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Channel Models for FSO
Prepared by: Falak Shah
Kavish Shah
Guided by: Prof. Dhaval Shah
Table of contents
• Wireless channel model
• Kalmogrov theory
• HVB Model
• Lognormal model
• Modified Rytov Theory
• Gamma gamma channel model
• Negative Exponential model
• K channel model
• I-K channel model
• References
Wireless model for FSO
• The wireless channel model is given by [1],
• Where s = ηI denotes the instantaneous intensity gain.
• x ∈ {0, 1} the OOK modulated signal.
• n ∼ N (0,N0/2) the white Gaussian noise with mean 0 and variance
N0/2 because of random nature of electrons at receiver electronic
circuitry.
• η the effective photo-current conversion ratio of the receiver.
Where η is defined by,
Where 𝛾 is the quantum efficiency of the photo receiver, e the
electron charge, λ the signal wavelength, ℎ𝑝 Plank’s constant and c
is the speed of light.
• I is the irradiance And definition of I will change according to
models.
y sx n Ix n   
p
e
h c

 
Kalmogrov theory
• Eddies are vortex due to flow of wind at any geographical location and
are main cause of turbulence.
• Kolmogorov’s theory describes how energy is transferred from larger to
smaller eddies and how much energy is dissipated by eddies of each
size. Atmospheric turbulence is derived using Kalmogorov theory as,
• Where L0 and l0 are large and small eddy size of 10-100 m and 1 cm,
respectively, 𝐶 𝑛
2 is the refractive index parameter giving the spatial
frequency based on geographical location, altitude and time of day.
Values of 𝐶 𝑛
2 [2] for different turbulence levels like weak turbulence,
moderate turbulence and strong turbulence:
= 10-17 m-2/3 for weak turbulence
= 10-15 m-2/3 for moderate turbulence
= 10-13 m-2/3 for strong turbulence
 
11
2 3
0 0
1 1
Ø =0.033 , wheren nC
L l
  

2
nC
Hufnagel valley boundary theorem
• Refractive index structure parameter is almost constant for
horizontal path propagation. But in vertical path propagation,
temperature gradient is different at different altitude so it varies
with altitude.. The mathematical model of HVB is as shown below,
• Where a1= 5.94 x 10-23, a2= 2.7 x 10-16,
• s1=1000 m, s2= 1500 m, s3= 100 m
• h is altitude (m),
• V is the rms wind speed in m/s. The refractive index structure
parameter versus the altitude, h has been shown in figure for HVB-
21 model with V= 21 m/s.
• For different values of 𝑛
2(0), 𝐶 𝑛
2 decreases with increasing height
and is nearly independent of 𝐶 𝑛
2(0) for altitude greater than 1 km.
   
102
2 2
1 2
1 1 2 3
exp exp 0 exp
27
n n
V h h h h
C h a a C
s s s s
       
            
         
HVB-21 model Cn
2 variation
Scintillation Index
• Scintillation is caused by small temperature variations in the
atmosphere, which results in index of refraction fluctuations.
• Scintillation is defined by, S
• where I denote irradiance that is the received intensity of the
optical field after passing it through turbulent medium.
• Based on the value of S, turbulence can be identified as strong or
weak.
Lognormal Channel
• In lognormal channel model, irradiance I is
• Where, Z is the Gaussian distribution with Mean 0 and variance σ2.
• So, I will follow log-normal distribution with
mean
and variance [3] .
• Based on the relation,
• we obtain and for summing this, we use power series to
obtain BER equation as,
2z
I e
2
2
e 
2 2
4 4
( 1)e e 

 
 
 σx (2k 1)/2
22
2 1 /2
0
4 1 σx1 1 ( 1) g
exp( )
2 22 2 1 !
k
k
k
k
e
k k








, ), (Pe L g x 
I



( )P 
Lognormal Channel
• Where Pe,L is bit error rate probability which is a function of ϒg
(signal to noise ratio) and σx (fading intensity).SNR can be calculated
by,
• Where, R is responsivity of receiver,
• P is transmitted power.
• σ1 and σ0 are standard deviation of noise currents for symbols ‘1’
and ‘0’.
• The above equation of SNR can be expressed in terms of h for
fading channels as,
2 2
2
4
( 1 0)
R P
SNR
 


