Novel conditions for soliton breathers of the complex modified Korteweg–de Vries equation with variable coefficients

Optik - International Journal for Light and Electron Optics 172 (2018) 1117–1122

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Original research article

Novel conditions for soliton breathers of the complex modified Korteweg–de Vries equation with variable coefficients

T

⁎

V.N. Serkina, , T.L. Belyaevab a b

Benemerita Universidad Autonoma de Puebla, Av. 4 Sur 104, C. P. 72001, Puebla, Mexico Universidad Autonoma del Estado de Mexico, Av. Instituto Literarion 100, C. P. 50000, Toluca, Mexico

A R T IC LE I N F O

ABS TRA CT

Keywords: Complex modified Korteweg–de Vries Breather solutions General conditions for soliton breather solutions

We reveal novel unexpected conditions for soliton breathers of the generalized complex modified Korteweg–de Vries equation with variable coefficients and the loss (or gain) term (vc cmKdV). Novel relations between spectral parameters of two solitons giving rise to the breather substantially extend the well-known constraints for canonical soliton breathers. This finding allows us to systematically construct the variety of soliton breather solutions on a zero background of the considered model. These generalized breathers move with varying amplitudes and velocities adapted to variations of the dispersion, nonlinearity, and gain or losses. Among other things, we establish that both the standing generalized breathers and envelope breathers exist as well.

1. Introduction Nonlinear wave phenomena occur in a great number of physical situations in different branches of science and technology, which are often related to similar and even common mathematical formalism [1–5]. An additional point to emphasize is that the impressive progress has been achieved recently in the successful search for the exactly integrable mathematical models [6–12]. The Ablowitz–Kaup–Newell–Segur (AKNS) method [13] allows one to construct the hierarchy of the integrable nonlinear evolution equations. The complex modified Korteweg–de Vries (cmKdV) equation has been arose in plasma physics, and today, this model has a wide range of applications, from plasmas, elastic solids, molecular chains to the ultrashort pulses in nonlinear optics, etc. [2–4,14]. Both the cmKdV and its real version, the mKdV equation, belong to the AKNS hierarchy and represent the completely integrable nonlinear evolution equations [15–20]. The variable-coefficient version of the cmKdV was found to be also completely integrable equation with certain constraints to the coefficients [21–30]. Complex mKdV equation admits various soliton and multisoliton solutions, compactons, and rational (rogue wave) solutions [31–38]. In this paper, we consider a special type of the two-soliton solutions of the cmKdV equation with variable coefficients, which represents the periodically varying in time bound state of two bright solitons and is known as breather by virtue of its “breathering” localized periodic structure. Notice that a breather is a stable solitary wave (as an ordinary soliton), but with internal oscillation modes. We reveal novel unexpected conditions for these soliton breathers which substantially extend the well-known constraints for canonical soliton breathers. We systematically construct the variety of soliton breather solutions on a zero background of the considered model. These generalized breathers move with varying amplitudes and velocities adapted to variations of the dispersion, nonlinearity, and gain or losses. Among other things, we establish that both the standing generalized breathers and envelope breathers exist as well.

⁎

Corresponding author. E-mail address: [email protected] (V.N. Serkin).

https://doi.org/10.1016/j.ijleo.2018.07.139 Received 31 July 2018; Accepted 31 July 2018 0030-4026/ © 2018 Elsevier GmbH. All rights reserved.

Optik - International Journal for Light and Electron Optics 172 (2018) 1117–1122

V.N. Serkin, T.L. Belyaeva

2. Soliton breather solutions of the complex modified Korteweg–de Vries equations with variable coefficients 2.1. Integrability conditions Consider the complex mKdV equation with variable coefficients

qt + D3 (t ) qxxx + 6R3 (t )|q|2 qx =

1 Γ(t ) q, 2

(1)

where the gain/loss coefficient

Γ(t ) =

W (R3, D3) R3 D3

(2)

depends on the Wronskian W(R3, D3) = D3tR3 − R3tD3 of arbitrary real-valued time-varying functions D3(t) and R3(t), which represent the dispersion and nonlinearity coefficients of the third order. Complete integrability of Eq. (1) follows from the linear eigenvalue problem

Ψx = ˆ Ψ(x , t ),

Ψt = ˆ Ψ(x , t )

(3)

for the 2-component complex scattering function Ψ(x, t) = {ψ1, ψ2} with the complex-valued (2 × 2) matrices T

R3 ⎛− i Λ q⎞ D3 ˆ ⎟ ⎜  = ⎜− R3 q* i Λ ⎟ D3 ⎠ ⎝

(4)

ˆ = (CA −B A),

(5)

and

A = R3 (qq*x − q*qx ) + 2iR3|q|2 Λ − 4iD3 Λ3, B=

R3 D3

[−D3 qxx − 2R3 |q|2 q + 2i ΛD3 qx + 4Λ2D3 q],

C=

R3 D3

* + 2R3 |q|2 q* + 2i ΛD3 qx* − 4Λ2D3 q*], [D3 qxx

(6)

satisfying the compatibility condition

ˆ ˆ ˆˆ

t − x + [  ,  ] = 0.

