Quasi-Regression Monte-Carlo Scheme for Semi-Linear PDEs and BSDEs with Large Scale Parallelization on GPUs

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UDC.coleccionInvestigaciónes_ES
UDC.departamentoMatemáticases_ES
UDC.endPage921es_ES
UDC.grupoInvModelos e Métodos Numéricos en Enxeñaría e Ciencias Aplicadas (M2NICA)es_ES
UDC.journalTitleArchives of Computational Methods in Engineeringes_ES
UDC.startPage889es_ES
UDC.volume27es_ES
dc.contributor.authorGobet, Emmanuel
dc.contributor.authorLópez-Salas, José Germán
dc.contributor.authorVázquez, Carlos
dc.date.accessioned2024-07-19T12:31:21Z
dc.date.available2024-07-19T12:31:21Z
dc.date.issued2019-04-04
dc.description©2019 This version of the article has been accepted for publication, after peer review and is subject to Springer Nature’s AM terms of use, but is not the Version of Record and does not reflect post-acceptance improvements, or any corrections. The Version of Record is available online at: https://doi.org/10.1007/s11831-019-09335-xes_ES
dc.description.abstract[Abstract]: In this article we design a novel quasi-regression Monte Carlo algorithm in order to approximate the solution of discrete time backward stochastic differential equations, and we analyze the convergence of the proposed method. The algorithm also approximates the solution to the related semi-linear parabolic partial differential equation obtained through the well known Feynman–Kac representation. For the sake of enriching the algorithm with high order convergence a weighted approximation of the solution is computed and appropriate conditions on the parameters of the method are inferred. With the challenge of tackling problems in high dimensions we propose suitable projections of the solution and efficient parallelizations of the algorithm taking advantage of powerful many core processors such as graphics processing units.es_ES
dc.description.sponsorshipThe frst author research is part of the Finance for Energy Markets (FiME) lab, of the Chair Financial Risks of the Risk Foundation and of the ANR project CAESARS (ANR-15-CE05-0024). The second author has been fnancially supported by the Chair Financial Risks of the Risk Foundation, the Spanish Grant MTM2016-76497-R and the Xunta de Galicia 2018 postdoctoral grant. The third author was partially supported by Spanish Grant MTM2016-76497-R.es_ES
dc.description.sponsorshipFrance. Agence National de la Recherche; ANR-15-CE05-0024es_ES
dc.identifier.citationGobet, E., López-Salas, J.G. & Vázquez, C. Quasi-Regression Monte-Carlo Scheme for Semi-Linear PDEs and BSDEs with Large Scale Parallelization on GPUs. Arch Computat Methods Eng 27, 889–921 (2020). https://doi.org/10.1007/s11831-019-09335-xes_ES
dc.identifier.issn1886-1784
dc.identifier.issn1134-3060
dc.identifier.urihttp://hdl.handle.net/2183/38173
dc.language.isoenges_ES
dc.publisherSpringeres_ES
dc.relation.projectIDinfo:eu-repo/grantAgreement/AEI/Plan Estatal de Investigación Científica y Técnica y de Innovación 2013-2016/MTM2016-76497-R/ES/METODOS MATEMATICOS Y SIMULACION NUMERICA PARA RETOS EN FINANZAS CUANTITATIVAS, MEDIOAMBIENTE, BIOTECNOLOGIA Y EFICIENCIA INDUSTRIALes_ES
dc.relation.urihttps://doi.org/10.1007/s11831-019-09335-xes_ES
dc.rights.accessRightsopen accesses_ES
dc.subjectBackward stochastic differential equationses_ES
dc.subjectHigh order convergencees_ES
dc.subjectLinear parabolices_ES
dc.subjectManycore processorses_ES
dc.subjectMontecarlo algorithmses_ES
dc.subjectMontecarlo schemeses_ES
dc.subjectParallel computinges_ES
dc.subjectGPUses_ES
dc.titleQuasi-Regression Monte-Carlo Scheme for Semi-Linear PDEs and BSDEs with Large Scale Parallelization on GPUses_ES
dc.typejournal articlees_ES
dspace.entity.typePublication
relation.isAuthorOfPublication7879649b-7a9b-41cd-92df-f8e4c60d215f
relation.isAuthorOfPublicationdbc2be8e-6741-46b3-a22e-b648eae643d4
relation.isAuthorOfPublication.latestForDiscovery7879649b-7a9b-41cd-92df-f8e4c60d215f

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