English

Analysis on an extended Majda--Biello system

Analysis of PDEs 2015-01-20 v4 Numerical Analysis

Abstract

In this paper, we begin with extended Majda--Biello system (BSAB equations): {0=AtDA3+μA1+ΓSB1S+ΓAB1A+(ABS)x0=BtSB3S+ΓSA1+λB1S+σB1A+AA10=BtAB3A+ΓAA1+σB1SλB1A \left\{\begin{array}{l} 0=A_t-DA_3+\mu A_1+\Gamma_S B^S_1+\Gamma_A B_1^A+\left(AB^S\right)_x \\ 0=B^S_t-B_3^S+\Gamma_SA_1+\lambda B_1^S+\sigma B^A_1+AA_1 \\ 0=B^A_t-B_3^A+\Gamma_A A_1+\sigma B_1^S-\lambda B_1^A \end{array}\right. We conclude global well-posedness in L2(R)×L2(R)×L2(R)L^2(\mathbb{R})\times L^2(\mathbb{R})\times L^2(\mathbb{R}) by Brougain's method and the stability of solitary wave solutions by putting it in a framework of generalised KdV type system with three components, where Hamiltonian structure plays an important role. Both of them are bases for numerical tests.\par Last but not least, we explore the effect of interaction of two solitary waves in Majda--Biello system in a novel way : \par \textit{While fixing initial data for one soliton UU, we point out the effect on UU decays, to some extent and in certain range, in a polynomial way.} \par Since effect of interaction of two solitary waves are practically interesting, such kind of analysis, as we have explained, is likely be fundamental for generalised KdV type systems.

Cite

@article{arxiv.1407.5371,
  title  = {Analysis on an extended Majda--Biello system},
  author = {Yezheng Li},
  journal= {arXiv preprint arXiv:1407.5371},
  year   = {2015}
}

Comments

27 pages, 17 figures This paper has been withdrawn by the author due to lack of conclusive results, lack of details of proof of some theorems (theorem 2.8 3.3 for instance) and inconsistency of discussion between two parts of the paper -- first part discusses something with three components, second part with two components

R2 v1 2026-06-22T05:08:34.538Z