Publication result detail

Asymptotic Homogenization of Discrete Models With Rotational Degrees of Freedom

ELIÁŠ, J.; CUSATIS, G.

Original Title

Asymptotic Homogenization of Discrete Models With Rotational Degrees of Freedom

English Title

Asymptotic Homogenization of Discrete Models With Rotational Degrees of Freedom

Type

Paper in proceedings outside WoS and Scopus

Original Abstract

This contribution revisits the homogenization techniques applied to discrete models incorporating rotational degrees of freedom. The theoretical framework extends previous work on the homogenization of Cosserat continua, demonstrating how these models can be homogenized to a Cauchy continuum under realistic assumptions. The formulation is developed within the context of linear elasticity and validated through simulations of a bent cantilever.

English abstract

This contribution revisits the homogenization techniques applied to discrete models incorporating rotational degrees of freedom. The theoretical framework extends previous work on the homogenization of Cosserat continua, demonstrating how these models can be homogenized to a Cauchy continuum under realistic assumptions. The formulation is developed within the context of linear elasticity and validated through simulations of a bent cantilever.

Keywords

Discrete model, Lattice, Homogenization, Rotation, Cauchy-Continuum

Key words in English

Discrete model, Lattice, Homogenization, Rotation, Cauchy-Continuum

Authors

ELIÁŠ, J.; CUSATIS, G.

Released

25.04.2025

Publisher

IA-FraMCoS

Pages from

1

Pages to

6

Pages count

6

URL

http://framcos.org/FraMCoS-12/Full-Papers/1263.pdf

BibTex

@inproceedings{BUT199527,
  author="{} and Jan {Eliáš} and  {} and Gianluca {Cusatis} and  {}",
  title="Asymptotic Homogenization of Discrete Models With Rotational Degrees of Freedom",
  year="2025",
  pages="1--6",
  publisher="IA-FraMCoS",
  doi="10.21012/FC12.1263",
  url="http://framcos.org/FraMCoS-12/Full-Papers/1263.pdf"
}