HEADTAIL simulation studies of Landau damping through octupoles in the LHC.
Landau Damping Simulation Models - hsxie.me
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Introduction Linear simulation model Dispersion relation Particle-in-cell Vlasov continuity simulation Nonlinear
Landau Damping Simulation Models
Hua-sheng XIE (�u)§[email protected])
Department of Physics, Institute for Fusion Theory and Simulation,Zhejiang University, Hangzhou 310027, P.R.China
Oct. 9, 2013
Present at: Sichuan University
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Introduction Linear simulation model Dispersion relation Particle-in-cell Vlasov continuity simulation Nonlinear
Content
Introduction
Linear simulation model
Dispersion relation
Particle-in-cell
Vlasov continuity simulation
Nonlinear
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Introduction Linear simulation model Dispersion relation Particle-in-cell Vlasov continuity simulation Nonlinear
Introduction
Landau damping1 is one of the most interesting phenomena foundin plasma physics. However, the mathematical derivation andphysical understanding of it are usually headache, especially forbeginners.
Here, I will tell how to use simple and short codes to study thisphenomena. A shortest code to produce Landau dampingaccurately can be even less than 10 lines!
1I think I can safely say that nobody understands Landau damping fully.
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Introduction Linear simulation model Dispersion relation Particle-in-cell Vlasov continuity simulation Nonlinear
Linear simulation model: equation
We focus on the electrostatic 1D (ES1D) Vlasov-Poisson system(ion immobile).
The simplest method to study Landau damping is solving thefollowing equations
∂tδf = −ikvδf + δE∂v f0, (1a)
ikδE = −∫
δfdv , (1b)
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Introduction Linear simulation model Dispersion relation Particle-in-cell Vlasov continuity simulation Nonlinear
Example code
1 k =0.4 ; dt =0.01; nt =8000; dv =0.1 ; vv=−8:dv : 8 ;2 df0dv=−vv .∗ exp(−vv . ˆ 2 . / 2 ) / s q r t (2∗ p i ) ;3 d f =0.∗ vv +0.1.∗ exp (−(vv−2.0) . ˆ 2 ) ; t t=l i n s p a c e (0 , nt ∗
dt , nt+1) ;4 dE=ze r o s (1 , nt+1) ; dE (1 ) =0.01;5 f o r i t =1: nt6 d f=df+dt .∗(−1 i ∗k .∗ vv .∗ d f+dE( i t ) .∗ df0dv ) ;7 dE( i t +1)=(1 i /k ) ∗sum( d f ) ∗dv ;8 end9 p l o t ( t t , r e a l ( dE) ) ; x l a b e l ( ’ t ’ ) ; y l a b e l ( ’Re (dE) ’ ) ;
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Introduction Linear simulation model Dispersion relation Particle-in-cell Vlasov continuity simulation Nonlinear
Simulation result
0 10 20 30 40 50 60 70 80−0.4
−0.2
0
0.2
0.4
t
Re(
dE)
Figure 1: Linear simulation of Landau damping.
