Generalized micropolar thermoelasticity with fractional order strain

Authors

  • Adina Chirila Transilvania University of Brasov, Romania

Keywords:

micropolar thermoelasticity, fractional derivative, Cattaneo equations

Abstract

This article presents the basic equations, the initial and boundary conditions of the mixed problem of micropolar thermoelasticity then introduce the Caputo fractional derivative and applies it in this context. The theorems of this paper give some formulations for the constitutive equations in the fractional case and for Cattaneo's heat conduction equations.

Author Biography

Adina Chirila, Transilvania University of Brasov, Romania

Faculty of Mathematics and Informatics

Downloads

Published

2017-10-10

Issue

Section

MATHEMATICS