The 16th Hilbert problem for discontinuous piecewise isochronous centers of degree one or two separated by a straight line

In this paper, we deal with discontinuous piecewise differential systems formed by two differential systems separated by a straight line when these two differential systems are linear centers (which always are isochronous) or quadratic isochronous centers. It is known that there is a unique family of linear isochronous centers and four families of quadratic isochronous centers. Combining these five types of isochronous centers, we obtain 15 classes of discontinuous piecewise differential systems. We provide upper bounds for the maximum number of limit cycles that these fifteen classes of discontinuous piecewise differential systems can exhibit, so we have solved the 16th Hilbert problem for such differential systems. Moreover, in seven of the classes of these discontinuous piecewise differential systems, the obtained upper bound on the maximum number of limit cycles is reached.

Automated summary

This paper deals with discontinuous piecewise differential systems formed by linear centers and quadratic centers, providing upper bounds for the maximum number of limit cycles they can exhibit. The study has solved the 16th Hilbert problem for such differential systems, with seven classes reaching the obtained upper bounds on the maximum number of limit cycles.