Advanced search
Publication Cover
Materials Research Innovations Volume 19, 2015 - Issue sup5: Global Conference on Materials Science and Engineering (CMSE 2014)
Submit an article Journal homepage
83
Views
3
CrossRef citations to date
0
Altmetric
Research Papers

Research on burst pressure for thin-walled elbow and spherical shell made of strength differential materials

L. YanSchool of Civil EngineeringChang’ an University;, Xi'an, Shaanxi710061, ChinaCorrespondence[email protected]
,
Z. JunhaiSchool of Civil EngineeringChang’ an University;, Xi'an, Shaanxi710061, China
,
X. ErgangSchool of Civil EngineeringChang’ an University;, Xi'an, Shaanxi710061, China
&
C. XueyeSchool of Civil EngineeringChang’ an University;, Xi'an, Shaanxi710061, China
Pages S5-80-S5-87 | Received 20 Oct 2014, Accepted 12 Dec 2014, Published online: 30 May 2015

References

  • X. K. Zhu and B. N. Leis: ‘Evaluation of burst pressure prediction models for line pipes’, Int. J. Press. Vessels Pip., 2012, 89, 85–97.
  • X. K. Zhu and B. N. Leis: ‘Average shear stress yield criterion and its application to plastic collapse analysis of pipelines’, Int. J. Press. Vessels Pip., 2006, 83, (9), 663–671.
  • X. K. Zhu and B. N. Leis: ‘Strength criteria and analytic prediction of failure pressures in line pipes’, Int. Soc. Offshore Polar Eng., 2004, 14, (2), 125–131.
  • A. Kalnins and D. P. Updike: ‘Limit pressures of cylindrical and spherical shells’, J. Press. Vessel Technol. ASME, 2001, 123, (3), 288–292.
  • G. Stewart and F. J. Klever: ‘Analytical model to predict the burst capacity of pipelines’, Proc. 13th Int. Conf. on ‘Offshore Mechanics and Arctic Engineering’, Houston, USA, 1994, 177–178.
  • N. L. Svensson: ‘Bursting pressure of cylindrical and spherical pressure vessels’, Trans. ASME J. Appl. Mech., 1958, 80, (3), 89–96.
  • W. E. Cooper: ‘The significance of the tensile test to pressure vessel design’, Weld. J. Res. Suppl., 1957, 1, 49–56.
  • T. A. Brabin, T. Christopher and B. N. Rao: ‘Bursting pressure of mild steel cylindrical vessels’, Int. J. Press. Vessels Pip., 2011, 88, (2–3), 119–122.
  • C. M. Li, D. W. Zhao, S. H. Zhang, and P. Zhou: ‘Analysis of burst pressure for X80 steel pipeline with MY criterion’, J. Northeastern Univ. Nat. Sci., 2011, 32, (7), 964–967.
  • S. H. Zhang, C. R. Gao, D. W. Zhao, and G. D. Wang: ‘Limit analysis of defect-free pipe elbow under internal pressure with mean yield criterion’, J. Iron Steel Res. Int., 2013, 20, (4), 11–15.
  • S. H. Zhang, D. W. Zhao, and C. R. Gao: ‘Analysis of plastic collapse load of defect-free pipe elbow with GM criterion’, J. Northeastern Univ. Nat. Sci., 2011, 32, (11), 1570–1573.
  • D. W. Zhao, L. Zhang, S. H. Zhang, and X. L. Li: ‘Limit load of thin-walled cylinder and spherical shell with GM yield criterion’, J. Northeastern Univ. Nat. Sci., 2012, 33, (4), 521–523; 532.
  • X. H. Zhu, M. Pang, and Y. Q. Zhang: ‘Estimation of burst pressure of pipeline using twin-shear stress yield criterion’, Chin. J. Appl. Mech., 2011, 28, (2), 135–138.
  • R. Chaix: ‘Factors influencing the strength differential of high-strength steels’, Metall. Trans., 1972, 3, (2), 365–371.
  • D. C. Drucker: ‘Plasticity theory, strength-differential (SD) phenomenon, and volume expansion in metals and plastics’, Metall. Trans., 1973, 4, (3), 667–673.
  • G. C. Rauch and W. C. Leslie: ‘The extent and nature of the strength-differential effect in steels’, Metall. Trans., 1972, 3, (2), 377–389.
