Note that in this case the phase of the pulse travels at a velocity of co0/ri0, whereas the envelope of the pulse travels at a velocity of 1 ~ill.. In general, pulses used for optical co
Trang 1This Page Intentionally Left Blank
Trang 2Optical Fiber
I N constant /3 is not proportional to the angular frequency co, that is, M A T H E M A T I C A L TERMS, chromatic dispersion arises because the propagation dfl/dco
constant (independent of co) dfl/dco is denoted by/31, and/311 is called the group velocity As we will see, this is the velocity with which a pulse propagates through the fiber (in the absence of chromatic dispersion) Chromatic dispersion is also called
group velocity dispersion
If we were to launch a pure monochromatic wave at frequency coo into a length
of optical fiber, the magnitude of the (real) electric field vector associated with the wave would be given by
Here the z coordinate is taken to be along the fiber axis, and J (x, y) is the distribution
of the electric field along the fiber cross section and is determined by solving the wave equation This equation can be derived as follows
For the fundamental mode, the longitudinal component is of the form Ez = 27rJl(x, y)exp(i~Sz) Here Jl(x, y) is a function only of p - v / x 2 - + - y2 due to the cylindrical symmetry of the fiber and is expressible in terms of Bessel functions The transverse component of the fundamental mode is of the form Ex(Ey) - 27rJt(x, y)exp(ijSz), where again Jt(x, y) depends only on v/x2+ y 2 and can be expressed in terms of Bessel functions Thus, for each of the solutions corresponding
to the fundamental mode, we can write
731
Trang 3732 PULSE PROPAGATION IN OPTICAL FIBER
where J (x, y) - v/Jl (x, y)2 + ,It ( x , y)2 and the ~ is the unit vector along the direction
of l~(r, co) In this equation, we have explicitly written fl as a function of co to emphasize this dependence In general, J 0 and ~() are also functions of co, but this dependence can be neglected for pulses whose spectral width is much smaller than their center frequency This condition is satisfied by pulses used in optical communication systems Equation (E.1) now follows from (E.2) by taking the inverse Fourier transform
This pure monochromatic wave propagates at a velocity o)o/fl(o)o) This is called the phase velocity of the wave In practice, signals used for optical communication are not monochromatic waves but pulses having a nonzero spectral width To un- derstand how such pulses propagate, consider a pulse consisting of just two spectral components: one at coo + Ao) and the other at coo - Ao) Further assume that Ao) is small so that we may approximate
fl(O)0 -4- AO)) ~ fl0 -+-/~1/NO),
where flo = fl(o)0) and
dt~
0 ) = 6 0 0
The magnitude of the electric field vector associated with such a pulse would be given
by
IE(r, t)l J ( x , y) [cos ((coo + Aco)t fl(co0 + Aog)z) +
cos ((coo- A~o)t- t~(oJo- A~o)z)]
2J(x, y) cos(Acot fil Acoz) cos(coot - floz)
This pulse can be viewed in time t and space z as the product of a very rapidly varying sinusoid, namely, cos(co0t - floz), which is also called the phase of the pulse, and a much more slowly varying envelope, namely, cos(Acot - t31Acoz) Note that in this case the phase of the pulse travels at a velocity of co0/ri0, whereas the envelope of the pulse travels at a velocity of 1 ~ill The quantity co0/ri0 is called the phase velocity of the pulse, and 1 ~ill is called the group velocity
In general, pulses used for optical communication can be represented in this manner as the product of a slowly varying envelope function (of z and t), which is usually not a sinusoid, and a sinusoid of the form cos(co0t - floz), where coo is termed the center frequency of the pulse And just as in the preceding case, the envelope of the pulse propagates at the group velocity, l/ill This concept can be stated more precisely as follows
Trang 4Consider a pulse whose shape, or envelope, is described by A(z, t) and whose center frequency is coo Assume that the pulses have narrow spectral width By this we mean that most of the energy of the pulse is concentrated in a frequency band whose width is negligible compared to the center frequency coo of the pulse This assumption
is usually satisfied for most pulses used in optical communication systems With this assumption, it can be shown that the magnitude of the (real) electric field vector associated with such a pulse is
