Inomzoda Abdunazar

Annotation:

This article examines the process of deriving boundary integral equations used to solve two-dimensional problems of elasticity theory. A distinctive feature of these equations is that the unknowns are the displacements or stresses on the contour of the object under study. After determining these parameters, the next step is to calculate the displacements and stresses within the domain. Consequently, using the boundary equation method reduces the problem dimension by one.

Keywords: unbounded space, differential equations, boundary equations, fundamental solution, delta function, surface stress.