In this paper, the soliton solutions which indicate long wave parallel to the magnetic fields of Kaup-Newell models are argued via described method. Modified extended Simple equation is suggested to explore the novel solitons and other wave structures of two different types of Kaup-Nawell equations, which have never been constructed before. As a consequence, bright-dark solitons, singular solitons, multi-wave solitons, breather type wave of strange structures and other waves solutions of two Kaup-Newell (K-N) Schrödinger equations are achieved in different form. The obtained novel solitons and other exact wave solutions have key applications in engineering and applied physics. Novel wave structures of solitons are explained graphically by providing suitable values to parameters that help for understanding the physical phenomena of these models. The constructed solutions are evaluated with available results in the literature. This technique can be productively utilized to more equations that occur in mathematical physics.

本文通过所描述的方法，提出了表明长波平行于Kaup-Newell模型磁场的孤子解。为了探索新型的孤子和两种不同类型的Kaup-Nawell方程的波结构，建议使用改进的扩展简单方程，这些方程以前从未构建过。结果，以不同形式获得了两个Kaup-Newell（KN）Schrödinger方程的明暗孤子，奇异孤子，多波孤子，通气型奇异结构波和其他波解。所获得的新型孤子和其他精确的波动解在工程和应用物理学中具有关键应用。通过为参数提供合适的值来图形化地解释孤子的新型波结构，这些参数有助于理解这些模型的物理现象。对构建的解决方案进行评估，并获得文献中的可用结果。这项技术可以有效地用于数学物理学中出现的更多方程式。