Abstract
By postulating equal contributions the number of kernels in the principal cubic theory of viscoelasticity and in the theory with regular kernels of two arguments is reduced to three. For certain quasilinear relations all the kernels and functions are determined from creep, relaxation, and simple loading and deformation tests. In the case of simple loading and deformation the problems for a viscoelastic incompressible material reduce to problems of the theory of small elastoplastic deformations of an incompressible material. Several problems relating to this case are considered.
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Literature cited
A. A. Il'yushin and P. M. Ogibalov, Mekhan. Polim., No. 2, 170 (1966).
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Moscow M. V. Lomonosov State University. Translated from Mekhanika Polimerov, No. 4, pp. 603–611, July–August, 1969.
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Moskvitin, V.V., Kolokol'chikov, V.V. Quasilinear theory of viscoelasticity. Polymer Mechanics 5, 523–530 (1969). https://doi.org/10.1007/BF00857229
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DOI: https://doi.org/10.1007/BF00857229