TY - GEN

T1 - Integral Equations for the Mixed Boundary Value Problem of a Notched Elastic Half-Plane

AU - Savelyeva, M.Y.

AU - Pronina, Y.G.

PY - 2015

Y1 - 2015

N2 - In the paper, boundary integral equations are derived for the problem of an isotropic homogeneous elastic half-plane with a cavity of an arbitrary configuration. The initially straight-line boundary is assumed to be fixed under a given displacement while the cut surface is subjected to a certain load. A concentrated force is also applied at an inner point of the half-plane. Using the complex variable representation and the method of superposition, the problem is reduced to Fredholm integral equations of the first kind for the boundary of the notch.

AB - In the paper, boundary integral equations are derived for the problem of an isotropic homogeneous elastic half-plane with a cavity of an arbitrary configuration. The initially straight-line boundary is assumed to be fixed under a given displacement while the cut surface is subjected to a certain load. A concentrated force is also applied at an inner point of the half-plane. Using the complex variable representation and the method of superposition, the problem is reduced to Fredholm integral equations of the first kind for the boundary of the notch.

KW - SURFACE

KW - GROWTH

U2 - 10.1109/SCP.2015.7342164

DO - 10.1109/SCP.2015.7342164

M3 - статья в сборнике материалов конференции

SN - 9781467376983

SP - 432

EP - 435

BT - 2015 INTERNATIONAL CONFERENCE "STABILITY AND CONTROL PROCESSES" IN MEMORY OF V.I. ZUBOV (SCP)

A2 - Petrosyan, LA

A2 - Zhabko, AP

PB - IEEE Canada

Y2 - 5 October 2015 through 9 October 2015

ER -