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Fractional viscoelastic models for power-law materials

Alessandra Bonfanti, Jonathan Kaplan, Guillaume Charras, Alexandre Kabla

2020Soft Matter431 citationsDOIOpen Access PDF

Abstract

Soft materials often exhibit a distinctive power-law viscoelastic response arising from broad distribution of time-scales present in their complex internal structure. A promising tool to accurately describe the rheological behaviour of soft materials is fractional calculus. However, its use in the scientific community remains limited due to the unusual notation and non-trivial properties of fractional operators. This review aims to provide a clear and accessible description of fractional viscoelastic models for a broad audience and to demonstrate the ability of these models to deliver a unified approach for the characterisation of power-law materials. The use of a consistent framework for the analysis of rheological data would help classify the empirical behaviours of soft and biological materials, and better understand their response.

Topics & Concepts

ViscoelasticityRheologyFractional calculusPower lawNotationSoft materialsStatistical physicsComputer scienceCalculus (dental)Applied mathematicsMathematicsPhysicsMaterials scienceNanotechnologyThermodynamicsStatisticsArithmeticDentistryMedicinePolysaccharides Composition and ApplicationsFractional Differential Equations SolutionsRheology and Fluid Dynamics Studies