A microscale second gradient approximation of the damage parameter of quasi‐brittle heterogeneous lattices

162

117

Section: Pipkin Continuum Model For Considered Fabricmentioning

confidence: 99%

Designing a light fabric metamaterial being highly macroscopically tough under directional extension: first experimental evidence

Dell’Isola

Lekszycki

Pawlikowski

et al. 2015

162

117

“…Problems studied by means of a variety of approaches are just different aspects of the same general problem [4]. The most used methods for today's research in applied mechanics for new materials like nano-based materials can be categorized into generalized continuum mechanics theories [5][6][7][8][9][10] and atomistic-discrete models [11][12][13][14][15][16].…”

Section: Introductionmentioning

confidence: 99%

Torsional vibration of single-walled carbon nanotubes using doublet mechanics

Fatahi-Vajari

Imam

2016

This paper investigates the torsional vibration of single-walled carbon nanotubes (SWCNTs) using a new approach based on doublet mechanics (DM) incorporating explicitly scale parameter and chiral effects. A fourth-order partial differential equation that governs the torsional vibration of nanotubes is derived. Using DM, an explicit equation for the natural frequency in terms of geometrical and mechanical property of CNTs is obtained for both the Zigzag and Armchair nanotube for the torsional vibration mode. It is shown that chiral effects along with the scale parameter play a significant role in the vibration behavior of SWCNTs in torsional vibration mode. Such effects decrease the natural frequency obtained by DM compared to the classical continuum mechanics and nonlocal theory predictions. However, with increase in the length and/or the radius of the tube, the effect of the chiral and scale parameter on the natural frequency decreases.Mathematics Subject Classification. 70G60 · 70J30 · 35B99 · 00A72.

“…Another possibility is to consider higher-order gradient theories, in which the deformation energy depends on second and/or higher gradients of the displacement [17,33,40]. This is done in the literature for both monophasic systems (see [14,15,19,22,24,25,44,57], in which continuous systems are investigated, and [1,26,56,64] for cases of lattice/woven structures) and for biphasic (see, e.g., [16,18,20,21,41,45,60,61]) or granular materials [72]. Unlike classical Cauchy continua [4,62,63], second-and higher-order continua can respond to concentrated forces and other generalized contact actions (highly localized stress/strain concentration effects are studied, e.g., in [10]).…”

Section: Introductionmentioning

confidence: 99%

Gedanken experiments for the determination of two-dimensional linear second gradient elasticity coefficients

Placidi

Andreaus

Corte

et al. 2015

131

In the present paper, a two-dimensional solid consisting of a linear elastic isotropic material, for which the deformation energy depends on the second gradient of the displacement, is considered. The strain energy is demonstrated to depend on 6 constitutive parameters: the 2 Lamé constants (λ and μ) and 4 more parameters (instead of 5 as it is in the 3D-case). Analytical solutions for classical problems such as heavy sheet, bending and flexure are provided. The idea is very simple: The solutions of the corresponding problem of first gradient classical case are imposed, and the corresponding forces, double forces and wedge forces are found. On the basis of such solutions, a method is outlined, which is able to identify the six constitutive parameters. Ideal (or Gedanken) experiments are designed in order to write equations having as unknowns the six constants and as known terms the values of suitable experimental measurements.Mathematics Subject Classification. 74B99 · 74Q15.