Martin Lévesque , Katell Derrien, Didier Baptiste* Michael D. Gilchrist**

A Micromechanical Model for Non-Linear Viscoelastic Particle Reinforced Polymeric Composite Materials – Undamaged State Micromechanical approach Martin Lévesque*, Katell Derrien*, Didier Baptiste* Michael D. Gilchrist** *Laboratoire LM3, ENSAM Paris **Department of Mechanical Engineering, NUI Dublin

1. Phenomenological behaviour law identification under specific loading. Loading changes (strain rate effects ?) Reinforcement change (shape, nature, volume faction, etc.) ? A Micromechanical Model for Non-Linear Viscoelastic Particle Reinforced Polymeric Composite Materials – Undamaged State PROBLEM: Knowing the mechanical response of a reinforced polymer under a given loading when the matrix is nonlinear viscoelastic SOLUTIONS: What happens if : Time consuming, expensive

2. Building a theoretical model which accounts for : A Micromechanical Model for Non-Linear Viscoelastic Particle Reinforced Polymeric Composite Materials – Undamaged State PROBLEM: Knowing the mechanical response of a reinforced polymer under a given loading when the matrix is nonlinear viscoelastic SOLUTIONS: Different loading cases Different reinforcement situations (nature, shape, volume fraction, etc.) Based on : Knowledge of each reinforcement behaviour Knowledge of the microstructure HOMOGENISATION APPROACH

A Micromechanical Model for Non-Linear Viscoelastic Particle Reinforced Polymeric Composite Materials – Undamaged State OUTLINE 1. Homogenisation basics 2. Constituents behaviour 3. Theoretical model 4. Model theoretical predictions 5. Conclusion

A Micromechanical Model for Non-Linear Viscoelastic Particle Reinforced Polymeric Composite Materials – Undamaged State BASICS Behaviour law identification of each constituent BEHAVIOUR MODEL Description of the microstructure PREDICTION CONCLUSION 3 BASIC STEPS: 1. Description Elastic, plastic, viscoelastic, nonlinear, etc. Shape of the reinforcements Orientation of the reinforcements Volume fraction of the reinforcements Position of the reinforcements

A Micromechanical Model for Non-Linear Viscoelastic Particle Reinforced Polymeric Composite Materials – Undamaged State BASICS Matrix (phase 0) BEHAVIOUR Solution of a structure problem MODEL PREDICTION Functions of the description and the homogenisation scheme (hypothesis on which the solution is based) CONCLUSION Reinforcement (phase 1) 3 BASIC STEPS: 2. Localisation: What are the stresses and strains in each of the constituent phases when a macroscopic loading is applied ?

A Micromechanical Model for Non-Linear Viscoelastic Particle Reinforced Polymeric Composite Materials – Undamaged State BASICS Equilibrium Localisation BEHAVIOUR MODEL PREDICTION Behaviour CONCLUSION 3 BASIC STEPS: 3. Homogenisation: How to relate the loading in each phase to the macroscopic loading ? Transition from the micro scale to the macro scale

A Micromechanical Model for Non-Linear Viscoelastic Particle Reinforced Polymeric Composite Materials – Undamaged State BASICS BEHAVIOUR MODEL PREDICTION CONCLUSION Material studied Glass bead reinforced polypropylene (10% to 30 %) Beads assumed to be randomly distributed Glass assumed to be linear elastic Polypropylene assumed to obey a Schapery type behaviour law

A Micromechanical Model for Non-Linear Viscoelastic Particle Reinforced Polymeric Composite Materials – Undamaged State BASICS Elastic part Viscoelastic part BEHAVIOUR MODEL PREDICTION CONCLUSION Linear viscoelastic creep compliance Time-shift factor Generalised stress Schapery type behaviour law:

A Micromechanical Model for Non-Linear Viscoelastic Particle Reinforced Polymeric Composite Materials – Undamaged State BASICS BEHAVIOUR MODEL PREDICTION + CONCLUSION Nonlinear viscoelastic ? MODEL ELABORATION: Homogenisation schemes well established for linear elastic materials What happens if : One constituent is linear viscoelastic ? Nonlinear (elastic, plastic) ?

