Litcius/Paper detail

Geometric charges and nonlinear elasticity of two-dimensional elastic metamaterials

Yohai Bar‐Sinai, Gabriele Librandi, Katia Bertoldi, Michael Moshe

2020Proceedings of the National Academy of Sciences38 citationsDOIOpen Access PDF

Abstract

Problems of flexible mechanical metamaterials, and highly deformable porous solids in general, are rich and complex due to their nonlinear mechanics and the presence of nontrivial geometrical effects. While numeric approaches are successful, analytic tools and conceptual frameworks are largely lacking. Using an analogy with electrostatics, and building on recent developments in a nonlinear geometric formulation of elasticity, we develop a formalism that maps the two-dimensional (2D) elastic problem into that of nonlinear interaction of elastic charges. This approach offers an intuitive conceptual framework, qualitatively explaining the linear response, the onset of mechanical instability, and aspects of the postinstability state. Apart from intuition, the formalism also quantitatively reproduces full numeric simulations of several prototypical 2D structures. Possible applications of the tools developed in this work for the study of ordered and disordered 2D porous elastic metamaterials are discussed.

Topics & Concepts

MetamaterialNonlinear systemElasticity (physics)Formalism (music)Classical mechanicsNonlinear elasticityPhysicsElectrostaticsAnalogyInstabilityLinear elasticityStatistical physicsIntuitionMechanicsTheoretical physicsFinite element methodQuantum mechanicsEpistemologyMusicalPhilosophyLinguisticsArtThermodynamicsVisual artsCellular and Composite StructuresAdvanced Materials and MechanicsAdhesion, Friction, and Surface Interactions