Titlebook: Lectures on Viscoelasticity Theory; A. C. Pipkin Book 1986Latest edition Springer-Verlag New York Inc. 1986 Mathematica.applied mathematic

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Lectures on Viscoelasticity Theory978-1-4612-1078-8Series ISSN 0066-5452 Series E-ISSN 2196-968X

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Applied Mathematical Scienceshttp://image.papertrans.cn/l/image/583613.jpg

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https://doi.org/10.1007/978-1-4612-1078-8Mathematica; applied mathematics; elasticity; mathematical method; mathematics; polymer; rheology

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Viscometric Flow, the Newtonian corner by using slow viscoelastic flow approximations, but as we have seen in the case of tube flow, this can become very laborious. We need a constitutive equation that deals directly with steady shearing motions at arbitrary shear rates.

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Fourier and Laplace Transforms,The simplest methods of determining ., given ., or vice versa, are based on the use of Laplace transforms. Fourier and Laplace transforms also find a variety of other applications in connection with viscoelasticity theory. Let us briefly review these transform methods.

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