I'm in need of some tips regarding a small project I'm doing. My goal is an implementation of a Fast Fourier Transform algorithm (FFT) which can be applied to the pricing of options.
First concern: which FFT?
There are a lot of different FFT algorithms, the most famous one being Cooley-Tukey. My thoughts on this: I prefer the most simple one, since this is no thesis or big project, just a course on Algorithms. But it has to be compatible with option pricing (in contrast with the most - well in our general literature- referenced application of images/sound processing). So it depends on the form of input that is provided (on which I need some advice). I'm familiar with the several improvements, like a Fractional FFT, mixed-radix FFT etc. But these seem pretty complex and optimization/performance driven, which is not relevant for my project.
Second concern: which pricing model?
I Guess Black-Scholes (BS) is a bit too 'flat' and I am aware of the several models that emerged after BS. So, with the same objectives as stated above, I'd initially prefer the Heston model.
There are a lot of considerations, and the truth is that I just can't see the wood for the trees.
Some background info:
My background is a B.Sc in Mathematics (Theoretical), so I have some understanding of Fourier transforms.
The goal is a working FFT implementation for calculating option pricing. It does not have to be the fastest (no extreme optimization). The goals are trying to understand the chosen FFT and having a real-world working application.
So could you give some advice on the choices?
I've read a lot of papers on FFT + Option pricing, say all the decent hits on googles first few pages. But those studies were written with a much 'higher' cause.