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Simulating structure and physical properties of complex metallic alloys

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Title: Simulating structure and physical properties of complex metallic alloys

1
Simulating structure and physical properties of
complex metallic alloys

Hans-Rainer Trebin
Peter Brommer
Michael Engel
Franz Gähler
Stephen Hocker
Frohmut Rösch
Johannes Roth

Institut für Theoretische und Angewandte Physik
der Universität Stuttgart Euroschool Ljubljana
26 May 2007
2
Outline

Numerical simulations of matter
Classical molecular dynamics simulations and IMD
Model potentials
Realistic potentials
potfit for EAM
Simulations of physical properties (also CaCd6!)

3
1. Numerical simulations of matter
4
Basic equation for a solid
5
Basic equations continued
6
Ab-initio molecular dynamics
d-Al-Cu-Co
7
2. Classical molecular dynamics simulations and
IMD
8
Intention

Calculate
Motion of particles in a many-body system under
specified interactions in classical approximation

9
Step 1

Fix structure in the form of particle coordinates
Random
Model structure
From real experiment

10
Step 2

Determine interactions
From electronic structure calculations
(ab-initio, force matching)
Model potentials
Potentials two-, three-, many-body

11
Step 3

Fix boundary conditions
Open boundaries
Periodic boundaries
Fixed boundaries
Other (spherical, twisted, Lees-Edwards)

12
Step 4

Solve Newtons equations
Discretize in time
Choose integrator

13
Atomistic Simulations
14
Verlet and Leap-frog algorithm
15
Step 5

Influence from outside
Temperature (numerical thermostats)
Pressure (numerical barostats)
Stress, strain, flow

16
Nosé-Hoover thermostat
17
Volume control barostat
18
Lees-Edwards boundary conditions
19
Step 6

Extract data
Potential energy, kinetic energy, total energy
Free energy
Total and local stress
Displacement fields
Elastic coefficients
Transport coefficients (diffusion, heat)
Correlation functions (static, dynamic)
Diffraction pattern (static, dynamic)

20
Step 7

Visualize data
Direct plot of atoms
Color code for observables
Selective visualization in 3d
Animations

21
Equilibrium problems

Grain boundary structures

Phason dynamics

22
Nonequilibrium problems

Plastic deformation
Fracture
Shock waves

23
IMD (ITAP Molecular Dynamics)

Molecular dynamics program package
Established 1996, continuously improved and
extended since
Easily portable and extendable
Workstations, clusters, massively parallel
supercomputers
Parallelized with Message Passing Interface
Many effective potentials applicable
Simple integrators (Verlet, Leap-frog) with
energy stability over long times
Timesteps a few fs, computation time a few µs
for each time step and atom
Scalable up to thousands of CPUs
Available at
http//www.itap.physik.uni-stuttgart.de/imd

24
World records in particle numbers
25
World records in particle numbers
IBM BlueGene/L, 65.536 nodes with 2 IBM PowerPC
440 processors, 360 Tflop/s
26
3. Model potentialsa) Lennard-Jones
potentialb) Dzugutov potentialc)
Lennard-Jones-Gauss potential
27
Lennard-Jones pair potential
28
Structures with LJ potentials
29
Ground state for LJ-potentials
30
Dzugutov potential
bcc fcc s-phase dodecagonal qc - glass
31
Lennard-Jones-Gauss potential
32
Phase diagram with LJG potential
33
Diffracton pattern decagonal random tiling
34
Phase transition quasicrystal - crystal
35
4. Realistic potentialsa) Advanced pair
potentialsb) Embedded Atom potentialsc) MEAM,
ADP etc.
36
Advanced two-body potentials
37
Embedded-atom potentials (EAM)
38
5. potfit for EAM
39
Embedded-atom potentials (EAM)
potfit Fi, fj, Fij arbitrary
spline-interpolated, parameterized functions with
about 10 nodes
40
potfit

Select reference configurations of a small system
Determine forces between particles, energies and
stresses from quantum mechanics (VASP)
Calculate same data from MD with EAM potentials
Sum squares of differences
Minimize squares by parameter fits Force
matching
Minimization first by Simulated Annealing, then
by Conjugate Gradients

