Расчет полного тензора напряжений в тонких моноклинных композитных оболочках на основе метода асимптотической гомогенизации

Расчет полного тензора напряжений в тонких моноклинных композитных оболочках…

Инженерный журнал: наука и инновации

# 12·2016 23

Explicit formulas for the calculation of the complete tensor

of the stresses in the monoclinic thin composite shells

based on the asymptotic homogenization method

Bauman Moscow State Technical University, Moscow, 105005, Russia

The article presents the results of further development of the previously proposed by the

authors’ new asymptotic theory of thin multilayer anisotropic shells. The theory is con-

structed on the equations of the general three-dimensional theory of elasticity by intro-

ducing small geometric parameter asymptotic expansions without any hypotheses on

stresses and displacements distribution over the thickness. The case of monoclinic layers

having at the most 13 independent elastic constants is considered. An algorithm for ob-

taining explicit analytic formulas for the calculation of the complete stress tensor compo-

nent distribution over the shell is proposed. The algorithm is based on solving specific

local problems of the first, second and third approximations. It allows obtaining expres-

sions for all six components of the stress tensor in a compact closed form, as a function

of strain, curvature of the middle surface of the shell, as well as their derivatives with re-

spect to the longitudinal coordinates. These formulas allow calculating all stress tensor

components in the shell without additional tasks, using only the solutions of the averaged

problem of shell theory.

Keywords:

stress tensor, multilayer thin monoclinic shells, composites, the method of as-

ymptotic averaging, asymptotic theory of shells

REFERENCES

[1]

Dimitrienko Yu.I., Sborshchikov S.V., Prozorovskiy A.A., Gubareva E.A.,

Yakovlev N.O., Erasov V.S., Fedonyuk N.N., Krylov V.D., Grigoryev M.M.

Kompozity i nanostruktury — Composites and Nanostructures

, 2014, vol. 6,

no. 1, pp. 32–48.

[2]

Dimitrienko Yu.I.

Thermomechanics of Composites under High Temperatures

Dordrecht; Boston; London, Kluwer Academic Publ., 1999, 347 p. [In Russ.:

Mekhanika kompozitsionnykh materialov pri vysokikh temperaturakh. Mos-

cow, Mashinostroenie Publ., 1997, 366 p.].

[3]

Grigolyuk E.I., Kulikov G.M.

Mekhanika kompozitsionnykh materialov — Me-

chanics of Composite Materials

, 1989, vol. 24, no. 4, pp. 698–704.

[4]

Gruttmann F., Wagner W.

Computational Mechanics

, 2001, vol. 27, p. 199–207

[5]

Ghugal Y.M., Shmipi R.P.

Journal of Reinforced Plastics and Composites

2001, vol. 20, no. 3, pp. 255–272.

[6]

Tornabene F.

Computer Methods in Applied Mechanics and Engineering,

2011, vol. 200, issues 9–12, pp. 931–952.

[7]

Gondlyakh A.V.

Vostochno-evropeyskiy zhurnal peredovykh tekhnologiy —

Eastern European Advanced Technology Magazine

, 2012, vol. 3/7 (57),

pp. 62–68.

[8]

Zveryaev E.M., Makarov G.I.

Prikladnaya matematika i mekhanika — Journal

of Applied Mathematics and Mechanics

, 2008, vol. 72, no. 2, pp. 308–321.

[9]

Zveryaev E.M.

Prikladnaya matematika i mekhanika — Journal of Applied

Mathematics and Mechanics

, 2003, vol. 67, no. 3, pp. 472– 483.

[10]

Kohn R.V., Vogelius M.

International Journal of Solids and Structure

, 1984,

vol. 20 (4), рp. 333–350.