Rok 2024

• Response to David Steigmann’s discussion of our paper

  Publikacja

  • T. X. Duong
  • M. Itskov
  • R. Sauer

  - MATHEMATICS AND MECHANICS OF SOLIDS - Rok 2024

  We respond to David Steigmann's discussion of our paper "A general theory for anisotropic Kirchhoff-Love shells with in-plane bending of embedded fibers, Math. Mech. Solids, 28(5):1274-1317" (arXiv:2101.03122). His discussion allows us to clarify two misleading statements in our original paper, and confirm that its formulation is fully consistent with the formulation of Steigmann. We also demonstrate that some of our original statements...

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Rok 2023

• Biomimetic torene shells

  Publikacja

  • M. Bazmara
  • R. Sauer
  • A. Agrawal

  - MATHEMATICS AND MECHANICS OF SOLIDS - Rok 2023

  The genome inside the eukaryotic cells is guarded by a unique shell structure, called the nuclear envelope (NE), made of lipid membranes. This structure has an ultra torus topology with thousands of torus-shaped holes that imparts the structure a high flexural stiffness. Inspired from this biological design, here we present a novel ‘‘torene’’ architecture to design lightweight shell structures with ultra-stiffness for engineering...

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Rok 2022

• A general theory for anisotropic Kirchhoff–Love shells with in-plane bending of embedded fibers

  Publikacja

  • T. X. Duong
  • V. N. Khiêm
  • M. Itskov
  • R. Sauer

  - MATHEMATICS AND MECHANICS OF SOLIDS - Rok 2022

  This work presents a generalized Kirchhoff–Love shell theory that can explicitly capture fiber-induced anisotropy not only in stretching and out-of-plane bending, but also in in-plane bending. This setup is particularly suitable for heterogeneous and fibrous materials such as textiles, biomaterials, composites and pantographic structures. The presented theory is a direct extension of classical Kirchhoff–Love shell theory to incorporate...

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• Laplace domain BEM for anisotropic transient elastodynamics

  Publikacja

  • I. Markov
  • L. A. Igumnov
  • A. Belov
  • V. Eremeev

  - MATHEMATICS AND MECHANICS OF SOLIDS - Rok 2022

  In this paper, we describe Laplace domain boundary element method (BEM) for transient dynamic problems of three-dimensional finite homogeneous anisotropic linearly elastic solids. The employed boundary integral equations for displacements are regularized using the static traction fundamental solution. Modified integral expressions for the dynamic parts of anisotropic fundamental solutions and their first derivatives are obtained....

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• Minimal surfaces and conservation laws for bidimensional structures

  Publikacja

  • V. Eremeev

  - MATHEMATICS AND MECHANICS OF SOLIDS - Rok 2022

  We discuss conservation laws for thin structures which could be modeled as a material minimal surface, i.e., a surface with zero mean curvatures. The models of an elastic membrane and micropolar (six-parameter) shell undergoing finite deformations are considered. We show that for a minimal surface, it is possible to formulate a conservation law similar to three-dimensional non-linear elasticity. It brings us a path-independent...

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• On solvability of initial boundary-value problems of micropolar elastic shells with rigid inclusions

  Publikacja

  • V. Eremeev
  • L. Lebedev
  • V. Konopińska-Zmysłowska

  - MATHEMATICS AND MECHANICS OF SOLIDS - Rok 2022

  The problem of dynamics of a linear micropolar shell with a finite set of rigid inclusions is considered. The equations of motion consist of the system of partial differential equations (PDEs) describing small deformations of an elastic shell and ordinary differential equations (ODEs) describing the motions of inclusions. Few types of the contact of the shell with inclusions are considered. The weak setup of the problem is formulated...

