Researchers from J.P. Morgan and Imperial College London present a numerically efficient approach for machine learning a risk-neutral measure for paths of simulated spot and option prices up to a finite horizon under convex transaction costs and convex trading constraints.
This approach can then be used to implement a stochastic implied volatility model in the following two steps:
1) Train a market simulator for option prices, for example as discussed in our recent work here;
2) Find a risk-neutral density, specifically in our approach the minimal entropy martingale measure.
The resulting model can be used for risk-neutral pricing, or for deep hedging in the case of transaction costs or trading constraints. To motivate the proposed approach, researchers also show that market dynamics are free from “statistical arbitrage” in the absence of transaction costs if and only if they follow a risk-neutral measure. They additionally provide a more general characterization in the presence of convex transaction costs and trading constraints.
These results can be seen as an analogue of the fundamental theorem of asset pricing for statistical arbitrage under trading frictions and are of independent interest.