The model under consideration represents a modulable nonlinear electrical transmission line where elementary cell is illustrated in Figure 1 [29] [30] .

Each unit cell, such as the n^th one, contains a linear inductor L 1 in parallel with a linear capacitor C 1 in the series branch and a linear inductor L 2 in parallel with a nonlinear capacitor C ( V n ) in the shunt branch. Here we assume that the logarithmic nonlinearity for the capacitance is given by [32] [33] :

C ( V n ) = V 0 C 0 V n ln ( 1 + V n V 0 ) (1)

where V 0 and C 0 take constant values.

Applying Kirchhoff’s laws to the circuit model, we can obtain the following voltage propagation equations [30] :

( V 0 + V n ) d 2 V n d t 2 − ( d V n d t ) 2 = ( V 0 + V n ) 2 V 0 { ( u 0 2 + C r d 2 d t 2 ) ( V n + 1 + V n − 1 − 2 V n ) − ω 0 2 V n } (2)

where C r = C 1 C 0 , u 0 2 = 1 L 1 C 0 and ω 0 2 = 1 L 2 C 0 . Equation (2) shows that an

additional dispersion coefficient C r is considered on the line. Thereafter, the numerical simulations will consider the following parameters [23] [30] : L 1 = 680   μ H , L 2 = 470   μ H , C 0 = 470   pF and V 0 = 3.9   V .

The capacitor C 1 is considered as a free parameter with physically acceptance value [30] . According to the investigations done in [30] , the parameter C r will impose the behavior of the transmission line. So, they show that when

C r < L 2 L 1 we have the right-handed behavior, but for C r > L 2 L 1 , the transmission line exhibits left-handed behavior. It is important to note that a rapid calculation leads to L 2 L 1 ≈ 0.691 . This situation justifies the name “Chameleon transmission line” because the line changes its behavior but does not modify its external aspect.

The nonlinear Schrödinger equation inspired from [30] , but reformulated in terms of slowly varying envelope of the electric field A ( Z , τ ) as follows [34] :

∂ A ∂ Z = − i Θ 2 2 ∂ 2 A ∂ τ 2 + i ϒ | A | 2 A (3)

where A ( Z , τ ) is the slowly varying envelope of the electric field at position Z = ε ( n − V g t ) and at time τ = ε 2 t [30] . Here ε is a positive and small parameter. The terms Θ 2 and ϒ are second-order dispersion and cubic-nonlinearity, respectively [35] [36] [37] [38] . These above mentioned coefficients are defined as follows [30] :

Θ 2 = − V g 2 2 ω + ( u 0 2 − C r ω 2 ) cos ( k ) − 4 C r V g ω sin ( k ) 2 ω [ 1 + 4 C r sin 2 ( k 2 ) ] (4)

ϒ = 3 ω 2 V 0 2 [ − 1 + 8 C r sin 2 ( k 2 ) 1 + 4 C r sin 2 ( k 2 ) ] . (5)

where the wave number k is taken in the Brillouin zone. This dispersion relation admits two cutoff frequencies at k = 0   rad ⋅ Cell − 1 and k = π   rad ⋅ Cell − 1 [30] . The group velocity is given by [30] :

V g = ( u 0 2 − C r ω 0 2 ) sin ( k ) ω [ 1 + 4 C r sin ( k 2 ) 2 ] 2 . (6)

The group velocity V g plays a key role in the nature of waves.

The collective coordinate’s technique is a great method of characterization of a light pulse intensity profile using ansatz functions [39] [40] . The variational equations are essential to obtain a good description of the light pulse [35] [36] .

The initial conditions at the beginning of the propagation are the same compared to those used in [35] [36] [37] [38] . For the analysis of our optical system the wave number is taken as k = 3   rad ⋅ Cell − 1 . Otherwise, two lengths of propagation will be taken such as Z = 3 × 10 − 24 m and Z = 10 − 6 m . Figures 2-4 show

frequency dependencies of coefficients of Equation (3) for C r = 0 , C r = 0.3 , C r = 1 , C r = 1.5 and C r = 10 . These figures present the variations of second-order dispersion and that of cubic-nonlinearity. In addition, the variations of the product of these two effects are also included. According to the collective coordinate representation, the solid red curve corresponds to the dynamics of collective coordinates obtained from bare approximation (Gaussian Ansatz function) as depicted in Figure 5(a) and Figure 5(b). Further, the dashed black curves represent the collective coordinates coming from minimization. Thus, the dotted green curve gives the residual field energy (RFE) [35] [36] [37] [38] .

Figure 6(a) and Figure 6(b) represent full numerical equations [35] [36] [37] . Moreover, Figure 6(c) and Figure 6(d) show 2D full numerical equations [24] [27] [28] .

The right-handed behavior occurs on the line when 0 ≤ C r < 0.691 [30] . Consequently, two cases will be investigated known as C r = 0 and C r = 0.3 .

