Abstract
The generalized (n + 1)-dimensional KP equation with variable coefficients is investigated in this paper. The bilinear form of the equation has been obtained by the Hirota direct method. In addition, with the help of Wronskian technique and the Pfaffian properties, Wronskian and Grammian solutions have been generated.
Highlights
There has been a growing interest in studying variable-coefficient nonlinear evolution equations (NLEEs)
The generalized (n + 1)-dimensional KP equation with variable coefficients is investigated in this paper
The bilinear form of the equation has been obtained by the Hirota direct method
Summary
There has been a growing interest in studying variable-coefficient nonlinear evolution equations (NLEEs). The generalized (n + 1)-dimensional KP equation with variable coefficients is investigated in this paper. The bilinear form of the equation has been obtained by the Hirota direct method. With the help of Wronskian technique and the Pfaffian properties, Wronskian and Grammian solutions have been generated.
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