation of the Black-Scholes pricing model.