Optimization Problems Arising from the Design of Pipes Made of Composite Materials

T. Bobyleva; A. Shamaev

doi:10.4028/www.scientific.net/MSF.992.1024

Paper Titles

The Use of X-Ray Diffraction Peaks Profile Analysis to Define the Structural Condition of Elastically Stressed 09G2S Steel
p.981

Strain-Energy Criteria for the Destruction of Ideal Rigid-Plastic Bodies
p.987

Changes in the Characteristics of the Profiles of X-Ray Diffraction Lines of Structural Steels in the Elastic Stress Field
p.992

Theoretical Preconditions for Determination of the Elastic Modulus of Clt-Panels
p.998

Evaluation Methods of Cohesive Strength of Coatings
p.1006

Investigation of Thermal Fields at Phase Boundaries in Powder Mixtures that are Subject to Melting and Chemical Transformation
p.1011

A New Method for Studying the Anisotropy of HDPE Sleeved Films
p.1016

Optimization Problems Arising from the Design of Pipes Made of Composite Materials
p.1024

Failure Analysis of Polymer Blinder Using Acoustic Emission Method
p.1030

HomeMaterials Science ForumMaterials Science Forum Vol. 992Optimization Problems Arising from the Design of...

Optimization Problems Arising from the Design of Pipes Made of Composite Materials

Abstract:

The work is devoted to the construction of analytical solutions for the stress-strain state of a cylindrical hollow elastic rod with a layered structure along the radius. Earlier, the problem of finding the stress-strain state of a rod of composite material fixed at one end with the applied forces and moments of forces at the other end was considered. An approximate representation of the solutions was given, which included auxiliary problems on one fragment of the cylinder, consisting of periodically repeating similar fragments. Such auxiliary problems in the general case do not have an analytical solution. In this paper it is shown that in the presence of radial symmetry of the rod section, it is possible to construct a stress-strain state in an analytical form. In addition, tensile and bending stiffness can be presented in an analytical form. The latter circumstance allows us to set a problem of optimizing the stiffness characteristics of a rod with its fixed weight. Optimization is carried out by varying the thickness of the layers of the same materials.

You might also be interested in these eBooks

FarEastCon - Materials and Construction II

View Preview

Info:

Periodical:

Materials Science Forum (Volume 992)

Pages:

1024-1029

DOI:

https://doi.org/10.4028/www.scientific.net/MSF.992.1024

Citation:

Cite this paper

Online since:

May 2020

Authors:

T. Bobyleva*, A. Shamaev

Keywords:

Averaging, Composite Material, Heterogeneous Periodic Structure, Homogenization, Thin Rod

Export:

RIS, BibTeX

Price:

Permissions CCC:

Request Permissions

Permissions PLS:

Request Permissions

Сopyright:

Citation:

* - Corresponding Author

References

[1] G.P. Panasenko, Asymptotic analysis of bar systems (I), Russian J. Math. Phys. 2(3) (1994) 325-352.

Google Scholar

[2] G.P. Panasenko, Asymptotic analysis of bar systems (II), Russian J. Math. Phys. 4(1) (1996) 87-116.

Google Scholar

[3] O.A. Oleynik, G.A. Iosif'yan and A.S. Shamaev, Mathematical problems in elasticity and homogenization, Elsevier, North-Holland, (1992).

Google Scholar

[4] B.E. Pobedrya, Mechanics of composite materials, MSU, Moscow, (1984).

Google Scholar

[5] M.V. Kozlova, G.P. Panasenko, Averaging a three-dimensional problem of elasticity theory in a nonhomogeneous rod, Comput. Math. Phys. 31(10) (1992) 128–131.

Google Scholar

[6] T.N. Bobyleva, A.S. Shamaev, An efficient algorithm for calculating rheological parameters of layered soil media composed from elastic-creeping materials, Soil Mechanics and Foundation Engineering, 54 (4) (2017) 224-230.

DOI: 10.1007/s11204-017-9462-4

Google Scholar

[7] T.N. Bobyleva, A.S. Shamaev, Method of approximate calculation of the stress tensor in layered elastic-creeping environments, IFAC-PapersOnLine 51 (2) (2018) 138 -143.

DOI: 10.1016/j.ifacol.2018.03.024

Google Scholar

[8] T.N. Bobyleva, A.S. Shamaev, Effective characteristics of a layered tube consisting of elastic-creeping materials, MATEC Web of Conf. 251 (2018) 04039.

DOI: 10.1051/matecconf/201825104039

Google Scholar

[9] D. Lukkassen, A. Meidell, A.L. Piatnitski and A.S. Shamaev, Twisting a thin periodically perforated elastic rod, Applicable Analysis 88 (10) (2009) 1563-1577.

DOI: 10.1080/00036810903042216

Google Scholar

[10] D. Lukkassen, A. Meidell, A.L. Piatnitski and A.S. Shamaev, Symmetry-relations for elastically deformed periodic rod-structures, Math. Models and Methods in Appl. Sci. 19 (4) (2009) 501–525.

DOI: 10.1142/s0218202509003528

Google Scholar