(7)

Constant spectral parameter Λ = κ + iη defines the initial velocity κ and amplitude η of the soliton. The soliton solutions of order n of Eq. (1) can be calculated by applying the auto-Bäcklund transformation and the recurrent relation [39–42]

4 qn (x , t ) = −qn − 1 (x , t ) −

∼ D3 η Γn − 1 (x , R3 n

t) , ∼ 1 + |Γn − 1 (x , t )|2

(8) ∼ which connects the (n − 1) and n soliton solutions by means of the so-called pseudo-potential Γn − 1 (x , t ) = ψ1 (x , t )/ ψ2 (x , t ) for the (n − 1) soliton scattering functions Ψ(x, t) = (ψ1ψ2)T. A recurrent process begins at zero-valued potential q(x, t) = 0, for which Eq. (1) is evidently fulfilled. The one- and two-soliton solutions of Eq. (1) are given by

q1 (x , t ) = 2η1

D3 (t ) sech[ξ1 (x , t )]exp{ −iχ1 (x , t )} R3 (t )

(9)

and

q2 (x , t ) = 4

D3 (t ) N (x , t ) , R3 (t ) D (x , t )

(10)

where

N (x , t )= η1 cosh ξ2 exp(−iχ1 )[(κ2 − κ1)2 + 2iη2 (κ2 − κ1)tanh ξ2 + (η12 − η22)] + η2 cosh ξ1 exp( −iχ2 )[(κ2 − κ1)2 − 2iη1 (κ2 − κ1)tanh ξ1 − (η12 − η22)] and

D (x , t ) = cosh(ξ1 + ξ2)[(κ2 − κ1)2 + (η2 − η1 )2] + cosh(ξ1 − ξ2)[(κ2 − κ1)2 + (η2 + η1)2] − 4η1 η2 cos(χ2 − χ1 ). The arguments of hyperbolic functions and the phases of solitons are defined by the following equations: 1118

(11)

Optik - International Journal for Light and Electron Optics 172 (2018) 1117–1122

V.N. Serkin, T.L. Belyaeva

Fig. 1. The breather solutions of the cmKdV (1) with D3(t) = D30 exp(C0t), constant nonlinearity R3(t) = R30 = 1, and gain Γ = C0 = 0.06. (a) Moving with acceleration breather formed by two solitons with initial velocities κ1 = 0.25 and κ2 =−0.25, and amplitude η1 = η2 = 0.5. (b) The standing breather formed by two solitons with the same amplitudes η1 = η2 = 0.5, and velocities κ1 = 0.5/ 3 and κ2 = −0.5/ 3 . The space-temporal dynamics (top panels) and the counter plot (bottom panels).

2 2 ξ1,2 (x , t ) = 2(x − x 01,2) η1,2 + 8η1,2 (3κ1,2 − η1,2 )

∫0

t

2 2 χ1,2 (x , t ) = 2(x − x 01,2) κ1,2 + 8κ1,2 (κ1,2 − 3η1,2 )

∫0

t

D3 (τ ) dτ ,

(12)

D3 (τ ) dτ + χ01,2 .

(13)

2.2. Soliton breathers of the cmKdV equation Let us consider special types of the two-soliton solutions corresponding to the bound states of solitons: spatially localized, timeperiodic solutions that are referred to as breathers. The breather solution of the real canonical mKdV equation was found for the first time by Wadati [15] and corresponds to the bound two-soliton solution with complex conjugated eigenvalues Λ2 = −Λ1*, where Λ = κ + iη, the real part of the eigenvalue Λ denotes the velocity κ and the imaginary part of Λ corresponds to the amplitude η of the soliton. The Wadati breather solution of Eq. (1) at the conditions: κ1 =− κ2 = κ and η2 = η1 = η becomes

qbr (x , t ) = 4

D3 (t ) η {κ cosh ξ cos χ − η sinh ξ sin χ } , η2 R3 (t ) κ cosh2 ξ + sin2 χ

(

κ2

)

(14)

where ξ(x, t) and χ(x, t) are defined by Eqs. (12) and (13) with x 01 = x 02 . The soliton solution that does not change its initial position is known as a “standing soliton”. The standing breather of the cmKdV Eq. (1) is formed by two solitons with arbitrary amplitudes ηi and the velocities satisfying the relation: κ1,2 = ± η1,2 / 3 . In Fig. 1, we show the breather solutions of the cmKdV Eq. (1) with exponentially varying dispersion D3(t) = D30 exp(C0t), constant nonlinearity R3(t) = R30 = 1, and gain Γ = C0. The moving (Fig. 1a) Wadati breather Eq. (14) is formed by two solitons with equal initial amplitudes (in Fig. 1(a), we choose, for example: η1 = η2 = 0.5) and arbitrary equal initial velocities of opposite signs (in Fig. 1(a), we choose κ1 = 0.25, κ2 =−0.25). The moving Wadati breather has the velocity V(t) = 4(3κ2 − η2)D30[exp(C0t) − 1]/C0 and the acceleration Vt(t) = 4(3κ2 − η2)D30 exp(C0t). The standing Wadati breather Eq. (14) (see Fig. 1(b)) is formed by two solitons with equal amplitudes (in Fig. 1(b) η1 = η2 = η = 0.5) and the opposite velocities κ2 = −κ1 = −η/ 3 . 2.3. General conditions for the soliton breather solutions of the complex modified Korteweg–de Vries equation with variable coefficients The bound states of two solitons of Eq. (1) (and, in general, multisoliton bound states on the zero background) can be constructed under more general conditions. We reveal the general relation between spectral parameters of two solitons giving rise to the breather. It corresponds to the following requirements to the soliton initial parameters: 1119

