Abstract
The incorrect deduction of equations in the research works devoted to the studies of transient stress in cylindrically orthotropic tubes and done by Kardomateas (Journal of Applied Mechanics,1989, 1990) leads to the wrong results. The errata (1991) correct the deduction error, but do not give the right numerical results. All errors are corrected, and the Mathematica is adopted to solve the large argument problem for Bassel function. A theoretical solution of the transient thermal stresses in tubes with uniform form is presented, and a numerical example is studied.
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References
Lekhnitskii S G.Theory of Elasticity of an Anisotropic Elastic Body[M]. Moscow: Mir Publishers, 1981.
Sherrer R E. Filament wound cylinder with axial symmetric loads[J].Journal of Composite Material, 1967,1(3):344–355.
Pagano N J. The stress field in a cylindrically anisotropic body under two-dimensional surface traction[J].ASME Journal of Applied Mechanics, 1972,39(6):791–796.
Kalam M A, Tauchert T R. Stresses in an orthotropic elastic cylinder due to a plane temperature distributionT(r,ϑ)[J].Journal of Thermal Stresses, 19781(1):13–24.
Hyer M W, Cooper D E. Stresses and deformations in composite tubes due to a circumferential temperature gradient[J].ASME Journal of Applied Mechanics, 1986,53(6):757–764.
Kardomateas G A. Transient thermal stress in cylindrically orthotropic composite tubes[J].ASME Journal of Applied Mechanics, 1989,56(4):411–417. See also: Errata[J].Ibid, 1989,58: 909)
Kardomateas G A. The initial phase of transient thermal stresses due to genral boundary thermal loads in orthotropic hollow cylinders[J].ASME Journal of Applied Mechanics, 1990,57(6):719–724.
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Communicated by DING Hao-jiang
Foundation item: the National Natural Science Foundation of China (10172075)
Biography: LING Dao-sheng (1968 ≈)
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Dao-sheng, L. Analysis of transient thermal stress in cylindrically orthotropic tubes. Appl Math Mech 24, 1398–1402 (2003). https://doi.org/10.1007/BF02435580
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DOI: https://doi.org/10.1007/BF02435580