P. Brommer and F. Gähler 2007 Potfit effective
potentials from ab-initio dataModelling Simul.
Mater. Sci. Eng. 15 (3) 295-304
41
6. Simulations of physical propertiesa)
Diffusion in d-Al-Ni-Cob) Dynamical structure
factor for Zn2Mgc) Cracks in NbCr2d)
Order-disorder transition in CaCd6
42
i) Diffusion in d-AlNiCo
43
EAM potential for Al-Ni-Co
44
Moriarty-Widom pair potentials Al-Ni-Co und
Al-Cu-Co
45
Time averaged probability density maps for
d-Al-Ni-Co
46
Diffusion channels in d-Al-Ni-Co
47
Diffusion in d-Al-Ni-Co
48
Arrhenius diagram d-Al-Ni-Co
49
ii) Dynamical structure factor for Zn2Mg
50
Dynamical structure factor from MD model
calculations
51
Dynamical structure factor Zn2Mg
52
iii) Crack propagation in NbCr2
53
EAM potentials for NbCr2
Lattice constant 6.94 Å
ab-initio 6.97 Å C11, C12, C44
300, 181, 55 GPa ab-initio
309, 198, 69 GPa 24000 atoms kBTmelt
0.17 eV experimental kBTmelt 0.176
eV Surfaces stable, no evaporation of atoms
54
Surface reconstruction NbCr2
55
Crack propagation NbCr2
56
iv) Order-disorder transition in CdCa6
57
Cluster structure of CaCd6
58
Multiscale algorithm

Quantum mechanics
Forces, energies, stresses of 34 reference
configurations (phases with less atoms in the
unit cell, expanded, heated). EAM potentials
fitted thus that they reproduce the data.
Molecular dynamics
Structure calculations with different
orientations of the tetrahedra, deformation of
the cluster shells, cluster binding energies Ea
(26 types of two-fold, 16 of three-fold bonds),
250 clusters (5x5x5 cubic cells).
Monte-Carlo simulations
Effective Hamiltonian as sum of the binding
energies. Calculation of equilibrium structures
of a system of 128 clusters for different
temperatures. Sharp jump of internal energy at 89
K! ?S 1 kB per cluster.

59
Order-disorder transition in CaCd6
P. Brommer, F. Gähler, and M. Mihalkovic
2007 Ordering and correlation of cluster
orientations in CaCd6Phil. Mag. in press
60
Order-disorder transition
61
Summary

MD method allows to simulate a large variety of
material properties and dynamical processes at
the atomic level
Large systems accessible Complex Metallic
Alloys!
Necessary Realistic potentials derived from
quantum mechanical calculations
Extensions
in space by hybrid methods
in time by accelerators (MC, HMC, DPD, SRD, )

62
Time scales
63
(No Transcript)
64
Cutoff and neighbour lists

Force calculation O(N2), 80 runtime
Short range potentials allow decomposition into
cells
Only atoms in adjacent cells interact
Each cell pair only once considered
Run time O(N)

65
Stillinger-Weber potentials
66
Microconvergence

Algorithm for energy relaxation
Rapid cooling mechanism

67
Integration of motion
68
Three-body Tersoff potentials
attractive
repulsive
Complicated function of number and type of k atoms
69
Explicit form of Tersoff-potential
70
Fracture planes perpendicular to fivefold axes
71
Long-range interactions(Coulomb- and polar)
By Greengard and Rokhlin Short range
interactions are calculated directly. For long
range interactions a multipole expansion is
performed on an octal tree
By Eastwood Short range interactions are
calculated directly. For long range interactions
Poisson equation is solved on a mesh

Ewald sum method
Reaction field method
Particle-particle/particle-mesh (PPPM)
Fast multipole method

72
Dynamical structure factor Zn2Mg
Longitudinal phonons in the hexagonal plane
73
Simulationskontrolle

Gleichgewicht-Ensembles NVE, NVT, NPT
Nichtgleichgewicht Scherfluss, Dehnung,
Plastische Verformung, Rissausbreitung mit
Stadion-Dämpfung
Steuerung einzelner Atome (Fixierung,
Sonderkräfte)

Datenausgabe