On the Probability Density Function of Inter-core Crosstalk Power in
Birefringent Homogeneous Multi-core Fibers
Ricardo O. J. Soeiro
1
, Tiago M. F. Alves
1
and Adolfo V. T. Cartaxo
1,2
1
Instituto de Telecomunicac¸
˜
oes, Lisboa 1049-001, Portugal
2
ISCTE - Instituto Universit
´
ario de Lisboa, Lisboa 1649-026, Portugal
Keywords:
Coupled Local Mode Theory, Discrete Changes Model, Dual-polarization, Homogeneous Multi-core Fibers,
Inter-core Crosstalk.
Abstract:
In this paper, the inter-core crosstalk (ICXT) of the polarization directions and the probability density func-
tions (PDFs) of the ICXT power of the polarization directions in weakly coupled birefringent homogeneous
multi-core fibers (MCFs) are studied through numerical simulation. The numerical simulator is based on the
coupled local mode theory (CLMT), which is a rigorous model that has the downside of requiring long com-
putational times to compute the ICXT field and PDFs of the ICXT power. Conversely, a dual-polarization
discrete changes model (DP-DCM) that allows for much faster estimates of the ICXT field is presented. It is
shown that, for perfectly homogeneous MCFs, the mean ICXT power distribution between the polarization di-
rections is similar, despite the power distribution at the MCF input, for a mean linear birefringence parameter
ranging from 10
−7
(low birefringence) to 10
−4
(high birefringence), and for different MCF bending radii. It
is also shown that the mean ICXT power estimates obtained with the CLMT and DP-DCM are very similar.
Furthermore, using the CLMT, the PDFs of the ICXT power of the polarization directions are shown to be
chi-squared distributions with two degrees of freedom, and the PDF of the sum of the ICXT power of the
polarizations is shown to follow a chi-squared distribution with four degrees of freedom.
1 INTRODUCTION
Multi-core fibers (MCFs) have been proposed to in-
crease capacity in long haul transmission (Qian et al.,
2012), access networks and data centers (Lee et al.,
2014). The similar properties of the cores comprising
homogeneous MCFs has been reported as an attrac-
tive feature for signal transmission (Lu
´
ıs et al., 2016),
(Sakaguchi et al., 2013). In particular, with cores with
similar properties, similar propagation times of the
signals transmitted in each core are obtained, which
promotes the use of multi-dimensional spatial mod-
ulation formats (Puttnam et al., 2014), shared re-
ceiver resources (Feuer et al., 2012) and space-coding
techniques (Eriksson et al., 2015). However, the
similar properties of the cores also promotes signif-
icant crosstalk between them, i.e. inter-core crosstalk
(ICXT) (Lu
´
ıs et al., 2016). Significant reduction of
the ICXT power can be achieved by designing the
MCF appropriately, e.g., by increasing the distance
between cores, which has the downside of reducing
the core count, or by enveloping the MCF cores in
trenches, the so-called trench assisted MCFs (Sak-
aguchi et al., 2013).
The previously mentioned constraints and com-
promises led to the proposal of several ICXT estima-
tion models that take into account the parameters of
the MCF, e.g. the core radii, distance between cores,
fiber bending and twisting, and fiber length (Hayashi
et al., 2011), (Macho et al., 2016). The discrete
changes model (DCM) proposed in (Hayashi et al.,
2011) allows to estimate the ICXT while studying its
dependence on the fiber bending, twist and length in
a very fast way. In (Hayashi et al., 2011), the ICXT
is reported to result mostly from the points along the
longitudinal direction of propagation in which the dif-
ference between the effective refractive index of the
interfering and interfered cores is zero. These points
are referred to as phase matching points (PMPs).
Meanwhile, other studies were carried to upgrade the
DCM, e.g. in (Lu
´
ıs et al., 2016) the dependence of
the ICXT on the modulation frequency is included
in the DCM, and in (Cartaxo et al., 2016) the ICXT
dependence on the difference between the dispersion
parameters of the cores is included. In (Soeiro et al.,
2017), the DCM is generalized to a dual-polarization
36
Soeiro, R., Alves, T. and Cartaxo, A.
On the Probability Density Function of Inter-core Crosstalk Power in Birefringent Homogeneous Multi-core Fibers.