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Introduction Linear simulation model Dispersion relation Particle-in-cell Vlasov continuity simulation Nonlinear
Exercise
Exercise 1: Solving the following fluid equations
∂tδn = −ikδu, (2a)
∂tδu = −δE − 3ikδn, (2b)
ikδE = −δn, (2c)
using the above method to reproduce the Langmuir wave
ω2 = 1 + 3k2. (3)
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Introduction Linear simulation model Dispersion relation Particle-in-cell Vlasov continuity simulation Nonlinear
Dispersion relation
D(k, ω) = 1− 1
k2
∫C
∂f0/∂v
v − ω/kdv = 0, (4)
where C is the Landau integral contour. For Maxwellian
distribution f0 = 1√2π
e−v2
2 , we will meet the well-known plasma
dispersion function (PDF)
ZM(ζ) =1√π
∫C
e−z2
z − ζdz . (5)
Hence, (4) is rewritten to
D(k, ω) = 1− 1
k2
1
2Z ′
M(ζ) = 0. (6)
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Introduction Linear simulation model Dispersion relation Particle-in-cell Vlasov continuity simulation Nonlinear
Numerical solutions
Table 1: Numerical solutions of the Landau damping dispersion relation
kλD ωr/ωpe γr/ωpe
0.1 1.0152 -4.75613E-15
0.2 1.06398 -5.51074E-05
0.3 1.15985 -0.0126204
0.4 1.28506 -0.066128
0.5 1.41566 -0.153359
0.6 1.54571 -0.26411
0.7 1.67387 -0.392401
0.8 1.7999 -0.534552
0.9 1.92387 -0.688109
1.0 2.0459 -0.85133
1.5 2.63233 -1.77571
2 3.18914 -2.8272
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Introduction Linear simulation model Dispersion relation Particle-in-cell Vlasov continuity simulation Nonlinear
Comparison of DR and linear simulationAdding some diagnosis lines to the code. Perfect agreement:ωtheory = 1.28506− 0.066128i and ωsimulation = 1.2849− 0.06627i
0 10 20−0.4
−0.2
0
0.2
0.4
0.6(a) k=0.4, dv=0.019531, dt=0.01
t
δ E
0 10 20−25
−20
−15
−10
t
ln|δ
E|
(b) ωS=1.2849, γS=−0.066265
Re[δ E]
Im[δ E]
simulationtheory
Figure 2: Linear simulation of Landau damping and compared withtheory.
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Introduction Linear simulation model Dispersion relation Particle-in-cell Vlasov continuity simulation Nonlinear
More
Note: Several related topics have been omitted here, e.g.,Case-van Kampen ballistic modes (eigenmode problem),non-physical recurrence effect (the Poincare recurrence) atTR = 2π/(k∆v)[1], solving the dispersion relation with generalequilibrium distribution functions (not limited to Maxwellian),advanced schemes (e.g., 4th R-K), and so on. One can referRef.[2] and references in for more details.
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Introduction Linear simulation model Dispersion relation Particle-in-cell Vlasov continuity simulation Nonlinear
PIC simulation: equations
Normalized equations (Lagrangian approach)
dtxi = vi , (7a)
dtvi = −E (xi ), (7b)
dxE (xj) = 1− n(xj), (7c)
where i = 1, 2, · · · ,Np is particle (marker) label andj = 0, 1, · · · ,Ng − 1 is grid label. The particles i can be everywhere, whereas the field is discrete in grids xj = j∆x . ∆x = L/Ng .Domain 0 < x < L [note:
∫n(x)dx = L], periodic boundary
conditions n(0) = n(L) and⟨E (x)
⟩x
= 0. Any particle crosses theright boundary of the solution domain must reappear at the leftboundary with the same velocity, and vice versa.
The initial probability distribution function [e.g., f0 = 1√2π
e−v2
2 ] is
generated by Np random numbers.
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Introduction Linear simulation model Dispersion relation Particle-in-cell Vlasov continuity simulation Nonlinear
Key steps
Two key steps for PIC are: 1. Field E (xj) on grids to E (xi ) onparticle position; 2. Particle density n(xi ) to grids n(xj). Supposethat the i-th electron lies between the j-th and (j + 1)-thgrid-points, i.e., xj < xi ≤ xj+1. Usually, the below interpolationmethod is used
nj = nj +xj+1 − xi
xj+1 − xj
1
∆x, (8a)
nj+1 = nj+1 +xi − xj
xj+1 − xj
1
∆x. (8b)
The above procedure is repeated from the first particle to the lastparticle. Similar procedure are used to mapping E (xj) to E (xi ).
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Introduction Linear simulation model Dispersion relation Particle-in-cell Vlasov continuity simulation Nonlinear
PIC result
0 5 100
2
4
6
(a) k=0.7, ωtheory
=1.6739−0.3924i
t
Ene
rgy
Ek
Ee
Etot
2 4 6 8 10
−4
−3
−2
−1
(b) ωS=1.7028, γS=−0.43894
Figure 3: PIC simulation of Landau damping (pices1d.m code).
The energy conservation is very well. Real frequency and dampingrate agree roughly with theory. A main drawback of PIC is thenoise. Usually, very large Np is required.
