IN-PLANE INVERSE PROBLEM ON CRACK IDENTIFICATION IN THE ELASTIC HALF-SPACE

Abstract

In this work we study a homogeneous and isotropic elastic half-space in the context of in-plane deformation. The aim of the paper is to propose a powerful mathematical tool to solve the inverse problem, which is connected to crack reconstruction inside the half-space. In particular, position and sizes of the linear crack, parallel to its boundary surface, are determined. The formulation of the considered inverse problem is based on a system of integral equations of the first kind.

Authors and Affiliations

Michele Ciarletta, Gerardo Iovane, Mezhlum Sumbatyan

Keywords

Related Articles

STABILITY OF A BEAM WITH PERIODIC SUPPORTS

In terms of the Floquet theory the stability problem is considered for a compressed inhomogeneous beam with periodic supports . The special case of homogeneous beam with periodic supports of the uniform span is studied,...

The surface electroelastic Love’s waves in a layered system with a piezoelectric substructure and soft dielectric isotropic layer (The investigation of the characteristic equation–Part II)

In the article is investigated the existence and the behaviour Love’s surface electroelastic waves in a layered system with a piezoelectric substructure if the class 6,4, 6mm, 4mm, 622, 422 and a soft dielectric isotropi...

Download PDF file
  • EP ID EP601191
  • DOI -
  • Views 112
  • Downloads 0

How To Cite

Michele Ciarletta, Gerardo Iovane, Mezhlum Sumbatyan (2013). IN-PLANE INVERSE PROBLEM ON CRACK IDENTIFICATION IN THE ELASTIC HALF-SPACE. Հայաստանի գիտությունների ազգային ակադեմիայի տեղեկագիր․ Մեխանիկա, 66(1), -. https://europub.co.uk/articles/-A-601191