Lump and Lump-Kink Soliton Solutions of an Extended Boiti-Leon-Manna-Pempinelli Equation

In this paper, the extended Boiti-Leon-MannaPempinelli equation (eBLMP) is first proposed, and by Ma's [1] method, a class of lump and lump-kink soliton solutions is explicitly generated by symbolic computations. The propagation orbit, velocity and extremum of the lump solutions on (x, y) plane are studied in detail. Interaction solutions composed of lump and kink soliton are derived by means of choosing appropriate real values on obtained parameter solutions. Furthermore, 3-dimensional plots, 2-dimensional curves, density plots and contour plots with particular choices of the involved parameters are depicted to demonstrate the dynamic characteristics of the presented lump and lump-kink solutions for the potential function v = 2ln(f(x))(x).