Some results on homoclinic and heteroclinic connections in planar systems

Abstract

Consider a family of planar systems depending on two parameters (n,b) and having at most one limit cycle. Assume that the limit cycle disappears at some homoclinic (or heteroclinic) connection when (n,b)=0. We present a method that allows to obtain a sequence of explicit algebraic lower and upper bounds for the bifurcation set (n,b)=0. The method is applied to two quadratic families, one of them is the well-known Bogdanov-Takens system. One of the results that we obtain for this system is the bifurcation curve for small values of n, given by b=5 7 n1/2+72/2401n- 30024/45294865n3/2- 2352961656/11108339166925 n2+O(n5/2). We obtain the new three terms from purely algebraic calculations, without evaluating Melnikov functions.