A rotational fluid model which can be used to describe broad vortical flows ranging from large scale to the atmospheric mesoscale and the oceanic submesoscale is studied by the symmetry group theory. After introducing one scalar-, two vector-, and two tensor potentials, we find that the Lie symmetries of the extended system include many arbitrary functions of z and {z,t}. The obtained Lie symmetries are used to find some types of exact solutions. One of exact solutions can be used to qualitatively describe the three-dimensional structure of hurricanes
The Lie group method is applied to the third order variant Boussinesq system, which arises in the mo...
On the basis of the angular momentum equation for a fluid shell on a rotating planet, we analyze the...
The Navier-Stokes equations admit symmetry properties, such as the two-dimensional material indiffer...
The machinery of Lie theory (groups and algebras) is applied to the unsteady equations of motion of ...
The present work deals with the stability theory of fluid flows. The central subject is the question...
Rotating fluid systems can display large-scale asymmetries about the equator. A model-independent m...
In this dissertation the first problem of Stoke’s for the rotating flow of third grade fluid will be...
In turbulent rotating convection a typical flow structuring in columnar vortices is observed. In the...
From Hamilton's principle and a factorization Ansatz we derive a class of exact solutions for t...
This work applies new insights into turbulent statistics gained by Lie symmetry analysis to the clos...
Abstract: The results of Dirichlet, Dedekind and Rie-mann on 'ellipsoidal figures of equilibriu...
Dramatic amplification of rotational motion can occur in vortices of very different scales, which ca...
Symmetries of a fluid-gyrokinetic model are investigated using Lie group techniques. Specifically, t...
In the present work, scaling laws for special turbulent flow phenomena are investigated using a math...
The equilibrium of a rotating self-gravitating fluid is governed by non-linear equations. The equili...
The Lie group method is applied to the third order variant Boussinesq system, which arises in the mo...
On the basis of the angular momentum equation for a fluid shell on a rotating planet, we analyze the...
The Navier-Stokes equations admit symmetry properties, such as the two-dimensional material indiffer...
The machinery of Lie theory (groups and algebras) is applied to the unsteady equations of motion of ...
The present work deals with the stability theory of fluid flows. The central subject is the question...
Rotating fluid systems can display large-scale asymmetries about the equator. A model-independent m...
In this dissertation the first problem of Stoke’s for the rotating flow of third grade fluid will be...
In turbulent rotating convection a typical flow structuring in columnar vortices is observed. In the...
From Hamilton's principle and a factorization Ansatz we derive a class of exact solutions for t...
This work applies new insights into turbulent statistics gained by Lie symmetry analysis to the clos...
Abstract: The results of Dirichlet, Dedekind and Rie-mann on 'ellipsoidal figures of equilibriu...
Dramatic amplification of rotational motion can occur in vortices of very different scales, which ca...
Symmetries of a fluid-gyrokinetic model are investigated using Lie group techniques. Specifically, t...
In the present work, scaling laws for special turbulent flow phenomena are investigated using a math...
The equilibrium of a rotating self-gravitating fluid is governed by non-linear equations. The equili...
The Lie group method is applied to the third order variant Boussinesq system, which arises in the mo...
On the basis of the angular momentum equation for a fluid shell on a rotating planet, we analyze the...
The Navier-Stokes equations admit symmetry properties, such as the two-dimensional material indiffer...