where 9t[q] denotes the real part of q (see, for example, [Agr97]) Here/30 is the value
of the propagation constant fl at the frequency coo J(x, y) has the same significance
as before It is mathematically convenient to allow the pulse envelope A(z, t) to be complex valued so that it captures not only the change in the pulse shape during prop- agation but also any induced phase shifts Thus if A(z, t) = IA(z, t)lexp(iq)z(z, t)),
the phase of the pulse is given by
To get the description of the actual pulse, we must multiply A ( z , t ) by exp ( - i (coot - floz)) and take the real part We will illustrate this in (E.6)
Here we have also assumed that the pulse is obtained by modulating a nearly monochromatic source at frequency coo This means that the frequency spectrum of the optical source has negligible width compared to the frequency spectrum of the pulse We will consider the effect of relaxing this assumption later in this section
By assuming that the higher derivatives of fi with respect to co are negligible, we can derive the following partial differential equation for the evolution of the pulse shape A(z, t) [Agr97]:
O Z if- fl l ~ -+- -~ f12 - - ~ O
Here,
d2fl ]
& - o = oo"
(E.5)
Note that if 13 were a linear function of co, that is, f12 - 0, then A (z, t) = F ( t - f l l Z ) ,
where F is an arbitrary function that satisfies (E.5) Then A(z, t) = A(O, t - f l l z ) for all
z and t, and arbitrary pulse shapes propagate without change in shape (and at velocity
1 ~ill ) In other words,/f the group velocity is independent o f co, no broadening o f the pulse occurs Thus f12 is the key parameter governing group velocity or chromatic dispersion It is termed the group velocity dispersion parameter or, simply, G VD parameter
Trang 5734 PULSE PROPAGATION IN OPTICAL FIBER
Mathematically, a chirped Gaussian pulse at z = 0 is described by the equation
G(t) - - ~ A o e l+ix (TO) 2 e icoot ]
Aoe } (T0)2
The peak amplitude of the pulse is A0 The parameter To determines the width of the pulse It has the interpretation that it is the half-width of the pulse at the 1/e-intensity point (The intensity of a pulse is the square of its amplitude.) The chirp factor K
determines the degree of chirp of the pulse From (E.4), the phase of this pulse is
O(t) = coot + tot 2
2 #
The instantaneous angular frequency of the pulse is the derivative of the phase and
is given by
d, oo, + v2 + Vo2,
We define the chirp factor of a Gaussian pulse as Tff times the derivative of its instantaneous angular frequency Thus the chirp factor of the pulse described by (E.6) is K This pulse is said to be linearly chirped since the instantaneous angular frequency of the pulse increases or decreases linearly with time t, depending on the sign of the chirp factor x In other words, the chirp factor K is a constant, independent
of time t, for linearly chirped pulses
Let A(z, t) denote a chirped Gaussian pulse as a function of time and distance
At z = 0,
If we solve (E.5) for a chirped Gaussian pulse (so the initial condition for this differential equation is that A (0, t) is given by (E.7)), we get
v/T~ -ifl2z(1 + iK) 2 (T 2 -ifi2z(1 + iK)) "
Trang 6This can be rewritten in the form
Comparing with (E.6), we see that A(z, t) is also the envelope of a chirped Gaussian pulse for all z > 0, and the chirp factor K remains unchanged However, the width
of this pulse increases as z increases if fl2K > 0 This happens because the parameter governing the pulse width is now
- 1
which monotonically increases with increasing z if fi2K > 0 A measure of the pulse broadening at distance z is the ratio Tz/To The analytical expression (2.13) for this ratio follows from (E.10)
So far, we have understood the origins of SPM and CPM and the fact that these effects result in changing the phase of the pulse as a function of its intensity (and the intensity of other pulses at different wavelengths in the case of CPM) To understand the magnitude of this phase change or chirping and how it interacts with chromatic dispersion, we will need to go back and look at the differential equation governing the evolution of the pulse shape as it propagates in the fiber We will also find that this relationship is important in understanding the fundamentals of solitons in Section 2.5
