Litcius/Paper detail

Pricing High-Dimensional Bermudan Options with Hierarchical Tensor Formats

Christian Bayer, Martin Eigel, Leon Sallandt, Philipp Trunschke

2023SIAM Journal on Financial Mathematics16 citationsDOIOpen Access PDF

Abstract

An efficient compression technique based on hierarchical tensors for popular option pricing methods is presented. It is shown that the "curse of dimensionality" can be alleviated for the computation of Bermudan option prices with the Monte Carlo least-squares approach as well as the dual martingale method, both using high-dimensional tensorized polynomial expansions. This discretization allows for a simple and computationally cheap evaluation of conditional expectations. Complexity estimates are provided as well as a description of the optimization procedures in the tensor train format. Numerical experiments illustrate the favourable accuracy of the proposed methods. The dynamical programming method yields results comparable to recent Neural Network based methods.

Topics & Concepts

Curse of dimensionalityMonte Carlo methods for option pricingValuation of optionsComputationMathematical optimizationTensor (intrinsic definition)Computer scienceMartingale (probability theory)Monte Carlo methodArtificial neural networkApplied mathematicsMathematicsAlgorithmEconometricsArtificial intelligenceStatisticsPure mathematicsTensor decomposition and applicationsModel Reduction and Neural NetworksAdvanced Numerical Methods in Computational Mathematics