Linear Pantographic Sheets: Existence and Uniqueness of Weak Solutions

Eremeyev, Victor A.; Dell’Isola, Francesco; Boutin, Claude; Steigmann, David J.

doi:10.1007/s10659-017-9660-3

Cited by 124 publications

(95 citation statements)

References 61 publications

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“…The well-posedness of linearized equilibrium equations deriving from the stationarity of the energy functional (18), which is valid in the neighborhood of a stress free configuration for pantographic sheets, cannot be immediately studied by using the results available in the literature. It has been proven that the standard strategy involving the use of Poincaré inequality, Lax-Milgram Theorem, and coercivity of bilinear strain energy form also apply in the context of linear elastic pantographic sheets [44]. The key idea is the exploitation of an unusual energy space, where the solutions relative to well-posed boundary conditions are looked for.…”

Section: à La Piola Homogenized Elastic Plate Modelmentioning

confidence: 99%

Pantographic metamaterials: an example of mathematically driven design and of its technological challenges

Dell’Isola

Seppecher

Alibert

et al. 2018

Continuum Mech. Thermodyn.

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286

138

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Pantographic metamaterials: an example of mathematically driven design and of its technological challenges Abstract In this paper, we account for the research efforts that have been started, for some among us, already since 2003, and aimed to the design of a class of exotic architectured, optimized (meta) materials. At the first stage of these efforts, as it often happens, the research was based on the results of mathematical investiga-tions. The problem to be solved was stated as follows: determine the material (micro)structure governed by those equations that specify a desired behavior. Addressing this problem has led to the synthesis of second gradient materials. In the second stage, it has been necessary to develop numerical integration schemes andDipartimento di Ingegneria Strutturale e Geotecnica, Università degli Studi di Roma "La Sapienza.", Via Eudossiana 18, 00184 Rome, Italy E-mail: barchiesiemilio@gmail.com the corresponding codes for solving, in physically relevant cases, the chosen equations. Finally, it has been necessary to physically construct the theoretically synthesized microstructures. This has been possible by means of the recent developments in rapid prototyping technologies, which allow for the fabrication of some complex (micro)structures considered, up to now, to be simply some mathematical dreams. We show here a panorama of the results of our efforts (1) in designing pantographic metamaterials, (2) technology of rapid prototyping, and (3) in the mechanical testing of many real prototypes. Among the key findings that have been obtained, there are the following ones: pantographic metamaterials (1) undergo very large deformations while remaining in the elastic regime, (2) are very tough in resisting to damage phenomena, (3) exhibit robust macroscopic mechanical behavior with respect to minor changes in their microstructure and micromechanical properties, (4) have superior strength to weight ratio, (5) have predictable damage behavior, and (6) possess physical properties that are critically dictated by their geometry at the microlevel.

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Section: à La Piola Homogenized Elastic Plate Modelmentioning

confidence: 99%

Pantographic metamaterials: an example of mathematically driven design and of its technological challenges

Dell’Isola

Seppecher

Alibert

et al. 2018

Continuum Mech. Thermodyn.

Self Cite

286

138

View full text Add to dashboard Cite

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“…Substituting (39), (40) and (41) into (32) together with ρ α (x i , y j ) = ∂χ ∂α , the desired expansion of the micro-model energy E ε is derived as a function of the kinematic descriptors χ andl µν α as…”

Section: Bi-pantographic Fabrics Micro-macro Identicationmentioning

confidence: 99%

Large in-plane elastic deformations of bi-pantographic fabrics: asymptotic homogenization and experimental validation

Barchiesi

Eugster

Dell’Isola

et al. 2019

Mathematics and Mechanics of Solids

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Bi-pantographic fabrics are composed of two families of pantographic beams and correspond to a class of architectured materials that are described in plane as second-gradient 2D-continua. On a discrete level, a pantographic beam is a periodic arrangement of cells and looks like an expanding barrier. The materialisation of a bi-pantographic fabrics made by Polyamide was achieved by additive manufacturing techniques. Starting from a discrete spring system, the deformation energy of the corresponding continuum is derived for large strains by asymptotic homogenisation. The obtained energy depends on the second gradient of the deformation through the rate of change in orientation and stretch of material lines directed along the pantographic beams. Displacementcontrolled bias extension tests were performed on rectangular prototypes for total elastic extension up to 25%.Force-displacement measurements complemented by local digital image correlation analyses were used to t the continuum model achieving excellent agreement.

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“…Using gamma-convergence, homogenization results have been obtained in [4,5,70]. A remarkable class of structures being described at the macroscale by using a second gradient elasticity theory in pantographic structures [18,83,86], which have received a notable follow-up in the literature [30,34,76,91,93], also from a mathematically rigorous standpoint, regarding fundamental issues such as well-posedness [36].…”

Section: Introductionmentioning

confidence: 99%

Determination of metamaterial parameters by means of a homogenization approach based on asymptotic analysis

Yang

Abali

Timofeev

et al. 2019

Continuum Mech. Thermodyn.

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Owing to additive manufacturing techniques, a structure at millimeter length scale (macroscale) can be produced by using a lattice substructure at micrometer length scale (microscale). Such a system is called a metamaterial at the macroscale as the mechanical characteristics deviate from the characteristics at the microscale. As a remedy, metamaterial is modeled by using additional parameters; we intend to determine them. A homogenization approach based on the asymptotic analysis establishes a connection between these different characteristics at micro-and macroscales. A linear elastic first order theory at the microscale is related to a linear elastic second order theory at the macroscale. Relation for parameters at the macroscale is derived by using the equivalence of energy at macro-and microscales within a so-called Representative Volume Element (RVE). Determination of parameters are succeeded by solving a boundary value problem with the Finite Element Method (FEM). The proposed approach guarantees that the additional parameters vanish if the material is purely homogeneous, in other words, it is fully compatible with conventional homogenization schemes based on spatial averaging techniques. Moreover, the proposed approach is reliable as it ensures that such resolved additional parameters are not sensitive to choices of RVE consisting in the repetition of smaller RVEs but depend upon the intrinsic size of the structure.

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Linear Pantographic Sheets: Existence and Uniqueness of Weak Solutions

Cited by 124 publications

References 61 publications

Pantographic metamaterials: an example of mathematically driven design and of its technological challenges

Pantographic metamaterials: an example of mathematically driven design and of its technological challenges

Large in-plane elastic deformations of bi-pantographic fabrics: asymptotic homogenization and experimental validation

Determination of metamaterial parameters by means of a homogenization approach based on asymptotic analysis

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