  • M. H. Yu: ‘Unified strength theory and its applications’, 2004, Berlin, Springer.
  • J. H. Zhao, Y. Li, W. B. Liang, and Q. Zhu: ‘Unified solution to ultimate bearing capacity of dumbbell shaped concrete-filled steel tube arch rib with initial stress’, China J. Highw. Transp., 2012, 25, (5), 58–66.
  • Y. Li, J. H. Zhao, W. B. Liang, and S. Wang: ‘Unified solution of bearing capacity for concrete-filled steel tube column with initial stress under axial compression’, J. Civ. Archit. Environ. Eng., 2013, 35, (3), 63–69.
  • J. H. Zhao, W. B. Liang, C. G. Zhang, and Y. Li: ‘Unified solution of Coulomb's active earth pressure for unsaturated soils’, Rock Soil Mech., 2013, 34, (3), 609–614.
  • C. G. Zhang, J. H. Zhao, Q. H. Zhang, and X. D. Hu: ‘A new closed-form solution for circular openings modeled by the unified strength theory and radius-dependent Yong's modulus’, Comput. Geotech., 2012, 42, 118–128.
  • C. G. Zhang, J. F. Wang, and J. H. Zhao: ‘Unified solutions for stresses and displacements around circular tunnels using the unified strength theory’, Sci. China Technol. Sci., 2010, 53, (6), 1694–1699.
  • J. H. Zhao, Y. Li, C. G. Zhang, J. F. Xu, and P. Wu: ‘Collapsing strength for petroleum casing string based on unified strength theory’, Acta Petrolei Sinica, 2013, 34, (5), 969–976.
  • H. F. Qiang, D. Z. Cao, and Y. Zhang: ‘Modified M-criterion based on unified strength theory and its application to grain crack prediction’, J. Solid Rocket Technol., 2008, 31, (4), 340–343.
  • J. H. Zhao, Y. Q. Zhang, H. J. Liao, and Z. N. Yin: ‘Unified limit solutions of thick wall cylinder and thick wall spherical shell with unified strength theory’, Chin. J. Appl. Mech., 2000, 17, (1), 157–161.
  • C. W. Jin, L. Z. Wang, and Y. Q. Zhang: ‘Strength differential effect and influence of strength criterion on burst pressure of thin-walled pipelines’, Appl. Math. Mech. (Engl. Ed.), 2012, 33, (11), 1361–1370.
  • L. Z. Wang and Y. Q. Zhang: ‘Plastic collapse analysis of thin-walled pipes based on unified yield criterion’, Int. J. Mech. Sci., 2011, 53, (5), 348–354.
  • Z. X. Duan and S. M. Shen: ‘Analysis and experiments on the plastic limit load of elbows under internal pressure’, Press. Vessel Technol., 2004, 121, (8), 1–4.
  • M. H. Yu: ‘Twin shear stress yield criterion’, Int. J. Mech. Sci., 1983, 25, (1), 71–74.
  • S. C. Fan, M. H. Yu, and S. Y. Yang: ‘On the unification of yield criteria’, Trans. ASME J. Appl. Mech., 2002, 68, (2), 341–343.
  • X. K. Zhu and B. N. Leis: ‘Influence of yield-to-tensile strength ratio on failure assessment of corroded pipelines’, J. Press. Vessel Technol. ASME, 2005, 127, (4), 436–442.
  • R. Hill: ‘The mathematical theory of plasticity’, 1950, Oxford, Oxford University Press.
  • T. A. Duffey: ‘Plastic instabilities in spherical vessels for static and dynamic loading’, J. Press. Vessel Technol. ASME, 2011, 133, (5), 1–6.

Reprints and Corporate Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

To request a reprint or corporate permissions for this article, please click on the relevant link below:

Order Reprints Request Corporate Permissions

Academic Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

Obtain permissions instantly via Rightslink by clicking on the button below:

Request Academic Permissions

If you are unable to obtain permissions via Rightslink, please complete and submit this Permissions form. For more information, please visit our Permissions help page.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.