TY - JOUR
AU - Dzhanmuldaev, B.D.
AU - Janmuldaeva, A.
AU - Jalbyrova, Zh.
AU - Smakhanova, A.K
AU - Madelkhanova, A.Z.
PY - 2023/12/29
Y2 - 2024/08/07
TI - Solution of one boundary value task of viscoelasticity in a nonlinear formulation, in the case of a cubic stress-strain relation
JF - International Journal of Mathematics and Physics
JA - Int. j. math. phys.
VL - 14
IS - 2
SE - MATHEMATICS
DO - 10.26577/ijmph.2023.v14.i2.02
UR - https://ijmph.kaznu.kz/index.php/kaznu/article/view/724
SP - 17-24
AB - <p>In this paper, the solution of a boundary value task in the nonlinear formulation is considered by the authors [1][2]. In spite of its proximity to linear theory, the nonlinear theory of viscoelasticity has not yet been fully developed. This issue is far from being fully completed, since the existing calculation methods do not yet provide a complete answer to the many different questions posed by practice. For this reason, in order to obtain a nonlinear law relating the strains <em>σ</em><em><sub>ij</sub></em><em> </em>and deformations <em>ε</em><em><sub>ij</sub></em> a number of conditions are formed:</p><ul><li>The specific work of deformation A must be a function of the entire deformation history from the beginning of deformation to the current time</li><li>The material of a viscoelastic body is homogeneous and</li><li>For very small deformations the nonlinear relation law between <em>σ</em><em><sub>ij</sub></em><em> </em>and <em>ε</em><em><sub>ij</sub></em><em> </em>in the limit should pass to relations in linear</li></ul><p> </p><p> </p>
ER -