Complex dynamical behavior and numerical simulation of a Cournot-Bertrand duopoly game with heterogeneous players.

• A Cournot-Bertrand duopoly mixed competition model is established. • The stability conditions of the system are analyzed by numerical calculation and numerical simulation. • The Arnold's tongues are studied. • The coexistence of attractors is analyzed by using the basin of attraction. • The contact bifurcation in the basin of attraction is studied by using the theory of critical curve and noninvertible map. In this paper, we consider the Cournot-Bertrand duopoly mixed competition model, which is characterized by different decision-making variables and different objective functions of the two enterprises. This form of competition is more consistent with the complex actual economic market. The general stability conditions of the four equilibria are given and analyzed with eigenvalues and Jury criterion, so that enterprise decision makers could choose appropriate parameters to determine the development of the enterprise. Under the specific parameter conditions, the stability conditions are analyzed and demonstrated in detail by using two-dimensional bifurcation diagrams, stable region diagrams and bifurcation curves. Many fractal Arnold's tongues are found in two-dimensional bifurcation diagrams. These tongues are associated with the Neimark-Sacker bifurcation of the fixed point and are arranged in accordance with the organization law of the periodic tree of the Stern-Brocot tree, which is helpful for us to analyze the transitions of system between period and chaos. With the help of the basin of attraction, the coexistence of attractors is analyzed, on which the decision maker can choose the initial conditions that are beneficial to the development of the enterprise. We also analyze the topology structure of basin of attraction and the formation mechanism of holes in the basin of attraction by using the theory of critical curve and noninvertible map. [ABSTRACT FROM AUTHOR]