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Introduction Linear simulation model Dispersion relation Particle-in-cell Vlasov continuity simulation Nonlinear
Vlasov continuity simulation: equations
Euler approach.Vlasov equation
∂t f (x , v , t) = −v∂x f − ∂xφ∂v f , (9)
Discrete
f n+1i ,j − f n
i ,j
∆t= −vj
f ni+1,j − f n
i−1,j
2∆x−
φni+1,j − φn
i−1,j
2∆x
f ni ,j+1 − f n
i ,j−1
2∆v,
(10)gives
f n+1i ,j = f n
i ,j−vj
f ni+1,j − f n
i−1,j
2
∆t
∆x−
φni+1,j − φn
i−1,j
2∆x
f ni ,j+1 − f n
i ,j−1
2
∆t
∆v.
(11)Poisson equation
∂2xφ =
∫fdv − 1. (12)
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Introduction Linear simulation model Dispersion relation Particle-in-cell Vlasov continuity simulation Nonlinear
Discrete
φi+1 − 2φi + φi−1
∆x2=
∑j
fi ,j∆v − 1 ≡ ρi , (13)
i.e.,−2 1 0 · · 0 11 −2 1 · · · 00 1 −2 1 · · ·· · · · · · ·1 0 · · · 1 2
φ1
φ2
··
φN
=
ρ1
ρ2
··
ρN
∆x2, (14)
where we have used the periodic boundary condition φ(0) = φ(L),i.e., φ1 = φN+1 and φ0 = φN .
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Introduction Linear simulation model Dispersion relation Particle-in-cell Vlasov continuity simulation Nonlinear
Simualtion results
0 10 20−0.05
0
0.05(a) Momentum v.s. Time
t
P−
<P
>
0 10 20−1
0
1(b) Density v.s. Time
t
n−<
n>
0 10 2010
−10
100
1010(c) k=0.6, ω
theory=1.5457−0.26411i
t
Ene
rgy
Ek
Ee
Etot
5 10 15 20 25−8
−6
−4
−2
(d) ωS=1.535, γS=−0.26977
Figure 4: Vlasov continuity simulation, history plotting (code fkvl1d.m).
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Introduction Linear simulation model Dispersion relation Particle-in-cell Vlasov continuity simulation Nonlinear
x
v
(a) f(x,v), t=24(25)ωpe−1, k=0.6
0 2 4 6 8 10
−5
0
5
−5 0 50
2
4
(b) f(v,t)
v
f
−5 0 5−0.1
−0.05
0
0.05
0.1(c) δf(v,t)
v
δf
0
0.1
0.2
0.3
0.4
Figure 5: Vlasov continuity simulation, distribution function (codefkvl1d.m).
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Introduction Linear simulation model Dispersion relation Particle-in-cell Vlasov continuity simulation Nonlinear
Nonlinear simulations
The PIC and Vlasov codes provided in the above sections can beeasily modified to study the linear and nonlinear physics of thebeam-plasma or two-stream instabilities.
A PIC simulation of two-stream instability is shown in Fig. 6 andFig. 7. The linear growth and nonlinear saturation are very clear.
Exercise 2: Solving the kinetic or fluid dispersion relations forbeam-plasma or two-stream plasma and comparing the results withlinear and nonlinear simulations using the above models.
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Introduction Linear simulation model Dispersion relation Particle-in-cell Vlasov continuity simulation Nonlinear
Simulation result
Figure 6: PIC simulation of the two-stream instability, phase spaceplotting.
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Introduction Linear simulation model Dispersion relation Particle-in-cell Vlasov continuity simulation Nonlinear
Simulation result
0 20 40 600
1
2
3
4
5
t
Ene
rgy
Ek
Ee
Etot
20 40 60
−4
−3
−2
−1
t
ln(E
e1/2 )
Figure 7: PIC simulation of the two-stream instability, history plotting.
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Introduction Linear simulation model Dispersion relation Particle-in-cell Vlasov continuity simulation Nonlinear
C. Z. Cheng and G. Knorr, The integration of the vlasovequation in configuration space, Journal of ComputationalPhysics, 22, 330 - 351, 1976.
H. S. Xie, Generalized Plasma Dispersion Function:One-Solve-All Treatment, Visualizations, and Application toLandau Damping, Phys. Plasmas, 20, 092125, 2013. Also,http://arxiv.org/abs/1305.6476. With codes.