<p>In this paper, we propose a numerical-analytical method for solving linear viscoelasticity problems of an anisotropic solid without the need for explicit analytical representations of creep and relaxation kernels. We base the approximate solution of integral equations on the direct use of experimental data, previously smoothed and filled with a finer mesh. Thus, we reduce boundary-value problems of viscoelasticity to elasticity problems at an arbitrary point in time.</p>

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MODELLING OF THE STUDY OF VISCOELASTIC DEFORMATION OF ELASTIC BODIES

  • R. N. Neskorodev,
  • A. V. Zyza

摘要

In this paper, we propose a numerical-analytical method for solving linear viscoelasticity problems of an anisotropic solid without the need for explicit analytical representations of creep and relaxation kernels. We base the approximate solution of integral equations on the direct use of experimental data, previously smoothed and filled with a finer mesh. Thus, we reduce boundary-value problems of viscoelasticity to elasticity problems at an arbitrary point in time.