AI Chat AI Image Generator AI Video Text to Speech

MLMC techniques for discontinuous functions

01/07/2023

∙

by Michael B. Giles, et al.

∙

∙

The Multilevel Monte Carlo (MLMC) approach usually works well when estimating the expected value of a quantity which is a Lipschitz function of intermediate quantities, but if it is a discontinuous function it can lead to a much slower decay in the variance of the MLMC correction. This article reviews the literature on techniques which can be used to overcome this challenge in a variety of different contexts, and discusses recent developments using either a branching diffusion or adaptive sampling.

page 1

page 2

page 3

page 4

research

∙ 05/22/2023

Antithetic multilevel Monte Carlo method for approximations of SDEs with non-globally Lipschitz continuous coefficients

In the field of computational finance, it is common for the quantity of ...

0 Chenxu Pang, et al. ∙

research

∙ 07/26/2023

An Antithetic Multilevel Monte Carlo-Milstein Scheme for Stochastic Partial Differential Equations

We present a novel multilevel Monte Carlo approach for estimating quanti...

0 Abdul-Lateef Haji-Al, et al. ∙

research

∙ 07/19/2021

Adaptive Multilevel Monte Carlo for Probabilities

We consider the numerical approximation of ℙ[G∈Ω] where the d-dimensiona...

0 Abdul-Lateef Haji-Ali, et al. ∙

research

∙ 08/15/2023

Nested Multilevel Monte Carlo with Biased and Antithetic Sampling

We consider the problem of estimating a nested structure of two expectat...

0 Abdul-Lateef Haji-Ali, et al. ∙

research

∙ 03/29/2021

Monte Carlo algorithm for the extrema of tempered stable processes

We develop a novel Monte Carlo algorithm for the vector consisting of th...

0 Jorge Ignacio González Cázares, et al. ∙

research

∙ 08/08/2017

Derivative-Based Optimization with a Non-Smooth Simulated Criterion

Indirect inference requires simulating realizations of endogenous variab...

0 David T. Frazier, et al. ∙