Iterative Method for Approximate-Analytical Solutions of Linear Schrödinger Equation

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dc.contributor.authorAkinlabi, Grace O.
dc.contributor.authorBraimah, J.A.
dc.contributor.authorAbolarinwa, A.
dc.contributor.authorEdeki, S.O.
dc.date.accessioned2026-06-03T11:57:39Z
dc.date.issued2021
dc.description.abstractIn this study, the modified Picard Iterative Method (MPIM) is used to provide analytic and numerical solutions to linear Schrödinger Equations. These approximate analytical solutions for the examples under consideration are easily computed. The suggested method is employed without any transformation, discretization, linearization, or limiting assumptions. The obtained results are similar to their exact forms. As a result, the approach is highly suggested for both linear and non-linear time-space fractional partial differential models with applications in various applied disciplines.
dc.identifier.issndoi:10.1088/1742-6596/2199/1/012005
dc.identifier.urihttps://repository.covenantuniversity.edu.ng/handle/123456789/50914
dc.publisherIOP Publishing
dc.relation.ispartofseriesJournal of Physics: Conference Series
dc.subjectPicard Iteration
dc.subjectSchrödinger Equations
dc.subjectAnalytical solutions.
dc.titleIterative Method for Approximate-Analytical Solutions of Linear Schrödinger Equation
dc.typeArticle

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Programme: Industrial Mathematics