This article is cited in 6 papers

Equilibrium problem for a Timoshenko plate with a geometrically nonlinear condition of nonpenetration for a vertical crack

N. P. Lazarev, G. M. Semenova

North-Eastern Federal University, ul. Kulakovskogo 48, Yakutsk 677000, Russia

Abstract: Under consideration are the variational problems concerning the equilibrium of plates containing a crack. Two new mathematical models are proposed in which the nonpenetration conditions define the corresponding nonconvex sets of admissible functions. The first model describes the equilibrium of a Timoshenko plate with a crack, and the second corresponds to a composite plate containing a crack along a Kirchhoff—Love elastic inclusion. The proposed approach is substantiated by an explicit example. We prove the existence of solutions for the corresponding variational problems and show that the equilibrium equations are satisfied for each of the problems.

Keywords: variational problem, plate, crack, nonlinear boundary condition. .

UDC: 539.311

Received: 09.04.2020
Revised: 05.06.2020
Accepted: 16.07.2020

DOI: 10.33048/SIBJIM.2020.23.306

 English version: Journal of Applied and Industrial Mathematics, 2020, 14:3, 532–540

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