DOI: 10.5220/0006542700360042
In Proceedings of the 6th International Conference on Photonics, Optics and Laser Technology (PHOTOPTICS 2018), pages 36-42
ISBN: 978-989-758-286-8
Copyright © 2018 by SCITEPRESS – Science and Technology Publications, Lda. All rights reserved
(DP) scheme. The reason why the DCM has been
upgraded to included other effects can be attributed
to the fast ICXT estimates it provides in compari-
son with other models. In particular, models that rely
on solving the coupled-mode equations numerically
are much more computationally demanding, since the
number of steps required to solve the coupled-mode
equations numerically is much larger than the num-
ber of PMPs required to estimate the ICXT with the
DCM (Cartaxo and Alves, 2017). In (Macho et al.,
2016), the ICXT is estimated with a rigorous coupled
local mode theory (CLMT) model while including the
effects of core birefringence, bending and twisting.
However, the estimates obtained with such model are
much more computationally demanding when com-
pared to the DCM, owing to the necessity of solving
the CLMT equations numerically with a step-size that
can be of the order of the wavelength (≈ 10
−6
m).
In (Hayashi et al., 2012), it is shown experimen-
tally that the probability density function (PDF) of the
total ICXT power, i.e. the PDF of the sum of the
ICXT power of the two polarizations, fits quite well
a chi-squared distribution with four degrees of free-
dom. The following assumptions were proposed to
explain this distribution: i) the four ICXT field com-
ponents (the in-phase and quadrature components of
the two polarization directions) are uncorrelated and
ii) the ICXT power is equally distributed between the
polarization directions, and the variances of the in-
phase and quadrature components of the ICXT field
in the two polarizations are similar.
In this paper, the distribution of the mean ICXT
power between the polarization directions at the MCF
output is analyzed through numerical simulation with
the CLMT model in weakly-coupled birefringent ho-
mogeneous MCFs, for different power distributions at
the MCF input and for different birefringence param-
eters. Additionally, the PDFs of the ICXT power of
the polarization directions and total ICXT power ob-
tained from the CLMT are studied when the power
distribution between the polarization directions at the
MCF input is imposed, in order to assess whether the
PDFs reported in (Hayashi et al., 2012) are observed
under different power distributions between the polar-
ization directions at the MCF input.
2 DISCRETE CHANGES MODEL
WITH DUAL-POLARIZATION
SCHEME
In this section, the DP-DCM proposed in (Soeiro
et al., 2017) is presented. It is considered that, at
the input of a two-core MCF, the slowly varying field
amplitude of the signal to be transmitted in the in-
terfering core m, A
m
(z = 0), where z denotes the
longitudinal direction of propagation, is distributed
between two perpendicular polarization directions, x
and y. The power distribution between the direc-
tions of polarization x and y is controlled by a vari-
able ζ which takes on a real value between 0 and 1.
At the MCF input, the field of each direction of po-
larization is given by A
m,x
(z=0) = A
m
(z=0)·
p
ζ and
A
m,y
(z=0) = A
m
(z=0)·
p
1 −ζ. For ICXT analysis,
it is assumed that all the power is injected in core m,
i.e. A
n
(z = 0) = 0. At the MCF output (z=L, where L
is the MCF length), the field amplitudes of the polar-
ization directions of the interfered core n, A
n,x
(z = L)
and A
n,y
(z = L) are given by (Soeiro et al., 2017):
A
n,x
(z = L) =A
m
(0)·[
p
ζ·F
x,x
+
p
1 −ζ·F
y,x
] (1)
A
n,y
(z = L) =A
m
(0)·[
p
1 −ζ·F
y,y
+
p
ζ·F
x,y
] (2)
where the functions F
x,x
, F
x,y
, F
y,x
and F
y,y
model the
ICXT from the input of the interfering core m to the
output of the interfered core n. In particular, F
x,x
and
F
x,y
model the ICXT from the polarization x of core
m to the polarizations x and y of core n, respectively.
