This paper presents a numerical study of highly dispersive optical solitons that maintain a cubic–quintic–septic nonlinear (also know as polynomial) form of the refractive index. The Laplace–Adomian decomposition scheme is applied as a numerical algorithm to put the model into perspective. Both bright and dark soliton solutions are studied in this context. Both surface plots and contour plots of such solitons are presented. The error plots are also shown, demonstrating extremely low error measure values.

中文翻译：

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通过Laplace-Adomian分解得到的具有多项式折射率定律的高色散光学孤子

本文对高色散光学孤子进行了数值研究，这些孤子保持了折射率的立方-五次-化脓性非线性（也称为多项式）形式。拉普拉斯—阿多姆分解方案被用作数值算法，以将模型放到透视图上。在此背景下，研究了亮孤子解决方案和暗孤子解决方案。给出了这种孤子的表面图和轮廓图。还显示了误差图，表明极低的误差测量值。