The limit cycles of a class of quintic polynomial vector fields (Q2336082)

The paper deals with the study of limit cycles for the following two-dimensional autonomous polynomial differential systems \[\dot{x}= \lambda x + 2aby + P_3(x, y) + P_5(x, y), \quad \dot{y}=-2abx + \lambda y + Q_3(x, y) + Q_5(x, y),\] where \(P_3\), \(Q_3\) and \(P_5\), \(Q_5\) are homogeneous polynomials of degree three and five respectively, \(\lambda\), \(a\) and \(b\) are real parameters. Applying the inverse integrating factor the authors derive estimations for the limit cycles number in different cases of a \(3\)-parametric class of the mentioned quintic polynomial differential systems.