A system is chaotic if it exhibits sensitive dependence on initial conditions (SDIC)
So an infinitesimal change is made to the initial conditions (the initial state of the system), then the corresponding change iterated through the system for some arbitrary length of time will grow exponentially
The largest Lyapunov exponent is a test for chaos
It measures the rate at which information is lost from a system
A positive largest Lyapunov exponent implies sensitive dependence, and therefore that evidence of chaos has been obtained
Almost without exception, applications of chaos theory to financial markets have been unsuccessful
This is probably because financial and economic data are usually far noisier and ‘more random’ than data from other disciplines
The most common class of ANN models in finance are known as feedforward network models
These have a set of inputs (akin to regressors) linked to one or more outputs (akin to the regressand) via one or more ‘hidden’ or intermediate layers
The size and number of hidden layers can be modified to give a closer or less close fit to the data sample
A feedforward network with no hidden layers is simply a standard linear regression model
Neural network models work best where financial theory has virtually nothing to say about the likely functional form for the relationship between a set of variables.