2 2 2
2
4
( 1 0)
h R P
SNR
 


Simulation BER v/s SNR lognormal
Performance of perfect CSI at receiver for log-normal channel model
Lognormal with imperfect CSI
• Gauss-Markov Model is described as,
• Using h1 instead of h in BER equation, we have got comparison of
with CSI and without CSI as below,
2
1 1h wh   
Modified Rytov Theory
• Andrews proposed the modified Rytov theory [4,5], which defines
the optical field as,
• Where are statistically independent complex
perturbations which are due only to large-scale and small-scale
atmospheric effects, respectively.
• The perturbation ψ 1(r, L)= χ1(r, L)+ jξ1(r, L) is a complex Gaussian
random process
• U0(r, L) is the optical field in the absence of turbulence
• where r is the observation point in transverse plane at propagation
distance L,
0( , ) ( , )exp( ( , ) ( , ))x yU r L U r L r L r L   
( , )& ( , )x yr L r L 
Gamma Gamma Channel
• Specifically, in [6], gamma pdf is used to model both small-scale and
large scale fluctuations, leading to the so-called gamma-gamma
pdf,
• Where Ka(.) is the modified Bessel function of second kind of order
a. α and are the effective number of small scale and large scale
eddies of the scattering environment.
1
2
2 12/5 7/6
0.49
exp 1
(1 0.18 0.56 )d




  
   
   
1
2 12/5 5/6
2 2 12/5 5/6
0.51 (1 0.69 )
exp 1
(1 0.9 0.62 )d d
 




  
   
   

   
( )( )/2
1
2
2( )
2 ; 0
( ) ( )
P I I K I I
  
 


 


 
 
Gamma gamma channel
• Now from this result, we can find the BER performance of scheme
as,
• Where D(θ) is given by,
• Where c1 is given by,
• τ = Es/N0
• And c2 is given by,
 
/2 6
2 2
0
1 ( )
(1 2 )
b
D
P d
D



 


4
2 5
4 2 4
2 2
( ) 2 1 ( ) (2 )
c sin c sin
D c K
 
   
 
  

  

  

 
  
 
 
1
1
( )
2
c
 
 




 
3
2
1 1 1
2 ( ( )
2 16 2
c   

   
BER v/s SNR for gamma gamma
Negative exponential model
• In strong turbulence, more irradiance fluctuations.
• Where link length spans several kilometers, number of independent
scatter become large.
• Signal amplitude - Rayleigh fading distribution,
Signal intensity - negative exponential statistics.
• Where I0 is mean radiance of channel.
0 0
1
( ) exp ; 0P I where
I I
I
I
 
   
 
K Channel model
• For strong turbulence channels.
• Excellent similarity between theoretical and experimental values.
• pdf of irradiance - governed by the negative exponential
distribution [8].
• Where is mean irradiance of channel.
1 1
exp ; 0I
I
f whereI
   
   
     
   

K Channel model
   
1
exp ; 0
( )
f where
 

 
  


  

  1
0
t
e t dt


 
  
 
1 1
2 2
11
4
2 2
( )
I
K I
 





 


 IP I 
   
0
*I I
I
P I f f dI




 
  
 

This integration results as,
We can find pdf of I as follows,
Converting the above equation,
K Channel model
1 3
2 4
11
4
2
( )
K
 

  

 

 

 
 
 
 
 P  
2
0
( [ ])E I
N
 
 CP C 
2log (1 )C B SNR  
1 3
2 4
11
4
ln(2) (2 1) (2 1)
2
( )2
C C
B B
C
B
K
 



 
 

 
  
 
  
 
 
0
Cout
Cr P C dC 
Using a simple transformation, SNR is obtained as,
Using the equation of Chanel capacity,
Pdf of C is,
I-K Channel model
• In both scenarios- weak turbulence and strong turbulence.
• Less computation complexity than gamma-gamma channel model.
• This channel model is preferred over others [8].
• The PDF of normalized signal irradiance is given as,
   
