TY - JOUR
T1 - Bifurcation study, phase portraits and optical solitons of dual-mode resonant nonlinear Schrodinger dynamical equation with Kerr law non-linearity
AU - Wu, Yong
AU - Vivas-Cortez, Miguel
AU - Rehman, Hamood Ur
AU - Sherif, El-Sayed M.
AU - Rashid, Abdul
N1 - Publisher Copyright:
© 2024 The Author(s)
PY - 2024/8/15
Y1 - 2024/8/15
N2 - This study investigates the dynamic characteristics of the dual-mode resonant non-linear Schrodinger equation with a Bhom potential. Hydrodynamics, nonlinear optical fibre communication, elastic media, and plasma physics are just a few of the mathematical physics and engineering applications for this model. The study aims to achieve two main objectives: first, to discuss bifurcation analysis, and second, to extract optical soliton solutions using the extended hyperbolic function method. The study successfully derives various wave solutions, including bright, singular, periodic singular and dark solitons, based on the governing model. The findings conferred in this article show a crucial advancement in understanding the propagation of waves in non-linear media. Additionally, bifurcation of phase portraits of ordinary differential equation consistent with the partial differential equation under consideration is conducted. We also highlight specific constraint conditions that ensure the presence of these obtained solutions. The existing literature shows that these methods are first time applied on this model.
AB - This study investigates the dynamic characteristics of the dual-mode resonant non-linear Schrodinger equation with a Bhom potential. Hydrodynamics, nonlinear optical fibre communication, elastic media, and plasma physics are just a few of the mathematical physics and engineering applications for this model. The study aims to achieve two main objectives: first, to discuss bifurcation analysis, and second, to extract optical soliton solutions using the extended hyperbolic function method. The study successfully derives various wave solutions, including bright, singular, periodic singular and dark solitons, based on the governing model. The findings conferred in this article show a crucial advancement in understanding the propagation of waves in non-linear media. Additionally, bifurcation of phase portraits of ordinary differential equation consistent with the partial differential equation under consideration is conducted. We also highlight specific constraint conditions that ensure the presence of these obtained solutions. The existing literature shows that these methods are first time applied on this model.
KW - Bifurcation analysis
KW - Dual-mode resonant non-linear Schrodinger equation
KW - Extended hyperbolic function method (EHFM)
KW - Kerr law
KW - Soliton solutions
UR - https://doi.org/10.1016/j.heliyon.2024.e34416
UR - http://www.scopus.com/inward/record.url?scp=85199133144&partnerID=8YFLogxK
U2 - 10.1016/j.heliyon.2024.e34416
DO - 10.1016/j.heliyon.2024.e34416
M3 - Article
SN - 2405-8440
VL - 10
JO - Heliyon
JF - Heliyon
IS - 15
ER -