Add to ORKGtextThis is a summary report on some existing results and methods regarding the problem of determining the basins of attraction of dynamical systems (in particular, two-dimensional diffeomorphisms) when there is a coexistence of attractors. Based on the work of Helena Nusse and James Yorke, it presents existence and characterization results for a certain kind of basin boundaries (namely, the Wada boundaries). The key feature of their approach is to redefine the idea of a basin boundary by introducing the notion of a `basin cell', which bypasses the problem of exactly locating the attractor of a system, which is often either not well-defined or hard to locate in practice. Moreover, the basin cells and their boundaries are characterized by ut...
This paper describes a new numerical method to Compute the separatrix of the basins of attraction of...
This paper describes some numerical experiments giving evidence of Wada basin boundaries for the Duf...
Abstract: In this work, we consider a family of two-dimensional coupled sine maps. We provide detail...
In dynamical systems examples are common in which two or more attractors coexist, and in such cases,...
In dynamical systems examples are common in which two or more attractors coexist, and in such cases ...
abstract: Dividing the plane in half leaves every border point of one region a border point of both ...
Many remarkable properties related to chaos have been found in the dynamics of nonlinear physical sy...
Basin boundaries play an important role in the study of dynamics of nonlinear models in a variety of...
In dynamical systems examples are common in which two or more attractors coexist, and in such cases ...
AbstractIn dynamical systems examples are common in which two or more attractors coexist, and in suc...
In systems that exhibit multistability, namely those that have more than one coexisting attractor, t...
Abstract In this lesson we consider discrete time dynamical systems with coexisting attractors, and ...
Multistability, or coexistence of multiple attractors, is a common and potentially dangerous propert...
In this paper, we investigate a kind of intertwining phenomenon and give a new definition of intertw...
This paper deals with intertwined basins of attraction for dynamical systems in a metric space. Afte...
This paper describes a new numerical method to Compute the separatrix of the basins of attraction of...
This paper describes some numerical experiments giving evidence of Wada basin boundaries for the Duf...
Abstract: In this work, we consider a family of two-dimensional coupled sine maps. We provide detail...
In dynamical systems examples are common in which two or more attractors coexist, and in such cases,...
In dynamical systems examples are common in which two or more attractors coexist, and in such cases ...
abstract: Dividing the plane in half leaves every border point of one region a border point of both ...
Many remarkable properties related to chaos have been found in the dynamics of nonlinear physical sy...
Basin boundaries play an important role in the study of dynamics of nonlinear models in a variety of...
In dynamical systems examples are common in which two or more attractors coexist, and in such cases ...
AbstractIn dynamical systems examples are common in which two or more attractors coexist, and in suc...
In systems that exhibit multistability, namely those that have more than one coexisting attractor, t...
Abstract In this lesson we consider discrete time dynamical systems with coexisting attractors, and ...
Multistability, or coexistence of multiple attractors, is a common and potentially dangerous propert...
In this paper, we investigate a kind of intertwining phenomenon and give a new definition of intertw...
This paper deals with intertwined basins of attraction for dynamical systems in a metric space. Afte...
This paper describes a new numerical method to Compute the separatrix of the basins of attraction of...
This paper describes some numerical experiments giving evidence of Wada basin boundaries for the Duf...
Abstract: In this work, we consider a family of two-dimensional coupled sine maps. We provide detail...