  
   
  
1
2
1
1
1
2
1
1
1
2 1 2
2 1 ;
1
1
2 1 2
2 1 ;
1
K
I I forI
I
K I forI







  


 


  


 








       

  
 

  
    
  

  

 IP I 
I-K Channel model
• Again using a simple transformation, SNR is obtained as,
   
 
   
 
31
42
11
4
2
1 2
31
42
11
4
2
1 2
1
2 1 2
2 1 ;
(1 )
1
2 1 2
2 1 ;
(1 )
K
I for
I
K for






 
  


  
  
 
 
  


  
  
 







      


       
  

  
   
  

  
   
  
 
 P  
I-K channel model
2log (1 )C B SNR  
   
 
   
 
31
/ 1 / 42
111
4
/ 2
1 2 2
31
/ 1 / 42
111
4
/
1
2 (2) 1 (2 1)
1 2
2 1 1
2 1 log
(1 )
( )
2 (2) 1 (2 1)
1 2
2 1
2 1
C B C B
C B
c
C B C B
C B
ln
K
B
I for C B
P c
ln
I
B
K







 
 

 
 
 

 
 

 









  
  
 
    
  
 

  
  
 
  


2
2 2
1
log
(1 )
for C B
 















    
 
Using equation of channel capacity,
The pdf of capacity can be given as,
I-K channel model
 
0
Cout
Cr P C dC 
 
 
 
 
/ 42
1
/ 2
2 2
1
/ 42
1
/ 2
2 2
1 (2 1)
2 2
2 1 1
2 1 ; log
(1 )
1 (2 1)
1 2 (1 ) 2
2 1 1
2 1 ; log
(1 )
Cout B
Cout B
Cout B
Cout B
K
I Cout B
r
I
K Cout B







 
 
 
 
 

  
 
 
 
 





      
    
  
 
 
  
   
 
    
  
 












Outage probability can be found using channel capacity as,
Value of outage probability can be shown as,
Summary
• Lognormal channel model is used in weak turbulence scenario
and key factor is .
• Gamma-Gamma channel model is used in weak to strong
turbulence scenario and key factors are .
• K channel model is used in strong turbulence scenario and key
factor is
• I-K channel model is used in strong turbulence scenario and
key factor is .
, 



Reference
1. Murat Uysal, Jing (Tiffany) Li, Error Rate Performance of Coded Free-Space Optical
Links over Gamma-Gamma Turbulence Channels, Communications, 2004 IEEE
International Conference, 20-24 June 2004, 3331 - 3335 Vol.6.
2. ARNON S.: ‘Optical wireless communications’, chapter in the Encyclopedia of
Optical Engineering (EOE), R.G. DRIGGERS (ED.) (Marcel Dekker, 2003), pp. 1866–
1886
3. Hassan Moradi, Maryam Falahpour, Hazem H. Refai, Peter G. LoPresti, Mohammed
Atiquzzaman, BER Analysis of Optical Wireless Signals through Lognormal Fading
Channels with Perfect CSI, Telecommunications (ICT), 2010 IEEE 17th International
Conference Publications, 493 – 497..
4. L. C. Andrews, R. L. Phillips, C. Y. Hopen and M. A. Al-Habash, “Theory of optical
scintillation”, Journal of Optical Society America A, vol. 16, no.6, p. 1417-1429,
June 1999.
5. L. C. Andrews, R. L. Phillips and C. Y. Hopen, “Aperture averaging of optical
scintillations: Power fluctuations and the temporal spectrum”, Waves Random
Media, vol. 10, p. 53-70, 2000.
References
6. M. A. Al-Habash, L. C. Andrews and R. L. Phillips, “Mathematical model for the
irradiance probability density function of a laser beam propagating through
turbulent media”, Optical Engineering, vol. 40, no. 8, p. 1554-1562, August 2001
7. LETZEPIS, N., FABREGAS, A. G. Outage probability of the free space optical channel
with doubly stochastic scintillation. IEEE Transactions on Communications, 2009,
vol. 57, no. 10.
8. Hector E. NISTAZAKIS, Andreas D. TSIGOPOULOS, Michalis P. HANIAS, Christos. D.
PSYCHOGIOS, Dimitris MARINOS, Costas AIDINIS, George S. TOMBRAS, Estimation
of Outage Capacity for Free Space Optical Links over I-K and K Turbulent Channels,
RADIOENGINEERING, VOL. 20, NO. 2, JUNE 2011.

