Quasi-linear viscoelastic behavior of the human periodontal ligament.

Previous studies have not produced a comprehensive mathematical description of the nonlinear viscoelastic stress-strain behavior of the periodontal ligament (PDL). In the present study, the quasi-linear viscoelastic (QLV) model was applied to mechanical tests of the human PDL. Transverse sections of cadaveric premolars were subjected to relaxation tests and loading to failure perpendicular to the plane of section. Distinct and repeatable toe and linear regions of stress-strain behavior were observed. The amount of strain associated with the toe region differed as a function of anatomical location along the tooth root. Stress relaxation behavior was comparable for different anatomical locations. Model predicted peak tissue stresses for cyclic loading were within 11% of experimental values, demonstrating that the QLV approach provided an improved, accurate quantification of PDL mechanical response. The success of the QLV approach supports its usefulness in future efforts of experimental characterization of PDL mechanical behavior.

[1]  C. Daly,et al.  The response of the human peridontal ligament to torsional loading--I. Experimental methods. , 1974, Journal of biomechanics.

[2]  C. Burstone,et al.  Centers of rotation within the periodontal space. , 1969, American journal of orthodontics.

[3]  Y. Fung,et al.  Biomechanics: Mechanical Properties of Living Tissues , 1981 .

[4]  K J Chun,et al.  Mechanical responses of tendons to repeated extensions and wait periods. , 1988, Journal of biomechanical engineering.

[5]  M. Sato [Mechanical properties of living tissues]. , 1986, Iyo denshi to seitai kogaku. Japanese journal of medical electronics and biological engineering.

[6]  L. J. Gathercole In-vitro mechanics of intrusive loading in porcine cheek teeth with intact and perforated root apices. , 1987, Archives of oral biology.

[7]  K. J. Ives,et al.  Experimental Methods (2) , 1978 .

[8]  Körber Kh Electronic registration of tooth movements. , 1971 .

[9]  G L Kinzel,et al.  A finite element survey of eleven endosseous implants. , 1990, The Journal of prosthetic dentistry.

[10]  B K Berkovitz,et al.  The structure of the periodontal ligament: an update. , 1990, European journal of orthodontics.

[11]  K J Anusavice,et al.  Influence of Incisal Length of Ceramic and Loading Orientation on Stress Distribution in Ceramic Crowns , 1988, Journal of dental research.

[12]  S L Woo,et al.  The time and history-dependent viscoelastic properties of the canine medical collateral ligament. , 1981, Journal of biomechanical engineering.

[13]  B. K. B. Berkovitz,et al.  The Periodontal ligament in health and disease , 1982 .

[14]  D C Picton,et al.  Viscoelastic properties of the periodontal ligament and mucous membrane. , 1978, The Journal of prosthetic dentistry.

[15]  D C Picton,et al.  Tooth mobility--an update. , 1990, European journal of orthodontics.

[16]  D C Picton,et al.  An investigation of the viscoelastic properties of the periodontium in monkeys. , 1972, Journal of periodontal research.

[17]  H R Mühlemann,et al.  Tooth mobility: a review of clinical aspects and research findings. , 1967, Journal of periodontology.

[18]  V K Goel,et al.  Parameters of MOD cavity preparations: a 3-D FEM study, Part II. , 1991, Operative dentistry.

[19]  Sheldon R. Simon,et al.  Orthopaedic basic science , 1994 .

[20]  J Middleton,et al.  Three-dimensional analysis of orthodontic tooth movement. , 1990, Journal of biomedical engineering.

[21]  A. Viidik,et al.  A biomechanical study of the human periodontal ligament. , 1986, Journal of biomechanics.

[22]  A. Yamane,et al.  In vitro measurement of regional differences in the mechanical properties of the periodontal ligament in the rat mandibular incisor. , 1990, Archives of oral biology.

[23]  H. Mühlemann Tooth Mobility*: The Measuring Method. Initial and Secondary Tooth Mobility , 1954 .

[24]  D. C. Picton,et al.  Extrusive mobility of teeth in adult monkeys (Macaca fascicularis). , 1986, Archives of oral biology.