A Micromechanical Model for Non-Linear Viscoelastic Particle Reinforced Polymeric Composite Materials – Undamaged State BASICS Linear viscoelastic behaviour law BEHAVIOUR Laplace – Carson transform MODEL PREDICTION CONCLUSION Analogy with linear elastic behaviour Homogenisation for linear viscoelastic materials: Homogenisation carried out in the Laplace – Carson space Time domain solution obtained by inverse transform of the symbolic solution

A Micromechanical Model for Non-Linear Viscoelastic Particle Reinforced Polymeric Composite Materials – Undamaged State Homogenisation for nonlinear materials: Affine formulation BASICS BEHAVIOUR Tangent modulus calculated for a given loading  MODEL PREDICTION CONCLUSION Thermoelastic problem 0  Linearisation Non-zero initial loading

A Micromechanical Model for Non-Linear Viscoelastic Particle Reinforced Polymeric Composite Materials – Undamaged State 1. Linearisation of the nonlinear viscoelastic material into a linear viscoelastic material BASICS 2. Solve the homogenisation problem with the Laplace – Carson transforms BEHAVIOUR MODEL PREDICTION Tangency in tn for the same load history CONCLUSION Stress free deformation history Homogenisation for nonlinear viscoelastic materials: Suggested linearisation :

A Micromechanical Model for Non-Linear Viscoelastic Particle Reinforced Polymeric Composite Materials – Undamaged State BASICS Tensile loading at constant STRESS rate BEHAVIOUR MODEL PREDICTION CONCLUSION Homogenisation for nonlinear viscoelastic materials: Linearisation example

A Micromechanical Model for Non-Linear Viscoelastic Particle Reinforced Polymeric Composite Materials – Undamaged State Laplace – Carson transform Matrix behaviour Linearisation BASICS Laplace – Carson transform Glass behaviour BEHAVIOUR Reinforcements shape and orientation Localisation as per the Mori – Tanaka scheme in the Laplace space MODEL Reinforcements volume fraction PREDICTION CONCLUSION Homogenisation Inverse Laplace Carson Transform Homogenisation for nonlinear viscoelastic materials: Macroscopic response of the whole composite

A Micromechanical Model for Non-Linear Viscoelastic Particle Reinforced Polymeric Composite Materials – Undamaged State BASICS BEHAVIOUR MODEL PREDICTION CONCLUSION Simulated response to a uniaxial stress load applied at a stress rate of 5 MPa / sec for various volume fractions of glass beads reinforced polypropylene

A Micromechanical Model for Non-Linear Viscoelastic Particle Reinforced Polymeric Composite Materials – Undamaged State BASICS BEHAVIOUR MODEL PREDICTION CONCLUSION Effect on the strain at 25 MPa of the stress rate for simulated uniaxial loadings at a constant stress rate for various volume fractions of reinforcements

A Micromechanical Model for Non-Linear Viscoelastic Particle Reinforced Polymeric Composite Materials – Undamaged State BASICS Matrix behaviour BEHAVIOUR Reinforcements behaviour MODEL Reinforcements shape and orientation PREDICTION CONCLUSION Global composite behaviour Reinforcements volume fraction CONCLUSION Theoretical model taking into account the nonlinear viscoelasticity

A Micromechanical Model for Non-Linear Viscoelastic Particle Reinforced Polymeric Composite Materials – Undamaged State BASICS 11 Creep - recovery tests where 11 and 22 are sufficient to identify the full 3D behaviour law BEHAVIOUR MODEL   PREDICTION 1 CONCLUSION 2 t t Identification of a Schapery type behaviour law:

A Micromechanical Model for Non-Linear Viscoelastic Particle Reinforced Polymeric Composite Materials – Undamaged State BASICS the behaviour is linear viscoelastic If BEHAVIOUR Evaluated for a low level of stress MODEL  PREDICTION Evaluated by nonlinear regression CONCLUSION Evaluated with the transverse data t Identification of a Schapery type behaviour law:

A Micromechanical Model for Non-Linear Viscoelastic Particle Reinforced Polymeric Composite Materials – Undamaged State BASICS BEHAVIOUR Prony series MODEL PREDICTION CONCLUSION Identification of a Schapery type behaviour law: Some results:

Martin Lévesque , Katell Derrien, Didier Baptiste* Michael D. Gilchrist**