The classification of reversible cubic systems with center (Q1345803)

The paper deals with the problem of the classification of reversible cubic systems with center which are not integrable by means of Darboux integral or Darboux-Schwartz-Christoffel integral or Darboux hyperelliptic integral. Let \(A^ R_ 3\) be the set of such systems. First, the author explains the meaning of these expressions. Let \(\phi: \mathbb{R} P^ 2\to \mathbb{R} P^ 2\), \(\phi(x, y)= (X, Y)\) be a rational map realizing the reversibility and \(V'= F(X, Y) \partial_ X+ G(X, Y) \partial_ Y\) be a vector field in the \(\phi\)-image described by means of the equation \({dX\over dY}= {F(X, Y)\over G(X, Y)}\). The author lists 17 pairs \((\phi, V')\) and proves that any \(V(x, y)\in A^ R_ 3\) is reversible by means of one of these pairs. The proof is divided into many propositions and many lemmas.