Title of article
Numerical modelization of disordered media via fractional calculus
Author/Authors
Carpinteri، نويسنده , , A. and Chiaia، نويسنده , , B. and Cornetti، نويسنده , , P.، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2004
Pages
8
From page
155
To page
162
Abstract
In this paper, the framework for the mechanics of solids, deformable over fractal subsets, is outlined. Anomalous mechanical quantities with fractal dimensions are introduced, i.e., the fractal stress [σ∗], the fractal strain [ε∗] and the fractal work of deformation W∗. By means of the local fractional operators, the static and kinematic equations are obtained, and the principle of virtual work for fractal media is demonstrated. Afterwards, from the definition of the fractal elastic potential φ∗, the linear elastic constitutive relation is derived. The direct formulation of the elastic problem is obtained in terms of the fractional Lamé operators and of the equivalence equations at the boundary. The variational form of the elastic problem is also obtained, through minimization of the total potential energy. Finally, discretization of the fractal medium is proposed, in the spirit of the Ritz–Galerkin approach, and a finite element formulation is obtained by means of devilʹs staircase interpolating splines.
Journal title
Computational Materials Science
Serial Year
2004
Journal title
Computational Materials Science
Record number
1680425
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