6533b839fe1ef96bd12a66d5
RESEARCH PRODUCT
Mechanically-based approach to non-local elasticity: Variational principles
Antonina PirrottaMassimiliano ZingalesM. Di Paolasubject
Body forceState variableNon-local elasticityNon-local state variablesConstitutive equationEuler–Lagrange equationLong-range interactionNon-local state variableMaterials Science(all)Modelling and SimulationGeneral Materials ScienceVirtual workBoundary value problemMathematicsVariational theoremsMechanical EngineeringApplied MathematicsMathematical analysisCondensed Matter PhysicsPotential energyLong-range interactionsClassical mechanicsMechanics of MaterialsModeling and SimulationNon-local elastic potential energyCalculus of variationsSettore ICAR/08 - Scienza Delle Costruzionidescription
Abstract The mechanically-based approach to non-local elastic continuum, will be captured through variational calculus, based on the assumptions that non-adjacent elements of the solid may exchange central body forces, monotonically decreasing with their interdistance, depending on the relative displacement, and on the volume products. Such a mechanical model is investigated introducing primarily the dual state variables by means of the virtual work principle. The constitutive relations between dual variables are introduced defining a proper, convex, potential energy. It is proved that the solution of the elastic problem corresponds to a global minimum of the potential energy functional. Moreover, the Euler–Lagrange equations together with the natural boundary conditions associated to the total potential energy functional are established with variational calculus and they coincide with analogous relations already obtained by means of mechanical considerations. Numerical analysis of a tensile specimen has been introduced to show the capabilities of the proposed approach.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2010-03-01 | International Journal of Solids and Structures |