A Circular Inclusion and Two Radial Coaxial Cracks with Contacting Faces in a Piecewise Homogeneous Isotropic Plate Under Bending

Heorgij Sulym; Viktor Opanasovych; Ivan Zvizlo; Roman Seliverstov; Oksana Bilash

doi:10.2478/ama-2020-0003

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A Circular Inclusion and Two Radial Coaxial Cracks with Contacting Faces in a Piecewise Homogeneous Isotropic Plate Under Bending

Acta Mechanica et Automatica

Volume 14 (2020): Issue 1 (March 2020)

By: Heorgij Sulym, Viktor Opanasovych, Ivan Zvizlo, Roman Seliverstov and Oksana Bilash

Open Access

|Apr 2020

Abstract

The bending problem of an infinite, piecewise homogeneous, isotropic plate with circular interfacial zone and two coaxial radial cracks is solved on the assumption of crack closure along a line on the plate surface. Using the theory of functions of a complex variable, complex potentials and a superposition of plane problem of the elasticity theory and plate bending problem, the solution is obtained in the form of a system of singular integral equations, which is numerically solved after reducing to a system of linear algebraic equations by the mechanical quadrature method. Numerical results are presented for the forces and moments intensity factors, contact forces between crack faces and critical load for various geometrical and mechanical task parameters.

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Articles in this issue

DOI: https://doi.org/10.2478/ama-2020-0003 | Journal eISSN: 2300-5319 | Journal ISSN: 1898-4088

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Language: English

Page range: 16 - 21

Submitted on: Dec 5, 2019

Accepted on: Mar 23, 2020

Published on: Apr 30, 2020

Published by: Bialystok University of Technology

In partnership with: Paradigm Publishing Services

Publication frequency: 4 issues per year

Keywords:

Bending,

plate,

moment intensity factors,

limit load

Related subjects:

Engineering,

Electrical engineering,

Electronics,

Mechanical engineering,

Mechanics,

Bioengineering and biomedical engineering,

Biomechanics,

Civil engineering,

Environmental engineering

© 2020 Heorgij Sulym, Viktor Opanasovych, Ivan Zvizlo, Roman Seliverstov, Oksana Bilash, published by Bialystok University of Technology
This work is licensed under the Creative Commons Attribution-NonCommercial-NoDerivatives 3.0 License.

Volume 14 (2020): Issue 1 (March 2020)