We will consider pulses for which the magnitude of the associated (real) electric field vector is given by (E.3), which is
IE(r, t)l J ( x , y ) ~ [ A ( z , t)e-i(~176176
Recall that J (x, y) is the transverse distribution of the electric field of the fundamental mode dictated by the geometry of the fiber, A ( z , t) is the complex envelope of the pulse, coo is its center frequency, and ~[.] denotes the real part of its argument Let A0 denote the peak amplitude of the pulse, and P0 - A 2 its peak power
Trang 7736 PULSE PROPAGATION IN OPTICAL FIBER
We have seen that the refractive index becomes intensity dependent in the pres- ence of SPM and is given by (2.23) for a plane monochromatic wave For non- monochromatic pulses with envelope A propagating in optical fiber, this relation
must be modified so that the frequency and intensity-dependent refractive index is
now given by
Here, n(co) is the linear refractive index, which is frequency dependent because
of chromatic dispersion, but also intensity independent, and Ae is the effective cross-sectional area of the fiber, typically 50/zm 2 (see Figure 2.15 and the accompa- nying explanation) The expression for the propagation constant (2.22) must also be similarly modified, and the frequency and intensity-dependent propagation constant
is now given by
co hlA] 2
c Ae
Note that in (E.11) and (E.12) when we use the Value t7 - 3.2 x 10 -8/zm2/W, the intensity of the pulse IAI 2 must be expressed in watts (W) We assume this is the case in what follows and will refer to ]AI 2 as the power of the pulse (though, strictly speaking, it is only proportional to the power)
For convenience, we denote
cob 27rt7
c Ae X Ae and thus fi = r + yIAI 2 Comparing this with (E.11), we see that y bears the same
relationship to the propagation constant/3 as the nonlinear index coefficient h does
to the refractive index n Hence, we call 9/the nonlinear propagation coefficient At
a wavelength )~ - 1.55 # m and taking Ae - 50/zm 2, y - 2.6/W-km
To take into account the intensity dependence of the propagation constant, (E.5) must be modified to read
0-~ -~- fl l ~- ~t_ -~ f12 - ~ " - i y I a l 2 A (E.13)
i 32A incorporates the effect of chromatic dispersion, as
In this equation, the term ~/3 2
discussed in Section 2.3, and the term i yIAIZA incorporates the intensity-dependent
phase shift
Since this equation incorporates the effect of chromatic dispersion also, the com- bined effects of chromatic dispersion and SPM on pulse propagation can be analyzed using this equation as the starting point These effects are qualitatively different from that of chromatic dispersion or SPM acting alone
Trang 8In order to understand the relative effects of chromatic dispersion and SPM, it is convenient to introduce the following change of variables:
' , / e o
In these new variables, (E.13) can be written as
O U s g n ( f l 2 ) 02 U N2 2
O~e 2 07, "2
where
1~21/Zo 2"
Equation (E.15) is called the nonlinear Schr6dinger equation (NLSE)
The change of variables introduced by (E.14) has the following interpretation Since the pulse propagates with velocity/31 (in the absence of chromatic dispersion),
t -/31z is the time axis in a reference frame moving with the pulse The variable
r is the time in this reference frame but in units of To, which is a measure of the pulse width The variable ~ measures distance in units of the c h r o m a t i c d i s p e r s i o n
P0 represents the peak power of the pulse, and thus U is the envelope of the pulse normalized to have unit peak power
Note that the quantity 1/yP0 also has the dimensions of length; we call it the
we get LNL 384 kin If the pulse power P0 is increased to 10 roW, the nonlinear length decreases to 38 km The nonlinear length serves as a convenient normalizing measure for the distance z in discussing nonlinear effects, just as the chromatic dispersion length does for the effects of chromatic dispersion Thus the effect of SPM
on pulses can be neglected for pulses propagating over distances z << L N L Then we can write the quantity N introduced in the NLSE as N 2 L D / L N L Thus it is the ratio of the chromatic dispersion and nonlinear lengths When N << 1, the nonlinear length is much larger than the chromatic dispersion length so that the nonlinear effects can be neglected compared to those of chromatic dispersion This amounts
