Abstract
International Journal of Computational Engineering ScienceVol. 03, No. 04, pp. 339-353 (2002) No AccessA BEM FORMULATION FOR TRANSIENT AXISYMMETRIC THERMOELASTIC ANALYSIS USING PARTICULAR INTEGRALSD. P. HENRY, Jr., K. H. PARK, and P. K. BANERJEED. P. HENRY, Jr.Department of Civil Engineering, State University of New York at Buffalo, NY 14260, USA Search for more papers by this author , K. H. PARKSchool of Civil Engineering, Asian Institute of Technology, Pathumthani 12120, Thailand Search for more papers by this author , and P. K. BANERJEEDepartment of Civil Engineering, State University of New York at Buffalo, NY 14260, USA Search for more papers by this author https://doi.org/10.1142/S1465876302000678Cited by:3 Next AboutSectionsPDF/EPUB ToolsAdd to favoritesDownload CitationsTrack CitationsRecommend to Library ShareShare onFacebookTwitterLinked InRedditEmail AbstractA particular integral formulation is presented for the first time in a purely axisymmetric transient uncoupled thermoelastic analysis. The governing axisymmetric elastostatic equation is used as the complementary solution and the particular integrals for displacements and tractions are derived by integrating the three-dimensional formulation along the circumferential direction leading to elliptic integrals. The numerical results for three example problems are given and compared with their analytical solutions. Generally, the agreement among all of those results is satisfactory, if a few interior points are used to include the known values of temperature.Keywords:Boundary Element method (BEM)Particular IntegralsComplementary SolutionThermoelasticity FiguresReferencesRelatedDetailsCited By 3A cell-less BEM formulation for axisymmetric elastoplasticity via particular integralsAdisorn Owatsiriwong, Bupavech Phansri, Jung-Sik Kong and Kyung-Ho Park3 February 2009 | Computational Mechanics, Vol. 44, No. 2A new BEM formulation for transient axisymmetric poroelasticity via particular integralsK.H. Park and P.K. Banerjee1 Nov 2007 | International Journal of Solids and Structures, Vol. 44, No. 22-23A BEM formulation for inhomogeneous potential problems by particular integralsK.H Park1 Apr 2003 | Applied Mathematical Modelling, Vol. 27, No. 4 Recommended Vol. 03, No. 04 Metrics History KeywordsBoundary Element method (BEM)Particular IntegralsComplementary SolutionThermoelasticityPDF download
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