Eisenstein and the quintic equation

We show using numerical simulations that a variety of localized patterns arise in a model equation: the quintic Swift-Hohenberg equation with complex coefficients. We demonstrate that various sizes of localized standing wave patterns are possible when the imaginary part of the complex coefficient is

The GinzburgÐLandau equation with small complex coe.cients is discussed in this paper[ A transformation is introduced to change the equation into a three order\ ordinary di}erential equation and the existence of the homoclinic orbit for this system has been proved by analytical methods[

The Korteweg-de Vries equation is numerically solved by using a new algorithm based on the quintic sphne approximation. An iterative scheme having 0(k2 + kh2) accuracy and five-band constant coefficients system of equations is devised. The stability of the proposed scheme is discussed. Comparisons