to saying that the third term (the one involving N) in the NLSE can be neglected
In this case, the NLSE reduces to (E.5) for the evolution of pulses in the presence of chromatic dispersion alone, with the change of variables given by (E.14)
The NLSE serves as the starting point for the discussion of the combined effects
of GVD and SPM For arbitrary values of N, the NLSE has to be solved numerically These numerical solutions are important tools for the understanding of the combined
Trang 9738 PULSE PROPAGATION IN OPTICAL FIBER
effects of chromatic dispersion and nonlinearities on pulses and are discussed exten- sively in [Agr95] The qualitative description of these solutions in both the normal and anomalous chromatic dispersion regimes is discussed in Section 2.4.5
We can use (E.13) to estimate the SPM-induced chirp for Gaussian pulses To do this, we neglect the chromatic dispersion term and consider the equation
OA OA _
_
By using the variables r and U introduced in (E.14) instead of t and A, and LNL
(y P0) -1, this reduces to
OU i
Oz LNL
Note that we have not used the change of variable ~ for z since L D is infinite when chromatic dispersion is neglected This equation has the solution
Thus the SPM causes a phase change but no change in the envelope of the pulse Note that the initial pulse envelope U(0, r) is arbitrary; so this is true for all pulse shapes Thus SPM by itself leads only to chirping, regardless of the pulse shape; it
is chromatic dispersion that is responsible for pulse broadening The SPM-induced chirp, however, modifies the pulse-broadening effects of chromatic dispersion
E.3 Soliton Pulse Propagation
In the anomalous chromatic dispersion regime (1.55 #m band for standard single-mode fiber and most dispersion-shifted fibers), the GVD parameter f12 is neg- ative Thus sgn(fl2) - - 1 , and the NLSE of (E.15) can be written as
OU 1 O2U N2
An interesting phenomenon occurs in this anomalous chromatic dispersion regime when N is an integer In this case, the modified NLSE (E.19) can be solved analytically, and the resulting pulse envelope has an amplitude that is independent
of ~e (for N - 1) or periodic in ~e (for N _> 2) This implies that these pulses propa- gate with no change in their widths or with a periodic change in their widths The solutions of this equation are termed solitons, and N is called the order of the soliton
Trang 10It can be verified that the solution of (E.19) corresponding to N = 1 is
The pulse corresponding to this envelope is called the f u n d a m e n t a l sol#on The fundamental soliton pulse and its envelope are sketched in Figure 2.25(a) and (b), respectively (As in the case of chirped Gaussian pulses in Section 2.3, the frequency
of the pulse is shown vastly diminished for the purposes of illustration.)
Note that (in a reference frame moving with the pulse) the magnitude of the fundamental soliton pulse envelope, or the pulse shape, does not change with the distance coordinate z However, the pulse acquires a phase shift that is linear in z as
it propagates
Recall that the order of the soliton, N, is defined by
zP0
N 2 = yPoLD =
1,821/ T~ "
Since Z and/32 are fixed for a given fiber and operating wavelength, for a fixed soliton order, the peak power P0 of the pulse increases as the pulse width To decreases Since operation at very high bit rates requires narrow pulses, this also implies that large peak powers are necessary in soliton communication systems
It can also be verified that the solution of (E.19) corresponding to N = 2 is
cosh 4r + 4 cosh 2r + 3 cos 4~
The magnitude of this normalized pulse envelope is sketched in Figure E 1 as a func- tion of ~ and r The periodicity of the pulse envelope with respect to ~ can be clearly seen from this plot In each period, the pulse envelope first undergoes compression due to the positive chirping induced by SPM and then undergoes broadening, finally regaining its original shape
Further Reading
Pulse propagation is covered in detail in [Agr95] The classic papers by Marcuse [Mar80, Mar81] are a must-read for anyone wishing to dig deeper into the mathe- matics of Gaussian and chirped Gaussian pulse propagation
References
[Agr95] G.P Agrawal Nonlinear Fiber Optics, 2nd edition Academic Press, San Diego,
CA, 1995