On the efficient numerical simulation of kinetic theory models of complex fluids and flows

1. On the efficient numerical simulation of kinetic theory models of complex fluids and flows Francisco (Paco) Chinesta & Amine Ammar LMSP UMR CNRS – ENSAM PARIS, France Laboratoire de Rhéologie GRENOBLE, France francisco.chinesta@paris.ensam.fr In collaboration with: R. Keunings Polymer solutions and melts M. Laso LCP M. Mackley & A. Ma Suspensions of CNT

2. q1 q2 r1 r2 rN+1 qN Molecular dynamics R Brownian dynamics The different scales: Kinetic theory: Fokker-Planck Eq. Deterministic, Stochastic & BCF solvers Constitutive Eq.

3. General Micro-Macro approach

4. Solving the deterministic Fokker-Planck equation New efficient solvers for: • Reducing the simulation time of grid discretizations. • Computing multidimensional solutions where grid methods don’t run.

5. I. Reducing the simulation time The idea … Model: PDE Model: PDE + Karhunen-Loève decomposition

6. 1. FENE Model 1D 300.000FEM dof ~10dof 3D ~10 functions (1D, 2D or 3D)

7. 2. Non-Linear Models: Doi LCP With only 6 d.o.f. !! Larson & Ottinger (Macromolecules, 1991)

8. q1 q2 r1 r2 rN+1 qN II. Computing multidimensional solutions • It is time for dreaming! For N springs, the model is defined in a 3N+3+1 dimensional space !! ~ 10 approximation functions are enough

9. BUT How defining those high-dimensional functions ? Natural answer: with a nodal description 10 nodes = 10 function values 1D

10. q1 q2 r1 r2 rN+1 1080 ~ presumed number ofelementary particles in the universe !! qN 1D 10 dof 10x10 dof 2D 1080 dof 80D >1000D No function can be defined in a such space from a computational point of view !! F.E.M.

11. Computing multidimensional solutions The idea … Model: PDE FEM GRID

12.  Solution EF q2 q1 F G q2 q1 1. MBS-FENE q2 q1

13.  Solution EF q2 q1 F G q2 q1

14.  Solution EF q2 q1 F G q2 q1

15.  Solution EF q2 q1 F G q2 q1

16.  Solution EF q2 q1 F G q2 q1

17.  Solution EF q2 q1 F G q2 q1

18.  Solution EF q2 q1 F G q2 q1

19.  Solution EF q2 q1 F G q2 q1

20.  Solution EF q2 q1 F G q2 q1

21.  Solution EF q2 q1 F G q2 q1

22.  Solution EF q2 q1 F G q2 q1

23. 1D/9D q1 q2 q9 809 ~ 1016 FEM dof 80x9 RM dof 1040 FEM dof 100.000 RM dof 2D/10D

24. 2. Complex Flows Example: Flow involving short fiber suspensions Kinematics: FEM-DVESS

25. 3. Entangled polymer models based on reptation motion s = 0 s = 1 Doi-Edwards Model Ottinger Model: double reptation, CCR, chain stretching, …

26. Ongoing works : (I) Stochastic models can be also reduced ! y=1

27. Reduced Brownian Configurations Fields Discretization 4x4 1000x1000 • Solve i=1 and computed the reduced approximation basis • Solve for all i>1 the reduced problem:

28. Ongoing works: (II) Suspensions of CNT: Aggregation/Orientation model Enhanced modeling: + The associated Fokker-Planck equation

29. Perspectives • Enhanced kinetic model for CNT suspensions taking into account orientation and aggregation effects: FP & BD simulations. Collaboration with M. Mackley • Reduction of Stochastic, Brownian and molecular dynamics simulations. • Fast micro-macro simulations of complex flows: Lattice-Boltzmann & Reduced-FP; and many others mathematical topics (stabilization, wavelet bases, mixed formulations, enhanced particles methods, …). Collaboration with T. Phillips.