The functions F
y,x
and F
y,y
model the ICXT from the
polarization y of core m to the polarizations x and y
of core n, respectively. These functions include the
impact of the MCF parameters, e.g. fiber bending
and twisting. In general, the functions F are given
by (Soeiro et al., 2017):
F
a,b
=
−j
√
2
·e
−jβ
n
L
·K
0
nm
N
∑
k=1
e
−j(β
m
−β
n
)·z
k
e
−jφ
(a,b)
nm,k
(3)
where a and b ∈ {x, y}, N is the number of PMPs,
K
0
nm
is the discrete coupling coefficient obtained from
Eq. (28) of (Cartaxo and Alves, 2017) while substi-
tuting the inter-core coupling coefficient, κ
nm
, by the
average inter-core coupling coefficient of the polar-
ization directions, κ
nm
= (κ
(x)
nm
+ κ
(y)
nm
)/2. β
m
and β
n
are the average of the propagation constants of the
polarization directions in cores m and n, respectively,
i.e., β
m
= (β
(x)
m
+ β
(y)
m
)/2 and β
n
= (β
(x)
n
+ β
(y)
n
)/2
(Agrawal, 2001). φ
(a,b)
nm,k
is a random variable, uni-
formly distributed between 0 and 2π, that models ran-
dom variations of the MCF parameters (Hayashi et al.,
2011).
The mean ICXT power of the po-
larization directions x and y are given
by hXT
x
i=
|A
n,x
(L)|
2
/|A
m
(0)|
2
and
hXT
y
i=
|A
n,y
(L)|
2
/|A
m
(0)|
2
, respectively, where
h·i is the expected value operator.
On the Probability Density Function of Inter-core Crosstalk Power in Birefringent Homogeneous Multi-core Fibers
37
The DP-DCM was derived under the conditions
that (Soeiro et al., 2017): (i) equal power distribu-
tion between the polarization directions is observed
at the MCF output, i.e. hXT
x
i=hXT
y
i, despite the
value of ζ; (ii) the total mean ICXT power is the
same at the MCF output, despite the value of ζ; (iii)
the in-phase and quadrature components of A
n,x
and
A
n,y
are uncorrelated, and one way to ensure this is
by imposing that the functions F are uncorrelated
between themselves, i.e. hF
x,x
·F
∗
y,y
i = hF
y,x
·F
∗
x,y
i =
hF
x,x
·F
∗
x,y
i = hF
y,x
·F
∗
y,y
i=0 (Soeiro et al., 2017), where
∗
is the complex conjugate. If conditions (i), (ii)
and (iii) are valid, the total mean ICXT power (the
sum of the ICXT power of the polarization directions)
can be estimated from: hXT i = 2hXT
x
i = 2hXT
y
i =
2h|F
a,b
|
2
i = N|K
0
nm
|
2
(Soeiro et al., 2017). More de-
tails regarding the DP-DCM and its derivation can be
found in (Soeiro et al., 2017).
3 NUMERICAL RESULTS AND
DISCUSSION
In this section, the numerical simulator based on the
CLMT is described and the main parameters of the
MCF are presented. The CLMT model is used in sub-
sections 3.1 and 3.2 to analyze the mean ICXT power
distribution between the polarization directions and
the PDFs of the ICXT power of the polarization di-
rections, respectively.
The numerical CLMT considers weakly coupled
linear propagation, modeled by Eq. (17) in (Macho
et al., 2016) with the non-linear terms made zero, and
a two-core MCF. Each core of the MCF is divided into
0 20 40 80 100 140 180 220
−22
−20
−18
−16
−14
−12
−10
Number of segments
Mean ICXT power [dB]
Figure 1: Mean ICXT power as a function of the number of
segments for a two-core perfectly homogeneous MCF with
mean linear birefringence of 2 ×10
−7
, ζ = 1, R
b
= 0.2 m
and f
T
= 0.1 turns/m.
segments, where in each segment a random birefrin-
gence sample, obtained from a Gaussian distribution
(Macho et al., 2016) is generated. The mean value of
the Gaussian distribution, i.e. the mean linear bire-
fringence, ranges between 10
−7
, corresponding to a
case of low-birefringence, and 10
−4
, corresponding
to a case of high-birefringence (Macho et al., 2016).
