Please use this identifier to cite or link to this item: http://earsiv.odu.edu.tr:8080/xmlui/handle/11489/3338
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dc.contributor.authorSay, Fatih-
dc.date.accessioned2023-01-06T08:59:45Z-
dc.date.available2023-01-06T08:59:45Z-
dc.date.issued2022-
dc.identifier.citationSay, F. (2022). On the asymptotic behavior of a second-order general differential equation. Numerical Methods For Partial Differential Equations, 38(2), 262-271.Doi:10.1002/num.22774en_US
dc.identifier.isbn0749-159X-
dc.identifier.isbn1098-2426-
dc.identifier.urihttp://dx.doi.org/10.1002/num.22774-
dc.identifier.urihttps://www.webofscience.com/wos/woscc/full-record/WOS:000608914200001-
dc.identifier.urihttp://earsiv.odu.edu.tr:8080/xmlui/handle/11489/3338-
dc.descriptionWoS Categories : Mathematics, Applied Web of Science Index : Science Citation Index Expanded (SCI-EXPANDED) Research Areas : Mathematicsen_US
dc.description.abstractStudying ordinary or partial differential equations or integrals using traditional asymptotic analysis, unfortunately, fails to extract the exponentially small terms and fails to derive some of their asymptotic features. In this paper, we discuss how to characterize an asymptotic behavior of a singular linear differential equation by the methods in exponential asymptotics. This paper is particularly concerned with the formulation of the series representation of a general second-order differential equation. It provides a detailed explanation of the asymptotic behavior of the differential equation and its relation between the prefactor functions and the singulant of the expansion of the equation. Through having this relationship, one can directly uncover and investigate invisible exponentially small terms and Stokes phenomenon without doing more work for the particular type of equations. Here, we demonstrate how these terms and form of the expansion can be computed straight-away, and, in a manner, this can be extended to the derivation of the potential Stokes and anti-Stokes lines.en_US
dc.language.isoengen_US
dc.publisherWILEY HOBOKENen_US
dc.relation.isversionof10.1002/num.22774en_US
dc.rightsinfo:eu-repo/semantics/openAccessen_US
dc.subjectSTOKES LINES; EXPONENTIAL ASYMPTOTICS; HYPERASYMPTOTICS; SERIES; ORDERSen_US
dc.subjectasymptotic analysis; asymptotic behavior; perturbation; singulant; singularityen_US
dc.titleOn the asymptotic behavior of a second-order general differential equationen_US
dc.typearticleen_US
dc.relation.journalNUMERICAL METHODS FOR PARTIAL DIFFERENTIAL EQUATIONSen_US
dc.contributor.departmentOrdu Üniversitesien_US
dc.identifier.volume38en_US
dc.identifier.issue2en_US
dc.identifier.startpage262en_US
dc.identifier.endpage271en_US
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