About one generalized approach to the problem of assessing the durability of underground structures, parallel adits

Authors

  • Telyatnikov I.S. Southern Scientific Center of Russian Academy of Science, Rostov-on-Don, Russian Federation

UDC

539.3

DOI:

https://doi.org/10.31429/vestnik-16-4-6-12

Abstract

The work is devoted to studying the characteristics of the stress-strain state of underground structures with multiple partitions, for example, thin deposits exposed by a system of parallel horizontal adits.

The structure is modeled by a system of Kirchhoff plates located between a linearly elastic layer located on top and a deformable foundation on the bottom. The latter can be modeled both by the elastic layer and by the Winkler foundation. We consider a method for studying boundary value problems for two deformable layers separated by a plate that has a finite number of strip cavities, based on the application of the block element method using the integral factorization method. The described approach allows us to reduce the boundary-value problem to a system of integral equations.

In the work we propose a method of approximate factorization of matrix functions with two complex variables, including polynomial ones, in respect to one of the variables with fixed real values of the other. This method can be used to solve the systems of integral equations to which the problems under consideration are reduced, thus finding contact stresses on supports and sagging of adit roofs.

Keywords:

deformable layers, Kirchhoff plates, block element method, system of integral equations, approximate matrix factorization

Acknowledgement

Отдельные фрагменты работы выполнены в рамках ГЗ ЮНЦ РАН, проект № 01201354241 и при частичной поддержке РФФИ (проекты 18-05-80008, 18-01-00124).

Author Info

Ilya S. Telyatnikov

канд. физ.-мат. наук, научный сотрудник лаборатории математики и механики Южного научного центра РАН

e-mail: ilux_t@list.ru

References

  1. Babeshko, V.A., Evdokimova, O.V., Babeshko, O.M. K teorii vliyaniya global'nogo faktora na prochnost' sovokupnosti parallel'nykh soedineniy sloev [On the theory of the influence of the global factor on the strength of a set of parallel connections of layers]. Vychislitel'naya mekhanika sploshnykh sred [Computational mechanics of continuous media], 2016, vol. 9, no. 4, pp. 412–419. (In Russian)
  2. Babeshko, V.A., Evdokimova, O.V., Babeshko, O.M., Pavlova, A.B., Telatnikov, I.S., Fedorenko, A.G. The theory of block structures in problems on the strength of galleries and constructions with multiple connections. Doklady Physics, 2019, vol. 64, no. 1, pp. 4–8.
  3. Babeshko, V.A., Babeshko, O.M., Evdokimova, O.V., Zaretskaya, M.V., Pavlova, A.V., Uafa, S.B., Shestopalov, V.L. O monitoringe sostoyaniya parallel'nykh shtolen v zone gorizontal'nogo dvizheniya litosfernykh plit [On monitoring the state of parallel adits in the zone of horizontal movement of lithospheric plates]. Mekhanika tverdogo tela [Solid Mechanics], 2017, no. 4, pp. 42–49. (In Russian)
  4. Babeshko, V.A., Evdokimova, O.V., Babeshko, O.M., Gorshkova, E.M., Gladskoi, I.B., Grishenko, D.V., Telyatnikov, I.S. Block element method for body, localizations and resonances. Ekologicheskiy vestnik nauchnykh tsentrov Chernomorskogo ekonomicheskogo sotrudnichestva [Ecological Bulletin of Scientific Centers of the Black Sea Economic Cooperation], 2014, no. 2, pp. 13–19.
  5. Vorovich, I.I. Dinamicheskie smeshannye zadachi teorii uprugosti dlya neklassicheskikh oblastey [Dynamic mixed problems of elasticity theory for non-classical domains]. Nauka, Moscow, 1979. (In Russian)
  6. Babeshko, V.A. Obobshchennyy metod faktorizatsii v prostranstvennykh dinamicheskikh smeshannykh zadachakh teorii uprugosti [Generalized factorization method in spatial dynamic mixed problems of elasticity theory]. Nauka, Moscow, 1984. (In Russian)
  7. Babeshko, V.A., Babeshko, O.M. Formuly faktorizatsii nekotorykh meromorfnykh matrits-funktsiy [Factorization formulas for some meromorphic matrix functions]. Doklady Akademii nauk [Rep. of the Academy of Sciences], 2004, vol. 399, no. 1, pp. 163–167. (In Russian)
  8. Vol'mir A.S. Gibkie plastinki i obolochki [Flexible plates and shells]. Gosudarstvennoe izdatel'stvo tekhniko-teoreticheskoy literatury, Moscow, 1956. (In Russian)
  9. Gol'denveyzer A.L. Teoriya uprugikh tonkikh obolochek [Theory of elastic thin shells]. Nauka, Moscow, 1976. (In Russian)

Issue

Section

Mathematics

Pages

6-12

Submitted

2019-12-06

Published

2019-12-11

How to Cite

Telyatnikov I.S. About one generalized approach to the problem of assessing the durability of underground structures, parallel adits. Ecological Bulletin of Research Centers of the Black Sea Economic Cooperation, 2019, vol. 16, no. 4, pp. 6-12. DOI: https://doi.org/10.31429/vestnik-16-4-6-12 (In Russian)