The standard deviation is 10
−7
. The refractive index
of the cores is 1.4453, and the refractive index of the
cladding is 1.4381. The radii of the cores is 4 µm
and the distance between cores is 30 µm. The MCF
length considered in the numerical results is 200 m
and the wavelength is 1550 nm. At the MCF input
and at the end of each segment the rotation matrix
shown in Eq. (2) of (Wai et al., 1991) is applied to
the fields of each core and polarization. The rotation
matrix is used in order to ensure random polariza-
tion coupling and equal power distribution between
the polarization directions. In each segment, the fiber
twisting and bending effects are modeled by Eq. 19 of
(Macho et al., 2016). In Fig. 1, the total mean ICXT
power (sum of the mean ICXT power of the polariza-
tion directions) is shown as a function of the number
of segments of the cores. The results of Fig. 1 were
obtained for a two-core perfectly homogeneous MCF
with mean linear birefringence of 2×10
−7
, a bending
radius, R
b
= 0.2 m, and a fiber twist, f
T
= 0.1 turns/m.
The number of ICXT samples used to compute the
mean ICXT power was 500 since it was concluded
that this number leads to a large enough sample size
to observe convergence of the mean ICXT power es-
timates, i.e. if more samples were used, similar mean
ICXT power estimates would be observed. The num-
ber of segments required to observe convergence of
the estimated mean ICXT power can be identified
from Fig. 1. In particular, it can be concluded that
40 segments are enough for the mean ICXT power
estimates to stabilize, i.e., if more segments are con-
sidered, the mean ICXT power estimates are similar.
Hence, all the results presented from now on will con-
sider 40 segments per core. Table 1 summarizes the
parameters used in our study.
3.1 Analysis of Mean ICXT Power
Distribution between Polarization
Directions
In this subsection, the power distribution between the
polarization directions is analyzed with the CLMT,
for different power distributions between the polariza-
tion directions at the MCF input and MCF parameters.
The total mean ICXT power, i.e. the sum of the mean
ICXT power of the polarizations at the MCF output
PHOTOPTICS 2018 - 6th International Conference on Photonics, Optics and Laser Technology
38
Table 1: Main parameters of the 2-core MCF.
Parameter Value
Refractive index of cladding 1.4381
Refractive index of core n (n
n
) 1.4453
Refractive index of core m (n
m
) 1.4453
Mean linear birefringence variable
Distance between cores n and m 30 µm
Core radii 4 µm
Bending radius (R
b
) variable
Fiber twist frequency ( f
T
) 0.1 turns/m
Fiber length (L) 200 m
Wavelength 1550 nm
−7 −6.5 −6 −5.5 −5 −4.5 −4
−5
−4
−3
−2
−1
0
1
2
3
4
5
log
10
(Mean linear birefringence)
<XT
x
> / <XT
y
> [dB]
−7 −6.5 −6 −5.5 −5 −4.5 −4
−3
−2
−1
0
1
2
3
4
5
6
7
<XT
x
> / <XT
y
> [dB]
ζ=0
ζ=0.5
ζ=1
R
b
= 0.2 m
R
b
= 1 m
Figure 2: Difference between the mean ICXT power of the
polarizations in the interfered core n as a function of the
mean linear birefringence for different ζ, R
b
= 0.2 and 1 m,
and f
T
= 0.1 turns/m.
is also analyzed, and compared to the estimates of the
DP-DCM.
In Fig. 2, the difference between the mean ICXT
power of the polarizations is shown, in decibel, as a
function of the base-10 logarithm of the mean linear
birefringence, for different ζ and bending radii. In
particular, the results corresponding to the left verti-
cal axis were obtained for R
b
= 0.2 m and the ones
corresponding to the right vertical axis were obtained
for R
b
= 1 m. The remaining parameters employed to
obtain the results of Fig. 2 are similar to the ones of
Fig. 1. From the results of Fig. 2, it is possible to con-
clude that similar power distribution between the po-
larization directions is observed in the interfered core
for different ζ and bending radii, as the maximum dif-
ference of mean ICXT power between the polariza-
tion directions is around 0.5 dB. It should be noted
that the difference of mean ICXT power of the po-
larization directions does not follow a pattern, i.e. in
some cases the polarization x has more power than po-
larization y (hX T
x
i/hXT
y
i > 0 dB), and in other cases
the opposite occurs (hXT
x
i/hXT
y
i < 0 dB). This ob-
servation is important to conclude that the different
ζ, mean linear birefringences and bending radii used
−7 −6.5 −6 −5.5 −5 −4.5 −4
−24
−22
−20
−18
−16
−14
−12
−10
−8
Mean ICXT power [dB]
log
10
(Mean linear birefringence)
ζ=0
ζ=0.5
ζ=1
R
b
= 1 m
R
b
= 0.2 m
Figure 3: Total mean ICXT power (sum of the mean ICXT
power of the x and y polarization directions) as a function of
the mean linear birefringence for different ζ, R
b
= 0.2 and
1 m and f
T
= 0.1 turns/m.
