From chaos to stability in soliton mode-locked fiber laser system

Sharif, M. A.; Ashabi, K.; Sharif, M. A.; Ashabi, K.

doi:10.31349/revmexfis.67.061301

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Revista mexicana de física

versión impresa ISSN 0035-001X

Rev. mex. fis. vol.67 no.6 México nov./dic. 2021 Epub 14-Mar-2022

https://doi.org/10.31349/revmexfis.67.061301

Research

Optics

From chaos to stability in soliton mode-locked fiber laser system

M. A. Sharif^a

K. Ashabi^b

^{^a}Urmia University of Technology, Faculty of Electrical engineering, Optics and Laser engineering group, Band road, Urmia, Iran, 5716617165.e-mail: m.abdolahisharif@ee.uut.ac.ir

^{^b}MEAPAC Service, L.L.C. One Research Court Suite 450, Rockville, MD 2850, United States.

Abstract

Intracavity energy rate in a soliton mode-locked fiber laser is derived by solving the Haus master equation. The influence of net gain, absorber response, saturation energy, nonlinearity and absorption are investigated on stable/unstable states. Intracavity modes include the zeroth, first and higher order solitons. Accordingly, chaotic regime as well as breather modes is recognized as a conventional intracavity state. However, tuning the control parameters also results in a reverse bifurcation and thus returning to a stable state. Accordingly, a chaos-based encryption/decryption system is proposed taking the advantage of using a single-side control process; both the encryption and decryption procedures can be achieved by one of the actions of increasing/decreasing the control parameters.

Keywords: Soliton mode-locked fiber laser; chaos; stability; breather solution

1.Introduction

Due to their outstanding features including the high gain efficiency, high power, low fabrication cost and compactness, soliton mode-locked fiber lasers have been known as essential tools for many applications like the pulse generation, optical communication, laser hardening, cutting and engraving ¹^-⁶. Meanwhile, nonlinear dynamical stability analysis is an important point which has been contemplated through different studies. One crucial issue is the period doubling, a route to chaos which has been experimentally and theoretically demonstrated in soliton mode-locked fiber lasers ⁷^-⁹.

In the nonlinear optical systems, the procedure of route to chaos begins with quasi-periodic state and then, proceeds within the form of an unstable state with exponential growing amplitude and unpredictable behaviour. Although chaos emerges as an instability in the laser output, it can be used as a basis for particular applications like the secure optical communication whereas the encryption procedure is based on interfering a chaotic map ¹⁰^-¹². In spite of this, decryption stage needs the reverse chaotic map which can be hardly implemented.

In this study, the Haus-master equation is considered for deriving the intracavity energy rate in a soliton mode-locked fiber laser. The influences of absorber response, nonlinearity and gain are then investigated on the intracavity energy rate to determine the stable/unstable states. It is shown that the breather modes (higher order solitons) are most likely formed in consequence of the high gain/large nonlinearity and chaotic regime is thus, a conventional intracavity energy state. Finally, a procedure of reverse bifurcation is deduced and accordingly proposed for a convenient decryption procedure in chaos-based optical communication.

2.Theory

Soliton formation is considered as the main mechanism of pulse shaping in a soliton mode-locked fiber laser. Intracavity nonlinear dynamics can be described by the Haus master equation as given in Eq.(1) ¹³^-¹⁷.

TR∂A(T,t)∂T=-iD∂2A∂t2+iγ|A|2A+g-l+Dg∂2∂t2-q(T,t)A(T,t), (1)

where A(T,t) is the slowly varying pulse amplitude; T is the time scaled to one cavity round trip T_R;t is the time scaled to pulse duration τ. It should be noticed that T and T are independent and intrinsically irrelevant parameters. D is the Group Velocity Dispersion (GVD) and D_g is the gain dispersion; γ is the nonlinear coefficient standing for the effect Self Phase Modulation (SPM); g and l are respectively the gain and loss indices respectively and q(T,t) is the response of the absorber. For simplicity, g- l is substituted by the quantity net gain gNET. Consecutively, the pulse energy can be written as Eq.(2).