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• On weak solutions of the boundary value problem within linear dilatational strain gradient elasticity for polyhedral Lipschitz domains

  Publikacja

  • V. Eremeev
  • F. dell'Isola

  - MATHEMATICS AND MECHANICS OF SOLIDS - Rok 2022

  We provide the proof of an existence and uniqueness theorem for weak solutions of the equilibrium problem in linear dilatational strain gradient elasticity for bodies occupying, in the reference configuration, Lipschitz domains with edges. The considered elastic model belongs to the class of so-called incomplete strain gradient continua whose potential energy density depends quadratically on linear strains and on the gradient of...

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Rok 2021

• A chemo-mechano-thermodynamical contact theory for adhesion, friction, and (de)bonding reactions

  Publikacja

  • R. Sauer
  • T. X. Duong
  • K. K. Mandadapu

  - MATHEMATICS AND MECHANICS OF SOLIDS - Rok 2021

  This work presents a self-contained continuum formulation for coupled chemical, mechanical, and thermal contact interactions. The formulation is very general and, hence, admits arbitrary geometry, deformation, and material behavior. All model equations are derived rigorously from the balance laws of mass, momentum, energy, and entropy in the framework of irreversible thermodynamics, thus exposing all the coupling present in the...

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• Local material symmetry group for first- and second-order strain gradient fluids

  Publikacja

  • V. Eremeev

  - MATHEMATICS AND MECHANICS OF SOLIDS - Rok 2021

  Using an unified approach based on the local material symmetry group introduced for general first- and second-order strain gradient elastic media, we analyze the constitutive equations of strain gradient fluids. For the strain gradient medium there exists a strain energy density dependent on first- and higher-order gradients of placement vector, whereas for fluids a strain energy depends on a current mass density and its gradients....

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• Surface and interfacial anti-plane waves in micropolar solids with surface energy

  Publikacja

  • M. S. Chaki
  • V. Eremeev
  • A. K. Singh

  - MATHEMATICS AND MECHANICS OF SOLIDS - Rok 2021

  In this work, the propagation behaviour of a surface wave in a micropolar elastic half-space with surface strain and kinetic energies localized at the surface and the propagation behaviour of an interfacial anti-plane wave between two micropolar elastic half-spaces with interfacial strain and kinetic energies localized at the interface have been studied. The Gurtin–Murdoch model has been adopted for surface and interfacial elasticity....

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Rok 2020

• Surface effects of network materials based on strain gradient homogenized media

  Publikacja

  • Y. Rahali
  • V. Eremeev
  • J. Ganghoffer

  - MATHEMATICS AND MECHANICS OF SOLIDS - Rok 2020

  The asymptotic homogenization of periodic network materials modeled as beam networks is pursued in this contribution, accounting for surface effects arising from the presence of a thin coating on the surface of the structural beam elements of the network. Cauchy and second gradient effective continua are considered and enhanced by the consideration of surface effects. The asymptotic homogenization technique is here extended to...

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Rok 2019

• Comparison of anti-plane surface waves in strain-gradient materials and materials with surface stresses

  Publikacja

  • V. Eremeev
  • G. Rosi
  • S. Naili

  - MATHEMATICS AND MECHANICS OF SOLIDS - Rok 2019

  Here we discuss the similarities and differences in anti-plane surface wave propagation in an elastic half-space within the framework of the theories of Gurtin–Murdoch surface elasticity and Toupin–Mindlin strain-gradient elasticity. The qualitative behaviour of the dispersion curves and the decay of the obtained solutions are quite similar. On the other hand, we show that the solutions relating to the surface elasticity model...

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Rok 2015

• Elastoplastic law of Cosserat type in shell theory with drilling rotation

  Publikacja

  • S. Burzyński
  • J. Chróścielewski
  • W. Witkowski

  - MATHEMATICS AND MECHANICS OF SOLIDS - Rok 2015

  Within the framework of six-parameter non-linear shell theory, with strain measures of the Cosserat type, we develop small-strain J2-type elastoplastic constitutive relations. The relations are obtained from the Cosserat plane stress relations assumed in each shell layer, by through-the-thickness integration employing the first-order shear theory. The formulation allows for unlimited translations and rotations. The constitutive...

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