Abstract
Abstract
We explore new symmetries in two-component third-order Burgers’ type systems in (1+1)-dimension using Wang’s
O
-scheme. We also find a master symmetry for a (2+1)-dimensional Davey-Stewartson type system. These results shed light on the behavior of these equations and help us understand their integrability properties. Our approach offers a practical method for identifying symmetries, contributing to the study of integrable systems in mathematics and physics.