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The vibration and stability of non-homogeneous orthotropic conical shells with clamped edges subjected to uniform external pressures

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dc.contributor.authorSofiyev, A. Heydaroglu
dc.contributor.authorKuruoǧlu, Nuri
dc.contributor.authorHalilov, Huseyin M.
dc.contributor.institutionSofiyev, A. Heydaroglu, Department of Civil Engineering, Süleyman Demirel Üniversitesi, Isparta, Turkey, Department of Mathematics and Computer Science, Bahçeşehir Üniversitesi, Istanbul, Turkey, Department of Mathematics, Recep Tayyip Erdogan University, Rize, Turkey
dc.contributor.institutionKuruoǧlu, Nuri, Department of Civil Engineering, Süleyman Demirel Üniversitesi, Isparta, Turkey, Department of Mathematics and Computer Science, Bahçeşehir Üniversitesi, Istanbul, Turkey, Department of Mathematics, Recep Tayyip Erdogan University, Rize, Turkey
dc.contributor.institutionHalilov, Huseyin M., Department of Civil Engineering, Süleyman Demirel Üniversitesi, Isparta, Turkey, Department of Mathematics and Computer Science, Bahçeşehir Üniversitesi, Istanbul, Turkey, Department of Mathematics, Recep Tayyip Erdogan University, Rize, Turkey
dc.date.accessioned2025-10-05T16:47:02Z
dc.date.issued2010
dc.description.abstractIn this paper an analytical procedure is given to study the free vibration and stability characteristics of homogeneous and non-homogeneous orthotropic truncated and complete conical shells with clamped edges under uniform external pressures. The non-homogeneous orthotropic material properties of conical shells vary continuously in the thickness direction. The governing equations according to the Donnell's theory are solved by Galerkin's method and critical hydrostatic and lateral pressures and fundamental natural frequencies have been found analytically. The appropriate formulas for homogeneous orthotropic and isotropic conical shells and for cylindrical shells made of homogeneous and non-homogeneous, orthotropic and isotropic materials are found as a special case. Several examples are presented to show the accuracy and efficiency of the formulation. The closed-form solutions are verified by accurate different solutions. Finally, the influences of the non-homogeneity, orthotropy and the variations of conical shells characteristics on the critical lateral and hydrostatic pressures and natural frequencies are investigated, when Young's moduli and density vary together and separately. The results obtained for homogeneous cases are compared with their counterparts in the literature. © 2009 Elsevier Inc. © 2012 Elsevier B.V., All rights reserved.
dc.identifier.doi10.1016/j.apm.2009.09.025
dc.identifier.endpage1822
dc.identifier.issn0307904X
dc.identifier.issue7
dc.identifier.scopus2-s2.0-79251603492
dc.identifier.startpage1807
dc.identifier.urihttps://doi.org/10.1016/j.apm.2009.09.025
dc.identifier.urihttps://hdl.handle.net/20.500.14719/13697
dc.identifier.volume34
dc.language.isoen
dc.relation.sourceApplied Mathematical Modelling
dc.subject.authorkeywordsClamped Edges
dc.subject.authorkeywordsConical Shells
dc.subject.authorkeywordsEigenvalue Problem
dc.subject.authorkeywordsNon-homogeneous Orthotropic Materials
dc.subject.authorkeywordsStability
dc.subject.authorkeywordsVibration
dc.subject.authorkeywordsClamped Edge
dc.subject.authorkeywordsConical Shell
dc.subject.authorkeywordsEigenvalue Problem
dc.subject.authorkeywordsNon-homogeneous Orthotropic Materials
dc.subject.authorkeywordsVibration
dc.subject.authorkeywordsConvergence Of Numerical Methods
dc.subject.authorkeywordsEigenvalues And Eigenfunctions
dc.subject.authorkeywordsGalerkin Methods
dc.subject.authorkeywordsHydrostatic Pressure
dc.subject.authorkeywordsNatural Frequencies
dc.subject.authorkeywordsShells (structures)
dc.subject.indexkeywordsClamped edge
dc.subject.indexkeywordsConical shell
dc.subject.indexkeywordsEigenvalue problem
dc.subject.indexkeywordsNon-homogeneous orthotropic materials
dc.subject.indexkeywordsVibration
dc.subject.indexkeywordsConvergence of numerical methods
dc.subject.indexkeywordsEigenvalues and eigenfunctions
dc.subject.indexkeywordsGalerkin methods
dc.subject.indexkeywordsHydrostatic pressure
dc.subject.indexkeywordsNatural frequencies
dc.subject.indexkeywordsShells (structures)
dc.titleThe vibration and stability of non-homogeneous orthotropic conical shells with clamped edges subjected to uniform external pressures
dc.typeArticle
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dspace.entity.typePublication
local.indexed.atScopus
person.identifier.scopus-author-id6603803044
person.identifier.scopus-author-id8332721100
person.identifier.scopus-author-id35092442700

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