Entropy (Mar 2018)

Non-Conventional Thermodynamics and Models of Gradient Elasticity

  • Hans-Dieter Alber,
  • Carsten Broese,
  • Charalampos Tsakmakis,
  • Dimitri E. Beskos

DOI
https://doi.org/10.3390/e20030179
Journal volume & issue
Vol. 20, no. 3
p. 179

Abstract

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We consider material bodies exhibiting a response function for free energy, which depends on both the strain and its gradient. Toupin–Mindlin’s gradient elasticity is characterized by Cauchy stress tensors, which are given by space-like Euler–Lagrange derivative of the free energy with respect to the strain. The present paper aims at developing a first version of gradient elasticity of non-Toupin–Mindlin’s type, i.e., a theory employing Cauchy stress tensors, which are not necessarily expressed as Euler–Lagrange derivatives. This is accomplished in the framework of non-conventional thermodynamics. A one-dimensional boundary value problem is solved in detail in order to illustrate the differences of the present theory with Toupin–Mindlin’s gradient elasticity theory.

Keywords