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Autores principales: Khatab, Mahmoud, Totzeck, Claudia
Formato: Preprint
Publicado: 2026
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Acceso en línea:https://arxiv.org/abs/2603.15337
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author Khatab, Mahmoud
Totzeck, Claudia
author_facet Khatab, Mahmoud
Totzeck, Claudia
contents We propose an algorithm to approximate solutions of global optimization problems in Sobolev spaces that follows the spirit of Consensus-based algorithms in finite dimensions. The main ingredient are Gaussian processes. In fact, we exploit their rich toolbox in order to draw sample functions from Sobolev spaces that satisfy initial values, boundary conditions or state constraints. Well-known marginalization properties of Gaussian processes help us to discretize the algorithm, that is stated in infinite dimensions, appropriately. We illustrate the performance of the algorithm and show its feasibility for nonlinear boundary value problems with state constraints as well as nonlinear optimal control problems constrained by a system of ordinary differential equations with several numerical results.
format Preprint
id arxiv_https___arxiv_org_abs_2603_15337
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle A Consensus-based optimization algorithm using Gaussian processes for global optimization problems in Sobolev spaces
Khatab, Mahmoud
Totzeck, Claudia
Optimization and Control
We propose an algorithm to approximate solutions of global optimization problems in Sobolev spaces that follows the spirit of Consensus-based algorithms in finite dimensions. The main ingredient are Gaussian processes. In fact, we exploit their rich toolbox in order to draw sample functions from Sobolev spaces that satisfy initial values, boundary conditions or state constraints. Well-known marginalization properties of Gaussian processes help us to discretize the algorithm, that is stated in infinite dimensions, appropriately. We illustrate the performance of the algorithm and show its feasibility for nonlinear boundary value problems with state constraints as well as nonlinear optimal control problems constrained by a system of ordinary differential equations with several numerical results.
title A Consensus-based optimization algorithm using Gaussian processes for global optimization problems in Sobolev spaces
topic Optimization and Control
url https://arxiv.org/abs/2603.15337