By treating tippe top inversion as a dissipation-induced instability, we explain tippe top inversion through a system we call the modified Maxwell--Bloch equations. We revisit previous work done on this problem and follow Or's mathematical model [SIAM J. Appl. Math., 54 (1994), pp. 597--609]. A linear analysis of the equations of motion reveals that the only equilibrium points correspond to the inverted and noninverted states of the tippe top and that the modified Maxwell--Bloch equations describe the linear/spectral stability of these equilibria. We supply explicit criteria for the spectral stability of these states. A nonlinear global analysis based on energetics yields explicit criteria for the existence of a heteroclinic connection betw...
Dynamical instability is an inherent feature of bosonic systems described by the Bogoliubov de Geene...
We present a new perspective on the problem of stable inversion of nonlinear non-minimum phase syste...
Stability of a linear autonomous non-conservative system in the presence of potential, gyroscopic, d...
Abstract. By treating tippe top inversion as a dissipation-induced instability, we explain tippe top...
This paper demontrates that the conditions for the existence of a dissipation-induced heteroclinic o...
We study an equivalent integrated form of the Tippe Top (TT) equations that leads to the Main Equati...
The Tippe Top is a type of spinning top (Fig. 1) that exhibits the strange behavior of inverting its...
Stability of a linear autonomous non-conservative system in the presence of potential, gyroscopic, d...
The goal of this work is to introduce a coherent theory of the counterintuitive phenomena of dynamic...
Stability of nonconservative systems is nontrivial already on the linear level, especially, if the s...
We reexamine a very classical problem, the spinning behavior of the tippe top on a horizontal table....
Among spinning objects, the tippe top exhibits one of the most bizarre and counterintuitive behaviou...
The main goal of this paper is to prove that if the energy- momentum (or energy-Casimir) method pred...
This paper studies the perturbation of a Lie-Poisson (or, equivalently an Euler-Poincaré) system by ...
Instabilities of uniform states are ubiquitous processes occurring in a variety of spatially extende...
Dynamical instability is an inherent feature of bosonic systems described by the Bogoliubov de Geene...
We present a new perspective on the problem of stable inversion of nonlinear non-minimum phase syste...
Stability of a linear autonomous non-conservative system in the presence of potential, gyroscopic, d...
Abstract. By treating tippe top inversion as a dissipation-induced instability, we explain tippe top...
This paper demontrates that the conditions for the existence of a dissipation-induced heteroclinic o...
We study an equivalent integrated form of the Tippe Top (TT) equations that leads to the Main Equati...
The Tippe Top is a type of spinning top (Fig. 1) that exhibits the strange behavior of inverting its...
Stability of a linear autonomous non-conservative system in the presence of potential, gyroscopic, d...
The goal of this work is to introduce a coherent theory of the counterintuitive phenomena of dynamic...
Stability of nonconservative systems is nontrivial already on the linear level, especially, if the s...
We reexamine a very classical problem, the spinning behavior of the tippe top on a horizontal table....
Among spinning objects, the tippe top exhibits one of the most bizarre and counterintuitive behaviou...
The main goal of this paper is to prove that if the energy- momentum (or energy-Casimir) method pred...
This paper studies the perturbation of a Lie-Poisson (or, equivalently an Euler-Poincaré) system by ...
Instabilities of uniform states are ubiquitous processes occurring in a variety of spatially extende...
Dynamical instability is an inherent feature of bosonic systems described by the Bogoliubov de Geene...
We present a new perspective on the problem of stable inversion of nonlinear non-minimum phase syste...
Stability of a linear autonomous non-conservative system in the presence of potential, gyroscopic, d...