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Channel models for fso

  • 1. Channel Models for FSO Prepared by: Falak Shah Kavish Shah Guided by: Prof. Dhaval Shah
  • 2. Table of contents • Wireless channel model • Kalmogrov theory • HVB Model • Lognormal model • Modified Rytov Theory • Gamma gamma channel model • Negative Exponential model • K channel model • I-K channel model • References
  • 3. Wireless model for FSO • The wireless channel model is given by [1], • Where s = ηI denotes the instantaneous intensity gain. • x ∈ {0, 1} the OOK modulated signal. • n ∼ N (0,N0/2) the white Gaussian noise with mean 0 and variance N0/2 because of random nature of electrons at receiver electronic circuitry. • η the effective photo-current conversion ratio of the receiver. Where η is defined by, Where 𝛾 is the quantum efficiency of the photo receiver, e the electron charge, λ the signal wavelength, ℎ𝑝 Plank’s constant and c is the speed of light. • I is the irradiance And definition of I will change according to models. y sx n Ix n    p e h c   
  • 4. Kalmogrov theory • Eddies are vortex due to flow of wind at any geographical location and are main cause of turbulence. • Kolmogorov’s theory describes how energy is transferred from larger to smaller eddies and how much energy is dissipated by eddies of each size. Atmospheric turbulence is derived using Kalmogorov theory as, • Where L0 and l0 are large and small eddy size of 10-100 m and 1 cm, respectively, 𝐶 𝑛 2 is the refractive index parameter giving the spatial frequency based on geographical location, altitude and time of day. Values of 𝐶 𝑛 2 [2] for different turbulence levels like weak turbulence, moderate turbulence and strong turbulence: = 10-17 m-2/3 for weak turbulence = 10-15 m-2/3 for moderate turbulence = 10-13 m-2/3 for strong turbulence   11 2 3 0 0 1 1 Ø =0.033 , wheren nC L l     2 nC
  • 5. Hufnagel valley boundary theorem • Refractive index structure parameter is almost constant for horizontal path propagation. But in vertical path propagation, temperature gradient is different at different altitude so it varies with altitude.. The mathematical model of HVB is as shown below, • Where a1= 5.94 x 10-23, a2= 2.7 x 10-16, • s1=1000 m, s2= 1500 m, s3= 100 m • h is altitude (m), • V is the rms wind speed in m/s. The refractive index structure parameter versus the altitude, h has been shown in figure for HVB- 21 model with V= 21 m/s. • For different values of 𝑛 2(0), 𝐶 𝑛 2 decreases with increasing height and is nearly independent of 𝐶 𝑛 2(0) for altitude greater than 1 km.     102 2 2 1 2 1 1 2 3 exp exp 0 exp 27 n n V h h h h C h a a C s s s s                               
  • 6. HVB-21 model Cn 2 variation
  • 7. Scintillation Index • Scintillation is caused by small temperature variations in the atmosphere, which results in index of refraction fluctuations. • Scintillation is defined by, S • where I denote irradiance that is the received intensity of the optical field after passing it through turbulent medium. • Based on the value of S, turbulence can be identified as strong or weak.
  • 8. Lognormal Channel • In lognormal channel model, irradiance I is • Where, Z is the Gaussian distribution with Mean 0 and variance σ2. • So, I will follow log-normal distribution with mean and variance [3] . • Based on the relation, • we obtain and for summing this, we use power series to obtain BER equation as, 2z I e 2 2 e  2 2 4 4 ( 1)e e        σx (2k 1)/2 22 2 1 /2 0 4 1 σx1 1 ( 1) g exp( ) 2 22 2 1 ! k k k k e k k         , ), (Pe L g x  I    ( )P 
