Bilinear forms through the binary Bell polynomials,Nsolitons and Backlund transformations of the Boussinesq-Burgers system for the shallow water waves in a lake or near an ocean beach

Water waves are one of the most common phenomena in nature, the studies of which help energy development, marine/offshore engineering, hydraulic engineering, mechanical engineering, etc. Hereby, symbolic computation is performed on the Boussinesq-Burgers system for shallow water waves in a lake or near an ocean beach. For the water-wave horizontal velocity and height of the water surface above the bottom, two sets of the bilinear forms through the binary Bell polynomials andN-soliton solutions are worked out, while two auto-Backlund transformations are constructed together with the solitonic solutions, whereNis a positive integer. Our bilinear forms,N-soliton solutions and Backlund transformations are different from those in the existing literature. All of our results are dependent on the water-wave dispersive power.