We construct an analytical and explicit representation of the Darboux transformation(DT)for the Kundu-Eckhaus(KE) equation. Such solution and -fold DT are given in terms of determinants whose entries are expressed by the initial eigenfunctions and “seed” solutions.Furthermore, the formulae for the higher-order rogue wave(RW) solutions of the KE equation are also obtained by using the Taylor expansion with the use of degenerate eigenvalues 2-1'1 =-12 + 2+ , = 1, 2, 3, · · ·, all these parameters will be defined latter. These solutions have a parameter , which denotes the strength of the non-kerr(quintic) nonlinear and the selffrequency shit effects. We apply the contour line method to obtain analytical formulae of the length and width for the first-order RW solution of the KE equation, and then use it to study the impact of the on the RW solution. We observe two interesting results on localization characters of , such that if is increasing from2: 1) The length of the RW solution is increasing as well,but the width is decreasing; 2) there exist a significant rotation of the RW along clock wise direction. We also observe oppositely varying trend if is increasing to2. We define an area of the RW solution and find that this area associated with = 1 is invariant when and are changing. |