Optik - International Journal for Light and Electron Optics 172 (2018) 1117–1122

V.N. Serkin, T.L. Belyaeva

Fig. 2. The breather solutions of the cmKdV (1) with D3(t) = D30 exp(C0t), constant nonlinearity R3(t) = R30 = 1, and gain Γ = C0 = 0.1. (a) The standing breather formed by two solitons with different amplitudes η1 = 0.5 and η2 = 0.3, and velocities κ1 = 0.5/ 3 and κ2 = 0.3/ 3 . (b) The moving with acceleration breather formed by two solitons with parameters κ1 = 0.29, κ2 = 0.22, P = 1.25, and η2 = 0.436, calculated in accordance with Eq. (15). The space-temporal dynamics (top panels) and the counter plot (bottom panels).

η1 = Pη2 , η22 (P 2 − 1) = 3(κ12 − κ 22),

(15)

where P is an arbitrary constant. Constraints (15) include the Wadati condition at P = 1 when η1 = η2 and κ1 =− κ2 (in the case of κ1 = κ2, the solution (10,11) vanishes). In general, if P2 ≷ 1 then κ12≷κ 22 . It is interesting to note that, in particular, one of the two velocities, κ1 or κ2, admits zero value. Fig. 2 shows typical examples of how the breather solutions of the cmKdV Eq. (1) are formed in accordance with Eq. (15). In particular, we consider the exponentially varying dispersion D3(t) = D30 exp(C0t), constant nonlinearity R3(t) = R30 = 1, and the constant gain Γ = C0. The standing breather shown in Fig. 2(a) is formed by two solitons with different amplitudes η1 = 0.5 and η2 = 0.3, and the velocities κ1 = 0.5/ 3 and κ2 = 0.3/ 3 . The moving with acceleration breather shown in Fig. 2(b) is formed by two solitons with different velocities κ1 = 0.29 and κ2 = 0.22, and the amplitudes calculated in accordance with the conditions (15), η1 = 0.545 and η2 = 0.436, corresponding to the parameter P = 1.25. 2.4. Envelope breathers One of the most interesting solutions of the cmKdV equation (having applications in nonlinear optics of extremely short pulses) is the envelope breather filled with high-frequency oscillations [3]. These solutions look like electromagnetic few-cycle pulses or video pulses. They are formed by two bound solitons with parameters satisfying the condition ϵ = η/κ ≪ 1. Then, Eq. (14) at ϵ ≪ 1 approximately becomes

qen (x , t ) ≈ 4η

η D3 (t ) sechξ ⎛cos χ − tanh ξ sin χ ⎞. κ R3 (t ) ⎝ ⎠

(16)

In general, the envelope breather can be constructed in accordance with the constraints (15) for different initial amplitudes and velocities of both solitons. Fig. 3 shows examples of the envelope breathers of the cmKdV Eq. (1) with the exponentially varying dispersion D3(t) = D30 exp(C0t), constant nonlinearity R3(t) = R30 = 1, and the constant gain Γ = C0. The breather solution Eq. (16) moving with acceleration (Fig. 3(a)) is formed by two solitons with equal amplitudes η1 = η2 = 0.1 and equal velocities of the opposite signs κ1 =− κ2 = 0.5. Fig. 3(b) shows accelerated breather formed by two solitons with different velocities κ1 =−0.51 and κ2 = 0.50, and the amplitudes satisfying to Eq. (15): η1 = 0.185 and η2 = 0.006 corresponding to the parameter P = 3. 3. Conclusion We have revealed novel unexpected conditions for soliton breathers of the generalized complex modified Korteweg–de Vries 1120

Optik - International Journal for Light and Electron Optics 172 (2018) 1117–1122

V.N. Serkin, T.L. Belyaeva

Fig. 3. The envelope breather solutions of the cmKdV (1) with D3(t) = D30 exp(C0t), constant nonlinearity R3(t) = R30 = 1, and gain Γ = C0 = 0.06. (a) The breather formed by two soliton with equal amplitudes η1 = η2 = 0.1 and the velocities κ1 = 0.5, κ2 =−0.5. (b) The breather formed by two soliton with different parameters κ1 =−0.51, κ2 = 0.502, P = 3, η1 = 0.185, and η2 = 0.006, in accordance with Eq. (15). The space-temporal dynamics (top panels) and the counter plot (bottom panels).

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