to obtain the results shown in Fig. 2 do not influence
the power distribution between the polarization direc-
tions at the MCF output. The fluctuations observed in
Fig. 2 are attributed to the randomness of the samples.
Fig. 3 shows the total mean ICXT power (the sum
of the mean ICXT power of the polarizations) as a
function of the base-10 logarithm of the mean linear
birefringence, for different ζ and bending radii. The
parameters employed to obtain the results of Fig. 3 are
similar to the ones of Fig. 2. From Fig. 3 it is possi-
ble to conclude that, for each bending radius, the total
mean ICXT power is always around the same value
despite ζ and the mean linear birefringence. Further-
more, the total mean ICXT powers shown in Fig. 3
for each bending radius are very similar to the one
obtained though the DP-DCM introduced in Section
2, approximately -20.4 dB and -13.0 dB for bending
radii of 0.2 m and 1 m, respectively, which shows
the accuracy of the DP-DCM. Furthermore, the re-
sults obtained with the DP-DCM are much less com-
putationally demanding than the ones obtained with
the CLMT. This is attributed to the smaller number
of PMPs required to estimate the mean ICXT power
when compared to the number of steps required to
solve the CLMT equations numerically. In particu-
lar, the mean ICXT estimates obtained with the DP-
DCM considered 40 PMPs, whereas the step required
to solve the CLMT equations numerically was 10
−4
m. Since a MCF of 200 m is considered, the number
of steps used in the CLMT was 200/10
−4
=2 ×10
6
,
which is more than four orders of magnitude above
the number of PMPs considered in the DP-DCM. As
a consequence, the results obtained with the CLMT
can take several days to obtain, whereas the ones ob-
tained with the DP-DCM only take a few seconds.
On the Probability Density Function of Inter-core Crosstalk Power in Birefringent Homogeneous Multi-core Fibers
39
0 0.01 0.02 0.03 0.04
10
−1
10
0
10
1
10
2
10
3
PDF
ICXT power of
polarization x
Theoretical
Simulated
Figure 4: PDF of the ICXT power of polarization x, in
logarithmic scale, considering a mean linear birefringence
of 2 × 10
−7
, ζ = 1, R
b
= 0.2 m and f
T
= 0.1 turns/m.
The curves obtained through numerical simulation with the
CLMT and the corresponding theoretical one are shown.
3.2 Analysis of the PDFs of ICXT
Power of the Polarization Directions
In this subsection, the PDFs of ICXT power of the po-
larization directions are analyzed. The PDF of the to-
tal ICXT power, i.e. the PDF of the sum of the ICXT
power of the polarization directions is also analyzed.
In Figs. 4 and 5, the PDFs of the ICXT power of
polarizations x and y are shown, respectively, obtained
for ζ = 1, a mean linear birefringence of 2 ×10
−7
,
R
b
= 0.2 m, f
T
= 0.1 turns/m and using 125000 sam-
ples of ICXT power. The y-axis of Figs. 4 and 5 is in
logarithmic scale, and the PDFs obtained through nu-
merical simulation with the CLMT are compared with
theoretical ones. In Figs. 4 and 5, the theoretical PDFs
of the ICXT power in x and y polarizations are chi-
squared distributions with two degrees of freedom.
The variances of each one of the field components (in-
phase and quadrature) of the ICXT field in the x and
y polarizations are hXT
x
i/2 and hXT
y
i/2,respectively,
where hXT
x
i and hXT
y
i are computed from the sim-
ulation results. Since hXT
x
i ≈ hXT
y
i, it follows that
the variances of each one of the field components are
also similar. The agreement between the simulation
and theoretical PDFs shown in Figs. 4 and 5 con-
firms Hayashi’s statement that the PDFs of the po-
larization directions should be chi-squared distribu-
tions with two degrees of freedom and similar mean
power (Hayashi et al., 2011), even if all the power is
injected in the x polarization at the MCF input (ζ = 1).