  • 9. Lognormal Channel • Where Pe,L is bit error rate probability which is a function of ϒg (signal to noise ratio) and σx (fading intensity).SNR can be calculated by, • Where, R is responsivity of receiver, • P is transmitted power. • σ1 and σ0 are standard deviation of noise currents for symbols ‘1’ and ‘0’. • The above equation of SNR can be expressed in terms of h for fading channels as, 2 2 2 4 ( 1 0) R P SNR     2 2 2 2 4 ( 1 0) h R P SNR    
  • 10. Simulation BER v/s SNR lognormal Performance of perfect CSI at receiver for log-normal channel model
  • 11. Lognormal with imperfect CSI • Gauss-Markov Model is described as, • Using h1 instead of h in BER equation, we have got comparison of with CSI and without CSI as below, 2 1 1h wh   
  • 12. Modified Rytov Theory • Andrews proposed the modified Rytov theory [4,5], which defines the optical field as, • Where are statistically independent complex perturbations which are due only to large-scale and small-scale atmospheric effects, respectively. • The perturbation ψ 1(r, L)= χ1(r, L)+ jξ1(r, L) is a complex Gaussian random process • U0(r, L) is the optical field in the absence of turbulence • where r is the observation point in transverse plane at propagation distance L, 0( , ) ( , )exp( ( , ) ( , ))x yU r L U r L r L r L    ( , )& ( , )x yr L r L 
  • 13. Gamma Gamma Channel • Specifically, in [6], gamma pdf is used to model both small-scale and large scale fluctuations, leading to the so-called gamma-gamma pdf, • Where Ka(.) is the modified Bessel function of second kind of order a. α and are the effective number of small scale and large scale eddies of the scattering environment. 1 2 2 12/5 7/6 0.49 exp 1 (1 0.18 0.56 )d                1 2 12/5 5/6 2 2 12/5 5/6 0.51 (1 0.69 ) exp 1 (1 0.9 0.62 )d d                       ( )( )/2 1 2 2( ) 2 ; 0 ( ) ( ) P I I K I I               
  • 14. Gamma gamma channel • Now from this result, we can find the BER performance of scheme as, • Where D(θ) is given by, • Where c1 is given by, • τ = Es/N0 • And c2 is given by,   /2 6 2 2 0 1 ( ) (1 2 ) b D P d D        4 2 5 4 2 4 2 2 ( ) 2 1 ( ) (2 ) c sin c sin D c K                              1 1 ( ) 2 c           3 2 1 1 1 2 ( ( ) 2 16 2 c        
  • 15. BER v/s SNR for gamma gamma
  • 16. Negative exponential model • In strong turbulence, more irradiance fluctuations. • Where link length spans several kilometers, number of independent scatter become large. • Signal amplitude - Rayleigh fading distribution, Signal intensity - negative exponential statistics. • Where I0 is mean radiance of channel. 0 0 1 ( ) exp ; 0P I where I I I I        
  • 17. K Channel model • For strong turbulence channels. • Excellent similarity between theoretical and experimental values. • pdf of irradiance - governed by the negative exponential distribution [8]. • Where is mean irradiance of channel. 1 1 exp ; 0I I f whereI                   
  • 18. K Channel model     1 exp ; 0 ( ) f where                 1 0 t e t dt          1 1 2 2 11 4 2 2 ( ) I K I             IP I      0 *I I I P I f f dI             This integration results as, We can find pdf of I as follows, Converting the above equation,
  • 19. K Channel model 1 3 2 4 11 4 2 ( ) K                       P   2 0 ( [ ])E I N    CP C  2log (1 )C B SNR   1 3 2 4 11 4 ln(2) (2 1) (2 1) 2 ( )2 C C B B C B K                         0 Cout Cr P C dC  Using a simple transformation, SNR is obtained as, Using the equation of Chanel capacity, Pdf of C is,
