Fast Sampling from Time-Integrated Bridges using Deep Learning

Abstract

We propose a methodology to sample from time-integrated stochastic bridges, namely random variables defined as ∫t1t2 f(Y(t))dt conditioned on Y(t1)\!=\!a and Y(t2)\!=\!b, with a,b∈ R. The Stochastic Collocation Monte Carlo sampler and the Seven-League scheme are applied for this purpose. Notably, the distribution of the time-integrated bridge is approximated utilizing a polynomial chaos expansion built on a suitable set of stochastic collocation points. Furthermore, artificial neural networks are employed to learn the collocation points. The result is a robust, data-driven procedure for the Monte Carlo sampling from conditional time-integrated processes, which guarantees high accuracy and generates thousands of samples in milliseconds. Applications, with a focus on finance, are presented here as well.