Explicit expressions for meromorphic solutions of autonomous nonlinear ordinary differential equations

de Vries equation Kuramoto-Sivashinsky equation Kawahara equation

Nonautomonous ordinary differential equations, depending on two parameters \(\mu_{1}\) and \(\mu_{2}\), are considered in \(\mathbb{R}^{n}\). It is assumed that when both parameters are zero the differential equation is autonomous with a hyperbolic equilibrium and a homoclinic solution. No restricti

Moreover, any solution of (0.1) satisfying (0.3) can be constructed as a convergent series of iterated integrals, and the dimension of the manifold 9 S of such solutions is equal to the number of certain exponentials (exponentials e q j (x) , see section 1.2), which are decreasing in the whole secto

A second-order nonlinear differential equation describing the dynamics of a bulk viscous fluid filled general relativistic Friedmann-Robertson-Walker Universe is considered. By means of appropriate transformations, the evolution equation of the space-time is transformed into a third-order polynomial