Abundant wave symmetries in the (3+1)-dimensional Chafee–Infante equation through the Hirota bilinear transformation technique

Abundant wave symmetries in the (3+1)-dimensional Chafee–Infante equation through the Hirota bilinear transformation technique

The present study investigates different types of wave symmetries in the (3+1)\left(3+1)-dimensional Chafee–Infante equation via the Hirota bilinear transformation technique. In this work, we derived exact solutions that include bright and dark solitons, periodic cross kink, multiple waves, mixed wa...

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Bibliographic Details
Main Authors:	Ceesay Baboucarr, Baber Muhammad Z., Ahmed Nauman, Shahid Naveed, Macías Siegfried, Macías-Díaz Jorge E.
Format:	Article
Language:	English
Published:	De Gruyter 2025-07-01
Series:	Open Physics
Subjects:	(3+1)-dimensional chafee–infante equation hirota bilinear method soliton solutions m-shaped waves breather waves lump solutions rogue waves kink and anti-kink structures wave interaction nonlinear wave dynamics multidimensional solitons periodic cross-kinks exact analytical solutions
Online Access:	https://doi.org/10.1515/phys-2025-0176
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