On the energy of distributions, with application to the quaternionic Hopf fibrations
From MaRDI portal
Publication:5954997
DOI10.1007/PL00010092zbMath0998.53022OpenAlexW2013392589MaRDI QIDQ5954997
Pablo M. Chacón, Antonio M. Naveira, Jane M. Weston
Publication date: 16 November 2002
Published in: Monatshefte für Mathematik (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/pl00010092
Related Items (21)
A new version of the energy of tangent indicatrix with dynamics system in Lie group ⋮ An approach to energy and elastic for curves with extended Darboux frame in Minkowski space ⋮ The energy of a domain on the surface ⋮ Energy of generalized distributions ⋮ A novel condition to the harmonic of the velocity vector field of a curve in \(\mathbb R^n\) ⋮ A new approach to the bienergy and biangle of a moving particle lying in a surface of Lorentzian space ⋮ Harmonic almost contact structures ⋮ A new version of energy and elastica for curves with extended darboux frame ⋮ Notes on the bienergy and biangle of a moving particle lying in a surface of euclidean space ⋮ Harmonicity and minimality of distributions on Riemannian manifolds via the intrinsic torsion ⋮ 3-quasi-Sasakian manifolds ⋮ Corrected energy of the Reeb distribution of a 3-Sasakian manifold ⋮ On the energy and pseudoangle of Frenet vector fields in \(\mathbb{R}_\nu^n\) ⋮ Harmonicity and minimality of oriented distributions ⋮ The Boothby-Wang fibration of the Iwasawa manifold as a critical point of the energy ⋮ On the energy of frenet vectors fields in Rn ⋮ THE CLASSICAL BERNOULLI-EULER ELASTIC CURVE IN A MANIFOLD ⋮ A New Approach On The Curvature Dependent Energy For Elastic Curves in a Lie Group ⋮ A new characterization for classical Bernoulli–Euler elastic curves in Rn ⋮ A new version of Fermi Walker derivative with constant energy for normal image of slant helix in the Lie groups ⋮ Unnamed Item
This page was built for publication: On the energy of distributions, with application to the quaternionic Hopf fibrations