E=∫-TR/2TR/2|A(T,t)|2dt. (2)

Moreover, energy rate equation is proved to be written as Eq.(3) ¹³^-¹⁷.

TR∂E∂T=2gNET-2q(E), (3)

in which

gNET=g0,NET1+E/Es

where g0,NET is the primary net gain value and E_s is neglected. is the saturation energy of the absorber. If the cavity possesses a slow saturable absorber, the minimum energy needed for the pulse formation can be obtained by Eq.(4) ¹³^-¹⁷.

Esmin=qMEsαTPA3, (4)

where qM is the maximum absorber response and αTPA is defined to measures the two-photon absorption using Eq. (5) ¹³^-¹⁷.

αTPA∝αγ12D, (5)

where α is the absorption due to the Rayleigh scattering. If the competition between GVD and SPM is balanced in (1), intracavity steady state will be the result. In this case, pulse duration is shown to be given as Eq,(6) ¹³^-¹⁷.

τ=4|D|γE, (6)

for which the pulse shape can then be obtained by Eq.(7).

f(t)=12τsechtτ. (7)

This solitary solution is resulted for the first order solitons.

For a slow saturable absorber, the energy rate is obtained in terms of T as given byEq. (8) ¹³^-¹⁷.

E(T)=12g0,NET1+E(T-TR)Es×(1-qMcos⁡[πE{T-TR}])E(T-TR). (8)

The total absorber response is a combination of saturable and inverse saturable contributions as presented in Eq.(9)¹³^-¹⁷.

q(T,t)=qs(T,t)-qI(T,t), (9)

where, the saturable part reads Eq.(10)¹³^-¹⁷.

∂qs(T,t)∂t=-qs-qs,Mtr-|A(T,t)|2Esqs, (10)

where qs,M is the maximum response of saturable part and t_R is the relaxation time of the absorber. One may consider a solution for Eq. (10) in the form of Eq.(11) if the slow saturable absorber is assumed.

qs=qs,M1-exp(-E/Es)E/Es. (11)

On the other hand, the inverse saturable term can be written as Eq.(12)¹³^-¹⁷.

qI(t)=αTPAleff|A(t)|2aeff, (12)

where leff and aeff is respectively the effective length and area of the absorber interacted with the laser beam.

If qM, α, γ, g0,NET and subsequently E_s remain small, a cw steady state will be deduced. Otherwise, soliton regime will be dominant if the saturation energy value E_s becomes greater than the minimum energy Esmin requiring the other mentioned parameters to be sufficiently large. A further increase in E_s may lead to the violation of the balance between GVD and SPM. Consequently, soliton formation will then vanish. However, there can be a total average balance between the two factors within the long-time measurement while each of them alternatively surpasses in a period of the time. This results in a quasi-periodic state implying the formation of higher order solitons. If E_s is more than a threshold value (E_th), chaotic regime will be deduced.

3.Simulation results and discussion

In order to perform a comparative representation, energy value E and temporal parameters T and t are normalized in Eq.(9). Figure 1 shows the procedure of pulse generation within the cavity with respect to the intracavity energy state. Blue lines indicate the region for which the pulses can be formed. The white surface depicts the minimum energy above which the pulses can be formed, whereas the black surface illustrates the unstable region.

Figure 1 Pulse formation procedure with respect to intracavity energy states.

Meanwhile, we use the predictor-corrector split step Fourier method -which is a combination of explicit and implicit methods- to solve (1) numerically ¹⁸^-¹⁹. Figure 2 shows the results as the three pulse formation states categorized in accordance with the three energy zones presented in Fig. 2. For a slightly larger saturation energy than Esmin, zeroth order solitons appear (i.e. the solitons that are not yet suitable for the ultrafast pulse regime) (Fig. 2a)). If the saturation energy increases enough, the procedure of soliton formation will be faster and the 1^th order solitons will emerge (Fig. 2b)). Further increase in the saturation energy leads to the generation of higher order solitons (2c)), a prior state to chaos.

Figure 2 Intracavity illustration of a) zeroth order solitons, b) first order solitons, c) breather modes.

