• double-inflection saddles,
• inflection-source (sink) flows,
• parabola-saddles (saddle-center),
• third-order parabola-saddles,
• third-order saddles (centers),
• third-order saddle-source (sink).

Crossing and Product cubic Systems.- Double-inflection Saddles and Parabola-saddles.- Three Parabola-saddle Series and Switching Dynamics.- Parabola-saddles, (1:1) and (1:3)-Saddles and Centers.- Equilibrium Networks and Switching with Hyperbolic Flows.

Back cover Materials

Albert C J Luo

Two-dimensional Self and Product Cubic Systems, Vol. I

Self-linear and crossing-quadratic product vector field

This book is the twelfth of 15 related monographs on Cubic Systems, discusses self and product cubic systems with a self-linear and crossing-quadratic product vector field. Equilibrium series with flow singularity are presented and the corresponding switching bifurcations are discussed. The volume explains how the equilibrium series with connected hyperbolic and hyperbolic-secant flows exist in such cubic systems, and that the corresponding switching bifurcations are obtained through the inflection-source and sink infinite-equilibriums. Finally, the author illustrates how, in such cubic systems, the appearing bifurcations include saddle-source (sink) for equilibriums and inflection-source and sink flows for the connected hyperbolic flows, and the third-order saddle, sink and source are the appearing and switching bifurcations for saddle-source (sink) with saddles, source and sink, and also for saddle, sink and source.

·       Develops a theory of self and product cubic systems with a self-linear and crossing-quadratic product vector field;

·       Presents equilibrium series with flow singularity and connected hyperbolic and hyperbolic-secant flows;

·       Shows equilibrium series switching bifurcations through a range of sources and saddles on the infinite-equilibriums.