Creep transition stresses in a spherical shell under internal pressure by using the lebesgue measure concept

• Autorzy: Pankaj T.
• Języki publikacji: EN

Abstrakty

EN

The problem of elastic-plastic transition stresses in a spherical shell under internal pressure by using the lebesgue measure temperature are solved by using the concept of generalized strain measure. The result are same as given by Hulsurkar.

Słowa kluczowe

EN

creep; spherical shell; pressure; lebesgue measure; transitional stress

PL

ściśliwość; powłoka kulista; ciśnienie; miara Lebesgue'a

• Wydawca: Oficyna Wydawnicza Uniwersytetu Zielonogórskiego
• Czasopismo: International Journal of Applied Mechanics and Engineering
• Rocznik: 2011
• Tom: Vol. 16, no 3
• Strony: 893--898
• Opis fizyczny: Bibliogr. 15 poz., wykr.

Twórcy

autor

Pankaj T.

• Applied Science, MIT College of Engineering and Management Bani Hamirpur, H.P., INDIA-174304,

Bibliografia

• Hulsurkar S. (1963): Transition theory of creep shells under uniform pressure. - ZAMM, vol.46, pp.345-348.
• Pankaj T. (2009): Elastic-plastic transition in a thin rotating disc having variable density with inclusion. - Structural Integrity and Life, vol.9, No.3, pp.171-179.
• Pankaj T. (2009): Elastic - plastic transition stresses in a transversely isotropic thick-walled cylinder subjected to internal pressure and steady state temperature. - Thermal Science, Published, No.4.
• Pankaj T. (2009): Elastic-plastic transition stresses in an isotropic disc having variable thickness subjected to internal pressure. - Structural Integrity and Life, vol.9, No.2, pp.125-132.
• Pankaj T. and Sharma G. (2008): Creep transition stresses in thick walled rotating cylinder by finitesimal deformation under steady state temperature. - International Journal of Mechanics and Solids, 2009.
• Pankaj T. and Gupta S.K. (2007): Creep transition in a thin rotating disc with rigid inclusion defence. - Sci. J., vol.57, pp.185-195.
• Pankaj T. and Gupta S.K. (2008): Creep transition in an isotropic disc having variable thickness subjected to internal pressure. - Proceeding National Academy of Science, vol.78, pp.57-66.
• Pankaj T. and Gupta S.K. (2007): Thermo elastic-plastic transition in a thin rotating disc with inclusion. - Thermal Science, vol.11, pp.103-118.
• Pankaj T. and Sonia R.B. (2008): Creep transition in a thin rotating disc having variable density with inclusion. - Intl. J. Math. Phys. Eng. Sci., vol.2, pp.140-149.
• Pankaj T. and Sonia R.B. (2008): Elastic-plastic transition in a thin rotating disc with inclusion. - Intl J. Mathematical, Physical and Engineering Sci., vol.2, pp.150-154.
• Seth B.R. (1972): Creep transition. - J. Math. Phys. Sci., vol.8.
• Seth B.R. (1963): Elastic-plastic transition in shells and tubes under pressure. - ZAMM, vol.43, pp.345.
• Seth B.R. (1966): Measure concept in mechanics. - Int. J. Non-Linear Mechanics, vol.1, pp.35-40.
• Seth B.R. (1970): Transition conditions, the yield conditions. - Int. J. Non-Linear Mechanics, vol.5, pp.279-285.
• Sokolnikoff I.S. (1954): Mathematical theory of elasticity, second edition. - New York: McGraw-Hill.