In the next step, the influence of the parameters q 𝑀 , and subsequently, E_s is to be investigated on the route to chaos. Figure 3 shows the results as the bifurcation diagrams for different assumed compositions. For the lower values assumed parameters (qM=0.2, g0,NET=1.7), a cw stationary regime appears as anticipated. This includes the two lower and upper stable states as shown in 3a). An increase in g0,NET(g0,NET=2.7) leads to the period doubling and then multiple periodic behaviour inferred as a route to the chaotic regime (3b)). The situation will become more complex for the larger g0,NET even if qM decreases (3(c) obtained for g0,NET=3.7 and qm=0.1). Moreover, if g0,NET and qM further increase (g0,NET=4.7 and qm=0.2), a reverse bifurcation diagram will be resulted as shown in 3d). This is a conventional state in the cavity of the mode-locked fiber lasers and has been more or less shown theoretically and experimentally. Nevertheless, from (11) and (12) one may deduce that the maximum absorber response can be written as (13) if the amplitude is normalized to 1.

qM∝(1-αTPA). (13)

Figure 3 Bifurcation diagrams for a) q_M = 0:2, g₀ = 1:7, b) q_M = 0:2, g₀ = 2:7, c) q_M = 0:1, g₀ = 3:7 d) q_M = 0:4, g0 = 2:7.

Accordingly, (5) will suggest that the two control parameters α and γ can be tuned to modify the system state. Figure 4a) shows the bifurcation diagram obtained for the larger nonlinear coefficient γ = 3.36 in comparison to the modest nonlinear coefficient γ = 2 assumed in 3a). Also, 3b) shows the corresponding chaotic attractor.

Figure 4 Bifurcation diagrams for a) γ = 3:2 while other parameters are the same as assumed for Fig. 3a), b) its chaotic attractor.

Indeed, the control parameters of γ and α can be electrically or optically tuned by using a supplementary entity. For example, graphene-based mode-locked fiber lasers can provide such usefulness beside the other beneficial issues ²⁰^-²⁴. Therefore, designing a both encryption and decryption system based on the chaos will be possible by adjusting the saturation energy E_s or tuning the nonlinearity 𝛾 or absorption α. A schematic illustration of a graphene-assisted soliton mode-locked fiber laser system based on the previously proposed schemes are shown in Fig. 5a) whereas the magnification shows a FET structure using a multiple embedded graphene sheets to enhance the nonlinearity and absorption ²⁵^-²⁶.

Figure 5 a) Schematic illustration of a graphene-assisted soliton mode-locked fiber laser system; EDF means Erbium-doped fiber; WDM means the wavelength division multiplexing; PC indicates the polarization controller; LD indicates the pump laser diode; magnification depicts the FET structure based on multiple embedded graphene layers; G SA denotes the graphene saturable absorber; b) Bifurcation diagrams obtained for variation of γ.

Variation of the γ and α causes a modification in E_s according to Eq. (4). Considering this fact, the bifurcation diagram obtained for γ variations is shown in Fig. 5b).

Another important advantage is the single-side control process, i.e., there is no need to increase and decrease the nonlinear coefficient. One action will be lonely sufficient to trigger both the encryption and decryption procedures. This will be crucially substantial if one notices that the reverse action cannot follow the same response in the nonlinear dynamical systems.

4.Conclusion

The Haus master equation has been solved for the cavity of soliton mode-locked fiber laser. It has been shown that the intracavity modes include the first and higher order solitons. Accordingly, chaotic regime as well as breather modes have been recognized as the conventional state within the cavity. The process of controlling intracavity states is implemented by changing the characteristic parameters including the net gain, absorber response and also the control parameters of saturation energy, nonlinear and absorption coefficients. While increasing the control parameters leads to the chaotic regime, it has been revealed that further increasing can result in a stable state inferred from the reverse bifurcation diagram. On this base, a chaos-based encryption/decryption system has been proposed. The system takes the advantage of using a single-side control process, i.e., the both encryption and decryption procedures can be achieved by increasing or decreasing the control parameters.

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Received: March 17, 2021; Accepted: April 16, 2021

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