Plane Problem for a Composite Plane With Mixed Conditions

Plane Problem for a Composite Plane With Mixed Conditions

Authors

  • Levon Harutyunyan Institute of Mechanics of NAS RA
  • Vahe Zakaryan Institute of Mechanics of NAS RA
  • Angin Martirosyan Nationаl University of Architecture and Construction of Armenia

DOI:

https://doi.org/10.54338/18294200-2024.3-06

Keywords:

composite body, crack, bipolar coordinates, Papkovich-Neuber functions, Fourier transformation

Abstract

The two – dimensional problem of the theory of elasticity for compound plane consisting of two half-plane is considered with different elastic characteristic and existing between them finite cracks or semi-infinite cracks. Due to Fourier integral in bipolar system of coordinates the problem are solved closed with the help of Papkovich-Neuber function.

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Author Biographies

Levon Harutyunyan, Institute of Mechanics of NAS RA

doctor of philosophy (Ph.D) in Physics (RA, Yerevan) - Institute of Mechanics of NAS RA

Vahe Zakaryan, Institute of Mechanics of NAS RA

doctor of philosophy (Ph.D) in Physics  (RA, Yerevan) - Institute of Mechanics of  NAS RA, researcher

Angin Martirosyan, Nationаl University of Architecture and Construction of Armenia

doctor of philosoph (Ph.D) in Engineering, Associate Professor (RA, Yerevan) - NUACA, Department of Mathematics, Structural Mechanics and Physics

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Published

2024-12-27

How to Cite

Harutyunyan, L., Zakaryan, V., & Martirosyan, A. (2024). Plane Problem for a Composite Plane With Mixed Conditions. Scientific Papers of National University of Architecture and Construction of Armenia, 90(3), 50–59. https://doi.org/10.54338/18294200-2024.3-06

Issue

Vol. 90

Section

Articles

License

Copyright (c) 2024 Левон Арутюнян, Ваге Закарян, Ангин Мартиросян

Creative Commons License

This work is licensed under a Creative Commons Attribution-NonCommercial 4.0 International License.