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Main Authors: Edwards, David, Bessac, Julie, Cappello, Franck, Leman, Scotland
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2407.05914
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author Edwards, David
Bessac, Julie
Cappello, Franck
Leman, Scotland
author_facet Edwards, David
Bessac, Julie
Cappello, Franck
Leman, Scotland
contents This paper presents a novel approach to level set estimation for any function/simulation with an arbitrary number of continuous inputs and arbitrary numbers of continuous responses. We present a method that uses existing data from computer model simulations to fit a Gaussian process surrogate and use a newly proposed Markov Chain Monte Carlo technique, which we refer to as Smoothed Approximate Bayesian Computation to sample sets of parameters that yield a desired response, which improves on ``hard-clipped" versions of ABC. We prove that our method converges to the correct distribution (i.e. the posterior distribution of level sets, or probability contours) and give results of our method on known functions and a dam breach simulation where the relationship between input parameters and responses of interest is unknown. Two versions of S-ABC are offered based on: 1) surrogating an accurately known target model and 2) surrogating an approximate model, which leads to uncertainty in estimating the level sets. In addition, we show how our method can be extended to multiple responses with an accompanying example. As demonstrated, S-ABC is able to estimate a level set accurately without the use of a predefined grid or signed distance function.
format Preprint
id arxiv_https___arxiv_org_abs_2407_05914
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Constructing Level Sets Using Smoothed Approximate Bayesian Computation
Edwards, David
Bessac, Julie
Cappello, Franck
Leman, Scotland
Methodology
Computation
This paper presents a novel approach to level set estimation for any function/simulation with an arbitrary number of continuous inputs and arbitrary numbers of continuous responses. We present a method that uses existing data from computer model simulations to fit a Gaussian process surrogate and use a newly proposed Markov Chain Monte Carlo technique, which we refer to as Smoothed Approximate Bayesian Computation to sample sets of parameters that yield a desired response, which improves on ``hard-clipped" versions of ABC. We prove that our method converges to the correct distribution (i.e. the posterior distribution of level sets, or probability contours) and give results of our method on known functions and a dam breach simulation where the relationship between input parameters and responses of interest is unknown. Two versions of S-ABC are offered based on: 1) surrogating an accurately known target model and 2) surrogating an approximate model, which leads to uncertainty in estimating the level sets. In addition, we show how our method can be extended to multiple responses with an accompanying example. As demonstrated, S-ABC is able to estimate a level set accurately without the use of a predefined grid or signed distance function.
title Constructing Level Sets Using Smoothed Approximate Bayesian Computation
topic Methodology
Computation
url https://arxiv.org/abs/2407.05914