8 research outputs found
Superintegrability of left-invariant sub-Riemannian structures on unimodular three-dimensional Lie groups
We consider left-invariant sub-Riemannian problems on three-dimensional unimodular Lie groups. We show that the Hamiltonian system of the Pontryagin maximum principle for such problems is Liouville integrable and even superintegrable (i.e., has four independent integrals, three of which are in involution)
Sub-Riemannian geodesics in SO(3) with application to vessel tracking in spherical images of retina
In order to detect vessel locations in spherical images of retina we consider the problem of minimizing the functional ∫0lℭ(γ(s))ξ2+kg2(s)ds for a curve γ on a sphere with fixed boundary points and directions. The total length l is free, s denotes the spherical arclength, and k g denotes the geodesic curvature of γ. Here the smooth external cost C ≥ δ > 0 is obtained from spherical data. We lift this problem to the sub-Riemannian (SR) problem in Lie group SO(3) and propose numerical solution to this problem with consequent comparison to exact solution in the case C = 1. An experiment of vessel tracking in a spherical image of the retina shows a benefit of using SO(3) geodesics
Structure of high-lying levels populated in the Y Zr decay
The nature of levels of Zr below the -decay value of Y has been investigated in high-resolution -ray spectroscopy following the decay as well as in a campaign of inelastic photon scattering experiments. Branching ratios extracted from decay allow the absolute excitation strength to be determined for levels populated in both reactions. The combined data represents a comprehensive approach to the wavefunction of levels below the value, which are investigated in the theoretical approach of the Quasiparticle Phonon Model. This study clarifies the nuclear structure properties associated with the enhanced population of high-lying levels in the Y decay, one of the three most important contributors to the high-energy reactor antineutrino spectrum