A mathematical model for the progression of dental caries

Lazaro Rene Izquierdo Fabregas; Jacob Rubinstein

doi:10.1093/imammb/dqt008

A mathematical model for the progression of dental caries

Lazaro Rene Izquierdo Fabregas, Jacob Rubinstein

Condensed Matter Physics Group

Technion - Israel Institute of Technology

Research output: Contribution to journal › Article › peer-review

Abstract

A model for the progression of dental caries is derived. The analysis starts at the microscopic reaction and diffusion process. The local equations are averaged to derive a set of macroscopic equations. The global system includes features such as anisotropic diffusion and local changes in the geometry due to the melting of the enamel. The equations are then solved numerically. The simulations highlight the effect of anisotropy. In addition, we draw conclusions on the progression rate of caries and discuss them in light of a number of experiments.

Original language	English
Article number	4
Pages (from-to)	319-337
Number of pages	18
Journal	Mathematical Medicine and Biology
DOIs	https://doi.org/10.1093/imammb/dqt008
Publication status	Published - 2013

Keywords

caries
mathematical model
dentistry

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10.1093/imammb/dqt008

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title = "A mathematical model for the progression of dental caries",

abstract = "A model for the progression of dental caries is derived. The analysis starts at the microscopic reaction and diffusion process. The local equations are averaged to derive a set of macroscopic equations. The global system includes features such as anisotropic diffusion and local changes in the geometry due to the melting of the enamel. The equations are then solved numerically. The simulations highlight the effect of anisotropy. In addition, we draw conclusions on the progression rate of caries and discuss them in light of a number of experiments.",

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AB - A model for the progression of dental caries is derived. The analysis starts at the microscopic reaction and diffusion process. The local equations are averaged to derive a set of macroscopic equations. The global system includes features such as anisotropic diffusion and local changes in the geometry due to the melting of the enamel. The equations are then solved numerically. The simulations highlight the effect of anisotropy. In addition, we draw conclusions on the progression rate of caries and discuss them in light of a number of experiments.

KW - caries

KW - mathematical model

KW - dentistry

U2 - 10.1093/imammb/dqt008

DO - 10.1093/imammb/dqt008

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SN - 1477-8599

SP - 319

EP - 337

JO - Mathematical Medicine and Biology

JF - Mathematical Medicine and Biology

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A mathematical model for the progression of dental caries

Abstract

Keywords

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