It should be noted that the discrepancy between the
theoretical and simulation curves shown in Figs. 4
and 5 is larger for the tail of the PDF. This is a conse-
0 0.01 0.02 0.03 0.04
10
−1
10
0
10
1
10
2
10
3
PDF
ICXT power of
polarization y
Theoretical
Simulated
Figure 5: PDF of the ICXT power of polarization y, in
logarithmic scale, considering a mean linear birefringence
of 2 × 10
−7
, ζ = 1, R
b
= 0.2 m and f
T
= 0.1 turns/m.
The curves obtained through numerical simulation with the
CLMT and the corresponding theoretical one are shown.
quence of the limited amount of ICXT power samples
obtained through numerical simulation. In particular,
the lower the probability density, the less likely we
are to obtain the corresponding ICXT power through
numerical simulation. Thus, the lower the probabil-
ity density, the larger the total number of samples we
need to consider.
In Fig. 6, the PDF of the sum of the ICXT power
of the polarization directions is shown while consid-
ering the same parameters of Figs. 4 and 5. The y-
axis of Fig. 6 is also in a logarithmic scale, and the
comparison between the PDF obtained through nu-
merical simulation with the theoretical one is also
shown. In Fig. 6, the theoretical PDF curve of the to-
tal ICXT power is obtained from the expression of the
chi-squared distribution with four degrees of freedom.
The variance of each one of the field components (in-
phase and quadrature) of the ICXT field in the x and y
polarizations is (hXT
x
i+ hXT
y
i)/4, where hX T
x
i and
hXT
y
i are obtained from the numerical results. The
PDFs shown in Fig. 6 confirm also Hayashi’s results
(Hayashi et al., 2012), even if all the power is injected
in the x polarization at the MCF input (ζ = 1). Similar
conclusions were drawn for other power distributions
between the polarization directions at the MCF input
and bending radii.
4 CONCLUSIONS
The mean ICXT power distribution between the po-
larization directions and PDFs of the ICXT power of
the polarization directions were analyzed in weakly
coupled birefringent homogeneous MCFs through nu-
PHOTOPTICS 2018 - 6th International Conference on Photonics, Optics and Laser Technology
40
0 0.01 0.02 0.03 0.04
10
−1
10
0
10
1
10
2
PDF
ICXT power of
polarizations x+y
Theoretical
Simulated
Figure 6: PDF of the total ICXT power of the polarization
directions, in logarithmic scale, considering a mean linear
birefringence of 2 ×10
−7
, ζ = 1, R
b
= 0.2 m, f
T
= 0.1
turns/m. The curves obtained through numerical simulation
with the CLMT and the corresponding theoretical one are
shown.
merical simulation. The numerical simulator based on
the CLMT model allowed to conclude that, for per-
fectly homogeneous MCFs, the mean ICXT power
distribution between the polarization directions is
similar, despite the power distribution at the MCF in-
put, for a mean linear birefringence parameter ranging
from 10
−7
(low birefringence) to 10
−4
(high birefrin-
gence), and for different MCF bending radii. It was
also concluded that the total mean ICXT power es-
timates obtained with the CLMT and DP-DCM are
very similar. Additionally, the PDFs of the ICXT
power of the polarization directions obtained with the
CLMT were shown to be chi-squared distributions
with two degrees of freedom, and the PDF of the sum
of the ICXT power of the polarizations was shown
to be a chi-squared distribution with four degrees
of freedom, showing that Hayashi’s results (Hayashi
et al., 2012) are valid for different power distributions
between the polarization directions at the MCF input.
ACKNOWLEDGEMENTS
This work was supported by Fundac¸
˜
ao para a
Ci
ˆ
encia e Tecnologia (FCT), Portugal, under the
project AMEN-UID/EEA/50008/2013 of Instituto de
Telecomunicac¸
˜
oes, and the FCT researcher contract
IF/01225/2015/CP1310/CT0001.
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