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2015 | OriginalPaper | Chapter

7. Analytical Modeling of the Viscoelastic Behavior of Periodontal Ligament with Using Rabotnov’s Fractional Exponential Function

Authors : Sergei Bosiakov, Sergei Rogosin

Published in: Computational Problems in Science and Engineering

Publisher: Springer International Publishing

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Abstract

The mathematical modeling of a stress-strain state of the viscoelastic periodontal membrane is carried out. Internal and external surfaces of the periodontal ligament are described by a symmetrical two-sheeted hyperboloid. Tooth root is assumed to be a rigid body. Displacements of points on the internal surface of the periodontal ligament coincide with the displacements of the corresponding points of the external surface of the tooth root. The relationships between the displacements and strains for periodontal ligaments are formulated as an assumption that the periodontal tissue approaches to incompressible materials. Viscoelastic constitutive law with a fractional exponential kernel for periodontal ligament was used. The equations of motion for the periodontal ligament relative to translational displacements and rotation angles of its points are derived. In the particular case the vertical translational motion of the tooth root, as well as corresponding displacements are analyzed. Constants of the fractional viscoelastic function were assessed on the basis of the experimental data about the behavior of the periodontal ligament. The obtained results can be used to determine a load for orthodontic tooth movement corresponding to the optimal stresses, as well as to simulate bone remodeling on the basis of changes of stresses and strains in the periodontal ligament during orthodontic movement.

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Title: Analytical Modeling of the Viscoelastic Behavior of Periodontal Ligament with Using Rabotnov’s Fractional Exponential Function
Authors: Sergei Bosiakov
Sergei Rogosin
Publisher: Springer International Publishing
Book: Computational Problems in Science and Engineering
Print ISBN: 978-3-319-15764-1

Electronic ISBN: 978-3-319-15765-8

Copyright Year: 2015
DOI: https://doi.org/10.1007/978-3-319-15765-8_7