The second case of right-handed behavior of the electrical line is considered for C r = 0.3 [30] . When the frequency is considered such as ω = 0.15   rad / s the second-order dispersion coefficient has a weak negative value −10²⁴ ps²∙m⁻¹ and the cubic-nonlinearity presents a strong positive value 1.5 × 10⁻³ W⁻¹∙m⁻¹ as depicted in Figure 2(b) and Figure 2(d). The product of these two effects is Θ 2 ϒ < 0 as illustrated in Figure 3(b). Hence, at low frequencies the dark soliton propagates. The soliton light pulse regains its stability as seen in Figure 7(a). Besides, it appears that the weak negative value of dispersion is completely compensated the strong positive value of the nonlinearity in order to build-up the dark soliton depicted in Figure 7(a). This stability is maintained at high frequencies as illustrated in Figure 7(b) for ω = 0.15   Mrad / s . It clearly appears that the introduction of C r = 0.3 modifies the behavior of the line at low frequencies. In fact, the line acts as a bandpass filter [30] , which totally cleans and cancels the distortions acting at low frequencies as depicted in Figure 7.

The left-handed behavior occurs when C r > 0.691 . Three cases will be investigated corresponding to C r = 1 , C r = 1.5 and C r = 10 . We consider the first mentioned case of left-handed behavior known as C r = 1 . Figure 4(a) presents Θ 2 ϒ < 0

justifying the propagation of dark soliton. The dynamic of collective coordinates originating from Gaussian Ansatz practically reconstruct the behavior exhibited by that coming from minimization as depicted in Figure 8(a). Despite some disparities exhibited by those two dynamic, residual field energy approaches 0.02 percent. This fact suggests that the reconstruction is good as depicted in Figure 8(a) revealing the robustness of the soliton light pulse. This stability and this robustness are clearly maintained at low frequencies when the frequency increases from ω = 0.15   rad / s to ω = 0.25   rad / s as depicted in Figure 8(a) and Figure 9(a). In addition, this stable behavior exhibits its signature as illustrated in Figure 9(c).

Moreover, we consider the significant increase of the length of propagation from Z = 3 × 10 − 24 m to Z = 10 − 6 m . Besides, at high frequencies for ω = 0.25   Mrad / s the dynamics of collective coordinates originating from minimization reconstructs that coming from Gaussian Ansatz as seen in Figure 8(b). The residual field energy confirms the good reconstruction since it reaches 0.2 percent. When the frequency significantly increases from ω = 0.25   Mrad / s to ω = 25   Mrad / s , second-order dispersion and cubic-nonlinearity interact. This situation induces modulational instability leading to the collapse of the dark soliton. This above mentioned modulational instability provokes the coherent build-up of the chaotic waves field depicted in Figure 9(b). Indeed, as previously observed the chaotic waves field presents Akhmediev-Peregrine freak wave and Akhmediev waves trains as depicted in Figure 9(b). The signature of this chaotic waves field is also illustrated in Figure 9(d). However, the aspect of this chaotic waves field is practically identical to that obtained at low frequencies when right-handed propagation was considered as depicted in Figure 9(d) and Figure 6(c). So, the significant increase of the length of propagation from 3 × 10⁻²⁴ m to 10⁻⁶ m induces a considerable decrease of soliton peak power from 2.5 × 10²⁶ W to 7 W.

The propagation is not favorable at high frequencies for left-handed behavior of the line. More so, the behavior of the line has changed. When right-handed behavior occurs the soliton light pulse propagates at high frequencies and it is destroyed at low frequencies. However, when left-handed behavior arrives the soliton light pulse propagates very well at low frequencies and it is totally destroyed at high frequencies. Hence, all these results suggest that the soliton light pulse propagates in opposite sense when the line changes its behavior from right-handed to left-handed. This result allows us to rename this transmission line as chameleon transmission line since its behavior changes without modify its physical aspect. This information is identical to that recently in [30] .

We consider the case of right-handed propagation where C r = 0 at low frequencies. So, we obtain the tree structure depicted in Figure 6(c). This tree structure corresponds to rogue events signature where Akhmediev-Peregrine waves and Akhmediev waves trains appeared. At low frequencies, the rogue events which appear on the rogue signature depicted in Figure 6(c) are completely cancelled when C r = 0.3 as seen in Figure 7(b).

Moreover, when the dimensionless capacitor is neglected ( C r = 0 ) at right-handed behavior, the frequency significantly increases from 0.25 rad/s to 5 Mrad/s. Then, the soliton peak power considerably decreases from 2.5 × 10²⁶ W to 14 × 10²⁰ W. This situation is clearly illustrated in Figure 6(c) and Figure 9(d). So, an increase of frequency implies a decrease of pulse peak power in right-handed behavior of the line. However, if the right-handed propagation is maintained ( C r = 0.3 ), the frequency increases from 0.15 rad/s to 0.15 Mrad/s. Moreover, the soliton peak power also decreases from 10 × 10²⁶ W to 5 × 10³ W as depicted in Figure 7(a) and Figure 7(b). Hence, this behavior of frequency is similar to that above mentioned. If the left-handed behavior ( C r = 1 ) occurs the frequency increases from ω = 0.25   rad / s to ω = 25   Mrad / s . Consequently, the soliton peak power significantly decreases from 6×10²³ W to 7 W as depicted in Figure 9(a) and Figure 9(b). It clearly appears that the influence of frequency on peak power strongly dependant on the value of dimensionless capacitor C r in the case of left-handed behavior.