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The mathematical foundations of anelasticity: existence of smooth global intermediate configurations

Christian Goodbrake, Alain Goriely, Arash Yavari

2021Proceedings of the Royal Society A Mathematical Physical and Engineering Sciences29 citationsDOIOpen Access PDF

Abstract

A central tool of nonlinear anelasticity is the multiplicative decomposition of the deformation tensor that assumes that the deformation gradient can be decomposed as a product of an elastic and an anelastic tensor. It is usually justified by the existence of an intermediate configuration. Yet, this configuration cannot exist in Euclidean space, in general, and the mathematical basis for this assumption is on unsatisfactory ground. Here, we derive a sufficient condition for the existence of global intermediate configurations, starting from a multiplicative decomposition of the deformation gradient. We show that these global configurations are unique up to isometry. We examine the result of isometrically embedding these configurations in higher-dimensional Euclidean space, and construct multiplicative decompositions of the deformation gradient reflecting these embeddings. As an example, for a family of radially symmetric deformations, we construct isometric embeddings of the resulting intermediate configurations, and compute the residual stress fields explicitly.

Topics & Concepts

Multiplicative functionMathematicsIsometry (Riemannian geometry)Finite strain theoryDeformation (meteorology)Euclidean geometryTensor (intrinsic definition)Mathematical analysisEmbeddingGeometryPure mathematicsPhysicsComputer scienceFinite element methodMeteorologyArtificial intelligenceThermodynamicsElasticity and Material ModelingComposite Material MechanicsNonlocal and gradient elasticity in micro/nano structures