Discrete solitons in zigzag waveguide arrays with different types of linear mixing between nearest-neighbor and next-nearest-neighbor couplings

• Published in: Physics letters. A Vol. 384; no. 24; p. 126448
• Main Authors: Hu, Jinzhou, Li, Shulan, Chen, Zhaopin, Lü, Jiantao, Liu, Bin, Li, Yongyao
• Format: Journal Article
• Language: English
• Published: Elsevier B.V 28.08.2020
• Subjects: Discrete nonlinear Schrödinger equation; Nonlinear dynamics; Soliton; Discrete nonlinear Schrödinger equation; Soliton; Nonlinear dynamics
• ISSN: 0375-9601; 1873-2429
• DOI: 10.1016/j.physleta.2020.126448

•Discrete soliton in special types zigzag waveguide arrays.•Phase transition of the second kind is found for the discrete soliton in the waveguide arrays.•Motion and collision of the solitons are strongly influenced by the phase transition. We study discrete solitons in zigzag discrete waveguide arrays with different types of linear mixing between nearest-neighbor and next-nearest-neighbor couplings. The waveguide array is constructed from two layers of one-dimensional (1D) waveguide arrays arranged in zigzag form. If we alternately label the number of waveguides between the two layers, the cross-layer couplings (which couple one waveguide in one layer with two adjacent waveguides in the other layer) construct the nearest-neighbor couplings, while the couplings that couple this waveguide with the two nearest-neighbor waveguides in the same layer, i.e., self-layer couplings, contribute the next-nearest-neighbor couplings. Two families of discrete solitons are found when these couplings feature different types of linear mixing. As the total power is increased, a phase transition of the second kind occurs for discrete solitons in one type of setting, which is formed when the nearest-neighbor coupling and next-nearest-neighbor coupling feature positive and negative linear mixing, respectively. The mobilities and collisions of these two families of solitons are discussed systematically throughout the paper, revealing that the width of the soliton plays an important role in its motion. Moreover, the phase transition strongly influences the motions and collisions of the solitons.