Title of article
Synchronization, intermittency and critical curves in a duopoly game Original Research Article
Author/Authors
Gian Italo Bischi، نويسنده , , Luciano Stefanini، نويسنده , , Laura Gardini، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 1998
Pages
27
From page
559
To page
585
Abstract
The phenomenon of synchronization of a two-dimensional discrete dynamical system is studied for the model of an economic duopoly game, whose time evolution is obtained by the iteration of a noninvertible map of the plane. In the case of identical players the map has a symmetry property that implies the invariance of the diagonal x1=x2, so that synchronized dynamics is possible. The basic question is whether an attractor of the one-dimensional restriction of the map to the diagonal is also an attractor for the two-dimensional map, and in which sense. In this paper, a particular dynamic duopoly game is considered for which the local study of the transverse stability, in a neighborhood of the invariant submanifold in which synchronized dynamics takes place, is combined with a study of the global behavior of the map. When measure theoretic, but not topological, attractors are present on the invariant diagonal, intermittency phenomena are observed. The global behavior of the noninvertible map is investigated by studying of the critical manifolds of the map, by which a two-dimensional region is defined that gives an upper bound to the amplitude of intermittent trajectories. Global bifurcations of the basins of attraction are evidenced through contacts between critical curves and basin boundaries.
Journal title
Mathematics and Computers in Simulation
Serial Year
1998
Journal title
Mathematics and Computers in Simulation
Record number
853323
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