This paper explains and gives a global analysis of the rising egg phenomenon. The main tools that are used in this analysis are derived from the theory of dissipation-induced instabilities, adiabatic invariants, and LaSalle's invariance principle. The analysis is done within the framework of a specific model of the egg as a prolate spheroid, with its equations of motion derived from Newtonian mechanics. The paper begins by considering the linear and nonlinear stability of the non-risen and risen states of the spheroid corresponding to the initial and final state of the rising egg phenomenon. The asymptotic state of the spheroid is determined by an adiabatic momentum invariant. Because the symmetry associated with this adiabatic invariant co...
This work aims to use tools of Dynamical Systems to prove that the nonlinear Schr odinger equation p...
The aim of this thesis is to examine the spinning top from the point of view of the Smale programme ...
We derive the classical Delaunay variables by finding a suitable symmetry action of the three torus ...
It is surprising that a hard-boiled egg rises from the horizontal to the ver-tical when spun suffici...
Abstract. By treating tippe top inversion as a dissipation-induced instability, we explain tippe top...
We exhibit non-equivariant perturbations of the blowup solutions constructed in [18] for energy crit...
29 pagesThe primitive equations (PEs) model large scale dynamics of the oceans and the atmosphere. W...
This paper and Part 2 report various new insights into the classic Kelvin–Helmholtz problem which mo...
This paper demonstrates that the conditions for the existence of a dissipation-induced heteroclinic ...
In this thesis we analyze the phase of the heavy symmetric top and the tippe top. These tops are two...
The Tippe Top consist of a small truncated sphere with a peg as a handle. When it is spun fast enoug...
33 pagesWe consider the parabolic-elliptic Keller-Segel system in three dimensions and higher, corre...
We examine the spinning behavior of egg-shaped axisymmetric bodies whose cross sections are describe...
The dynamics of a rigid body in a central gravitational eld can be modelled by a Hamiltonian system...
We study an equivalent integrated form of the Tippe Top (TT) equations that leads to the Main Equati...
This work aims to use tools of Dynamical Systems to prove that the nonlinear Schr odinger equation p...
The aim of this thesis is to examine the spinning top from the point of view of the Smale programme ...
We derive the classical Delaunay variables by finding a suitable symmetry action of the three torus ...
It is surprising that a hard-boiled egg rises from the horizontal to the ver-tical when spun suffici...
Abstract. By treating tippe top inversion as a dissipation-induced instability, we explain tippe top...
We exhibit non-equivariant perturbations of the blowup solutions constructed in [18] for energy crit...
29 pagesThe primitive equations (PEs) model large scale dynamics of the oceans and the atmosphere. W...
This paper and Part 2 report various new insights into the classic Kelvin–Helmholtz problem which mo...
This paper demonstrates that the conditions for the existence of a dissipation-induced heteroclinic ...
In this thesis we analyze the phase of the heavy symmetric top and the tippe top. These tops are two...
The Tippe Top consist of a small truncated sphere with a peg as a handle. When it is spun fast enoug...
33 pagesWe consider the parabolic-elliptic Keller-Segel system in three dimensions and higher, corre...
We examine the spinning behavior of egg-shaped axisymmetric bodies whose cross sections are describe...
The dynamics of a rigid body in a central gravitational eld can be modelled by a Hamiltonian system...
We study an equivalent integrated form of the Tippe Top (TT) equations that leads to the Main Equati...
This work aims to use tools of Dynamical Systems to prove that the nonlinear Schr odinger equation p...
The aim of this thesis is to examine the spinning top from the point of view of the Smale programme ...
We derive the classical Delaunay variables by finding a suitable symmetry action of the three torus ...