Applying the extended mapping method via Riccati equation, many exact variable separation solutions for the (2&1 )-dimensional variable coefficient Broer-Kaup equation are obtained. Introducing multiple valued func...Applying the extended mapping method via Riccati equation, many exact variable separation solutions for the (2&1 )-dimensional variable coefficient Broer-Kaup equation are obtained. Introducing multiple valued function and Jacobi elliptic function in the seed solution, special types of periodic semifolded solitary waves are derived. In the long wave limit these periodic semifolded solitary wave excitations may degenerate into single semifolded localized soliton structures. The interactions of the periodic semifolded solitary waves and their degenerated single semifolded soliton structures are investigated graphically and found to be completely elastic.展开更多
基金National Natural Science Foundation of China under Grant Nos.10472063 and 10672096
文摘Applying the extended mapping method via Riccati equation, many exact variable separation solutions for the (2&1 )-dimensional variable coefficient Broer-Kaup equation are obtained. Introducing multiple valued function and Jacobi elliptic function in the seed solution, special types of periodic semifolded solitary waves are derived. In the long wave limit these periodic semifolded solitary wave excitations may degenerate into single semifolded localized soliton structures. The interactions of the periodic semifolded solitary waves and their degenerated single semifolded soliton structures are investigated graphically and found to be completely elastic.
