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Strong Ellipticity and Infinitesimal Stability within Nth-Order Gradient Elasticity

Victor A. Eremeyev

2023Mathematics18 citationsDOIOpen Access PDF

Abstract

We formulate a series of strong ellipticity inequalities for equilibrium equations of the gradient elasticity up to the Nth order. Within this model of a continuum, there exists a deformation energy introduced as an objective function of deformation gradients up to the Nth order. As a result, the equilibrium equations constitute a system of 2N-order nonlinear partial differential equations (PDEs). Using these inequalities for a boundary-value problem with the Dirichlet boundary conditions, we prove the positive definiteness of the second variation of the functional of the total energy. In other words, we establish sufficient conditions for infinitesimal instability. Here, we restrict ourselves to a particular class of deformations which includes affine deformations.

Topics & Concepts

MathematicsInfinitesimalAffine transformationMathematical analysisElasticity (physics)Positive definitenessBoundary value problemNonlinear systemPure mathematicsPhysicsPositive-definite matrixEigenvalues and eigenvectorsQuantum mechanicsThermodynamicsNonlocal and gradient elasticity in micro/nano structuresThermoelastic and Magnetoelastic PhenomenaElasticity and Material Modeling