Optical Soliton Propagation in an Erbium Doped Nonlinear Light Guide with Higher Order Dispersion

Abstract: We propose a coupled system of the Hirota equation and the Maxwell-Bloch equations to describe the wave propagation in an erbium doped nonlinear fiber with higher order dispersion.The Painleve property of the same is analyzed and the coupled system is found to be integrable. The Lax pair is also constructed and the single-soliton solution is explicitly shown. The coupled system is found to allow soliton-type propagation. PACS numbers: 42.SO.Rh, 02.30.Jr, 42.65. -k, 42.81.DpThe extraordinary growth of communica… Show more

“…Recent experiments by Nakazawa et al, have confirmed guided wave SIT soliton formation and propagation by employing a few meters of erbium doped fibre [8][9][10][11]. Recently, considering all higher order effects in the propagation of femtosecond pulses, the coupled Hirota and Maxwell-Bloch (CH-MB) equations have been proposed and analyzed for soliton solutions [12]. Some generalization of NLS-MB equations, for instance, the CH-MB equations and the NLS-MB equations with variable dispersion and nonlinear effects are discussed [13][14][15].…”

“…(24) into eqs. (11,12,13), we can get the first order rogue waves {Ē [1] ,p [1] ,η [1] } in the form of determinant. The dynamical evolution of |Ē [1] | 2 , |p [1] | 2 andη [1] for the parametric choice Theorem 2.…”

Publisher's Note:N-order bright and dark rogue waves in a resonant erbium-doped fiber system [Phys. Rev. E86, 066603 (2012)]

“…Recent experiments by Nakazawa et al, have confirmed guided wave SIT soliton formation and propagation by employing a few meters of erbium doped fibre [8][9][10][11]. Recently, considering all higher order effects in the propagation of femtosecond pulses, the coupled Hirota and Maxwell-Bloch (CH-MB) equations have been proposed and analyzed for soliton solutions [12]. Some generalization of NLS-MB equations, for instance, the CH-MB equations and the NLS-MB equations with variable dispersion and nonlinear effects are discussed [13][14][15].…”

“…(24) into eqs. (11,12,13), we can get the first order rogue waves {Ē [1] ,p [1] ,η [1] } in the form of determinant. The dynamical evolution of |Ē [1] | 2 , |p [1] | 2 andη [1] for the parametric choice Theorem 2.…”

Publisher's Note:N-order bright and dark rogue waves in a resonant erbium-doped fiber system [Phys. Rev. E86, 066603 (2012)]

“…We consider ultrashort pulses propagating a resonant erbium-doped fiber system with the important higherorder effects above governed by a coupled system of the H-MB model [5] …”

“…In this case, nonlinear wave propagation could possess both the effects due to a mix of silica and erbium impurities. More specifically, the silica material gives the group velocity dispersion and self-phase modulation effects, which is governed by the nonlinear Schrödinger (NLS) equation; whereas Er impurities contribute to the self-induced transparency (SIT), which is described by the Maxwell-Bloch (MB) model [1][2][3][4][5][6][7][8][9]. As a result, the constraint to the NLS soliton namely the optical losses can be somewhat compensated with the effect of SIT.…”

“…Nonlinear waves propagating in an erbium-doped fiber system have attracted special attention, since the resonant absorption of the erbium-doped two levels system is a good solution to the optical losses [1][2][3][4][5][6][7][8][9]. One of the most well-known examples is the amplification and reshaping of optical soltion (bright soliton on a zero background) in a long-haul optical communication through fibers with an active region doped with erbium atoms.…”

Characteristics of optical multi-peak solitons induced by higher-order effects in an erbium-doped fiber system

Optical Soliton Propagation in Erbium Doped Nonlinear Fiber Media