6533b870fe1ef96bd12d082e
RESEARCH PRODUCT
Fractional calculus in solid mechanics: local versus non-local approach
Alberto Giuseppe SaporaMario Di PaolaPietro CornettiMassimiliano ZingalesAlberto Carpinterisubject
Continuum mechanicsOrder (ring theory)Fractional Calculus Fractals Local Fractional CalculusCommon denominatorCondensed Matter PhysicsNon localAtomic and Molecular Physics and OpticsFractional calculusQuantum mechanicsSolid mechanicsStatistical physicsSettore ICAR/08 - Scienza Delle CostruzioniMathematical PhysicsMathematicsdescription
Several enriched continuum mechanics theories have been proposed by the scientific community in order to develop models capable of describing microstructural effects. The aim of the present paper is to revisit and compare two of these models, whose common denominator is the use of fractional calculus operators. The former was proposed to investigate damage in materials exhibiting a fractal-like microstructure. It makes use of the local fractional derivative, which turns out to be a powerful tool to describe irregular patterns such as strain localization in heterogeneous materials. On the other hand, the latter is a non-local approach that models long-range interactions between particles by means of the Marchaud fractional derivative. Analogies and differences between the two models are outlined and discussed. PACS number: 62.20D
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2009-10-01 | Physica Scripta |