Add to ORKGThe geodesics in the group of volume-preserving diffeomorphisms (volumorphisms) of a manifold $M$, for a Riemannian metric defined by the kinetic energy, can be used to model the movement of ideal fluids in that manifold. The existence of conjugate points along such geodesics reveal that these cease to be infinitesimally length-minimizing between their endpoints. In this work, we focus on the case of the torus $M=\T^2$ and on geodesics corresponding to steady solutions of the Euler equation generated by stream functions $\psi=-\cos(mx)\cos(ny)$ for integers $m$ and $n$, called Kolmogorov flows. We show the existence of conjugate points along these geodesics for all pairs of strictly positive integers $(m,n)$, thereby completing the characte...
We study the behavior of solutions to the incompressible 2d Euler equations near two canonical shear...
University of Minnesota Ph.D. dissertation. August 2009. Major: Mathematics. Advisor: Vladimir Svera...
This paper develops the geometric analysis of geodesic flow of a new right invariant metric {.,.}_1 ...
Abstract. We find a simple local criterion for the existence of conjugate points on the group of vol...
The existence of a conjugate point on the volume-preserving diffeomorphism group of a compact Rieman...
According to the principle of least action, the spatially periodic motions of one-dimensional mechan...
In fluid mechanics, the vorticity provides a valuable alternative perspective of the behavior of flo...
On the geodesic flow of tori without conjugate points. - In: Mathematische Zeitschrift. 216. 1994. S...
Abstract. This paper describes a wide class of coupled KdV equa-tions. The first set of equations di...
AbstractWe show that the following three systems related to various hydrodynamical approximations: t...
The flow of the Euler top is a geodesic flow on SO(3) with a left invariant metric. We determine the...
Geodesics along the group of volume preserving diffeomorphisms are solutions to Euler equations of i...
AbstractHolm, Marsden, and Ratiu (Adv. in Math.137(1998), 1–81) derived a new model for the mean mot...
In this paper we consider the geometry of Hamiltonian flows on the cotangent bundle of coadjoint orb...
International audienceWe study the geodesic problem on the group of diffeomorphism of a domain M⊂Rd,...
We study the behavior of solutions to the incompressible 2d Euler equations near two canonical shear...
University of Minnesota Ph.D. dissertation. August 2009. Major: Mathematics. Advisor: Vladimir Svera...
This paper develops the geometric analysis of geodesic flow of a new right invariant metric {.,.}_1 ...
Abstract. We find a simple local criterion for the existence of conjugate points on the group of vol...
The existence of a conjugate point on the volume-preserving diffeomorphism group of a compact Rieman...
According to the principle of least action, the spatially periodic motions of one-dimensional mechan...
In fluid mechanics, the vorticity provides a valuable alternative perspective of the behavior of flo...
On the geodesic flow of tori without conjugate points. - In: Mathematische Zeitschrift. 216. 1994. S...
Abstract. This paper describes a wide class of coupled KdV equa-tions. The first set of equations di...
AbstractWe show that the following three systems related to various hydrodynamical approximations: t...
The flow of the Euler top is a geodesic flow on SO(3) with a left invariant metric. We determine the...
Geodesics along the group of volume preserving diffeomorphisms are solutions to Euler equations of i...
AbstractHolm, Marsden, and Ratiu (Adv. in Math.137(1998), 1–81) derived a new model for the mean mot...
In this paper we consider the geometry of Hamiltonian flows on the cotangent bundle of coadjoint orb...
International audienceWe study the geodesic problem on the group of diffeomorphism of a domain M⊂Rd,...
We study the behavior of solutions to the incompressible 2d Euler equations near two canonical shear...
University of Minnesota Ph.D. dissertation. August 2009. Major: Mathematics. Advisor: Vladimir Svera...
This paper develops the geometric analysis of geodesic flow of a new right invariant metric {.,.}_1 ...