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Conjoined Lorenz twins—a new pseudohyperbolic attractor in three-dimensional maps and flows

С. В. Гонченко, Efrosiniia Karatetskaia, Alexey Kazakov, Vyacheslav P. Kruglov

2022Chaos An Interdisciplinary Journal of Nonlinear Science11 citationsDOI

Abstract

We describe new types of Lorenz-like attractors for three-dimensional flows and maps with symmetries. We give an example of a three-dimensional system of differential equations, which is centrally symmetric and mirror symmetric. We show that the system has a Lorenz-like attractor, which contains three saddle equilibrium states and consists of two mirror-symmetric components that are adjacent at the symmetry plane. We also found a discrete-time analog of this "conjoined-twins" attractor in a cubic three-dimensional Hénon map with a central symmetry. We show numerically that both attractors are pseudohyperbolic, which guarantees that each orbit of the attractor has a positive maximal Lyapunov exponent, and this property is preserved under small perturbations. We also describe bifurcation scenarios for the emergence of the attractors in one-parameter families of three-dimensional flows and maps possessing the symmetries.

Topics & Concepts

AttractorLorenz systemLyapunov exponentSymmetry (geometry)BifurcationMultistabilityHomogeneous spaceMathematicsRössler attractorMathematical analysisSaddleOrbit (dynamics)Plane (geometry)PhysicsPure mathematicsGeometryNonlinear systemQuantum mechanicsAerospace engineeringMathematical optimizationEngineeringNonlinear Dynamics and Pattern FormationChaos control and synchronizationQuantum chaos and dynamical systems
Conjoined Lorenz twins—a new pseudohyperbolic attractor in three-dimensional maps and flows | Litcius