A family of dissipative two-dimensional mappings: Chaotic, regular and steady state dynamics investigation

“…There are rich dynamic behaviors in some cases, such as in sheared suspensions [11], in creeping flow [12], and around a weakly-magnetized Schwarzschild black hole [13]. This shows that the particle motion becomes complex because of the existence of external force, and the particle system has different dynamic behaviors under different external forces [14][15][16]. Here, we assume that a particle with unit mass is moving on a horizontal smooth plane (p, q), and the forces on the particle in p and q direction are F p and F q , respectively, where:…”

“…Let m = 1, R e and I e denote the real and imaginary parts of β 1 , then: 14 , the eigenvectors are obtained:…”

Dynamic Analysis of a Particle Motion System

“…There are rich dynamic behaviors in some cases, such as in sheared suspensions [11], in creeping flow [12], and around a weakly-magnetized Schwarzschild black hole [13]. This shows that the particle motion becomes complex because of the existence of external force, and the particle system has different dynamic behaviors under different external forces [14][15][16]. Here, we assume that a particle with unit mass is moving on a horizontal smooth plane (p, q), and the forces on the particle in p and q direction are F p and F q , respectively, where:…”

“…Let m = 1, R e and I e denote the real and imaginary parts of β 1 , then: 14 , the eigenvectors are obtained:…”

Dynamic Analysis of a Particle Motion System

Nonlinear dynamics of charged particle slipping on rough surface with periodic force

An investigation of the parameter space for a family of dissipative mappings