  • 20. I-K Channel model • In both scenarios- weak turbulence and strong turbulence. • Less computation complexity than gamma-gamma channel model. • This channel model is preferred over others [8]. • The PDF of normalized signal irradiance is given as,               1 2 1 1 1 2 1 1 1 2 1 2 2 1 ; 1 1 2 1 2 2 1 ; 1 K I I forI I K I forI                                                                IP I 
  • 21. I-K Channel model • Again using a simple transformation, SNR is obtained as,             31 42 11 4 2 1 2 31 42 11 4 2 1 2 1 2 1 2 2 1 ; (1 ) 1 2 1 2 2 1 ; (1 ) K I for I K for                                                                                         P  
  • 22. I-K channel model 2log (1 )C B SNR               31 / 1 / 42 111 4 / 2 1 2 2 31 / 1 / 42 111 4 / 1 2 (2) 1 (2 1) 1 2 2 1 1 2 1 log (1 ) ( ) 2 (2) 1 (2 1) 1 2 2 1 2 1 C B C B C B c C B C B C B ln K B I for C B P c ln I B K                                                                    2 2 2 1 log (1 ) for C B                         Using equation of channel capacity, The pdf of capacity can be given as,
  • 23. I-K channel model   0 Cout Cr P C dC          / 42 1 / 2 2 2 1 / 42 1 / 2 2 2 1 (2 1) 2 2 2 1 1 2 1 ; log (1 ) 1 (2 1) 1 2 (1 ) 2 2 1 1 2 1 ; log (1 ) Cout B Cout B Cout B Cout B K I Cout B r I K Cout B                                                                                     Outage probability can be found using channel capacity as, Value of outage probability can be shown as,
  • 24. Summary • Lognormal channel model is used in weak turbulence scenario and key factor is . • Gamma-Gamma channel model is used in weak to strong turbulence scenario and key factors are . • K channel model is used in strong turbulence scenario and key factor is • I-K channel model is used in strong turbulence scenario and key factor is . ,    
  • 25. Reference 1. Murat Uysal, Jing (Tiffany) Li, Error Rate Performance of Coded Free-Space Optical Links over Gamma-Gamma Turbulence Channels, Communications, 2004 IEEE International Conference, 20-24 June 2004, 3331 - 3335 Vol.6. 2. ARNON S.: ‘Optical wireless communications’, chapter in the Encyclopedia of Optical Engineering (EOE), R.G. DRIGGERS (ED.) (Marcel Dekker, 2003), pp. 1866– 1886 3. Hassan Moradi, Maryam Falahpour, Hazem H. Refai, Peter G. LoPresti, Mohammed Atiquzzaman, BER Analysis of Optical Wireless Signals through Lognormal Fading Channels with Perfect CSI, Telecommunications (ICT), 2010 IEEE 17th International Conference Publications, 493 – 497.. 4. L. C. Andrews, R. L. Phillips, C. Y. Hopen and M. A. Al-Habash, “Theory of optical scintillation”, Journal of Optical Society America A, vol. 16, no.6, p. 1417-1429, June 1999. 5. L. C. Andrews, R. L. Phillips and C. Y. Hopen, “Aperture averaging of optical scintillations: Power fluctuations and the temporal spectrum”, Waves Random Media, vol. 10, p. 53-70, 2000.
  • 26. References 6. M. A. Al-Habash, L. C. Andrews and R. L. Phillips, “Mathematical model for the irradiance probability density function of a laser beam propagating through turbulent media”, Optical Engineering, vol. 40, no. 8, p. 1554-1562, August 2001 7. LETZEPIS, N., FABREGAS, A. G. Outage probability of the free space optical channel with doubly stochastic scintillation. IEEE Transactions on Communications, 2009, vol. 57, no. 10. 8. Hector E. NISTAZAKIS, Andreas D. TSIGOPOULOS, Michalis P. HANIAS, Christos. D. PSYCHOGIOS, Dimitris MARINOS, Costas AIDINIS, George S. TOMBRAS, Estimation of Outage Capacity for Free Space Optical Links over I-K and K Turbulent Channels, RADIOENGINEERING, VOL. 20, NO. 2, JUNE 2011.