Your search keyword '"Oberti C"' showing total 4 results

1. Influence of winding number on vortex knots dynamics

Author

Renzo L. Ricca, Chiara Oberti, Oberti, C, and Ricca, R

Subjects

Physics, Multidisciplinary, Toroid, lcsh:R, Winding number, lcsh:Medicine, Torus, Context (language use), Mechanics, Vorticity, Applied mathematics, MAT/07 - FISICA MATEMATICA, Mathematics::Geometric Topology, 01 natural sciences, Helicity, Article, 010305 fluids & plasmas, Vortex, Fluid dynamics, Winding number, vortex dynamics, topological fluid mechanics, 0103 physical sciences, lcsh:Q, Invariant (mathematics), lcsh:Science, 010306 general physics

Abstract

In this paper we determine the effects of winding number on the dynamics of vortex torus knots and unknots in the context of classical, ideal fluid mechanics. We prove that the winding number — a topological invariant of torus knots — has a primary effect on vortex motion. This is done by applying the Moore-Saffman desingularization technique to the full Biot-Savart induction law, determining the influence of winding number on the 3 components of the induced velocity. Results have been obtained for 56 knots and unknots up to 51 crossings. In agreement with previous numerical results we prove that in general the propagation speed increases with the number of toroidal coils, but we notice that the number of poloidal coils may greatly modify the motion. Indeed we prove that for increasing aspect ratio and number of poloidal coils vortex motion can be even reversed, in agreement with previous numerical observations. These results demonstrate the importance of three-dimensional features in vortex dynamics and find useful applications to understand helicity and energy transfers across scales in vortical flows.

Published

2019

2. Energy and helicity of magnetic torus knots and braids

Author

Renzo L. Ricca, Chiara Oberti, Oberti, C, and Ricca, R

Subjects

magnetic energy, General Physics and Astronomy, Geometry, 01 natural sciences, 010305 fluids & plasmas, Physics and Astronomy (all), Theoretical physics, Magnetic helicity, 0103 physical sciences, writhing number, 010303 astronomy & astrophysics, Writhe, Fluid Flow and Transfer Processes, Physics, Quantitative Biology::Biomolecules, magnetic braid, Magnetic energy, Mechanical Engineering, Torus, Coronal loop, helicity, Mathematics::Geometric Topology, Helicity, Magnetic field, Magnetohydrodynamics, torus knot

Abstract

By considering steady magnetic fields in the shape of torus knots and unknots in ideal magnetohydrodynamics, we compute some fundamental geometric and physical properties to provide estimates for magnetic energy and helicity. By making use of an appropriate parametrization, we show that knots with dominant toroidal coils that are a good model for solar coronal loops have negligible total torsion contribution to magnetic helicity while writhing number provides a good proxy. Hence, by the algebraic definition of writhe based on crossing numbers, we show that the estimated values of writhe based on image analysis provide reliable information for the exact values of helicity. We also show that magnetic energy is linearly related to helicity, and the effect of the confinement of magnetic field can be expressed in terms of geometric information. These results can find useful application in solar and plasma physics, where braided structures are often present.

Published

2018

3. Induction effects of torus knots and unknots

Author

Renzo L. Ricca, Chiara Oberti, Oberti, C, and Ricca, R

Subjects

Statistics and Probability, Physics, Pure mathematics, electric current, magnetic braid, Biot–Savart law, torus knots, winding number, magnetic braids,topological fluid mechanics, vortex filaments, electric currents, General Physics and Astronomy, Statistical and Nonlinear Physics, Torus, winding number, MAT/07 - FISICA MATEMATICA, 01 natural sciences, Biot-Savart law, 010305 fluids & plasmas, topological fluid mechanic, Modeling and Simulation, 0103 physical sciences, vortex filament, torus knot, 010306 general physics, Mathematical Physics

Abstract

Geometric and topological aspects associated with induction effects of field lines in the shape of torus knots/unknots are examined and discussed in detail. Knots are assumed to lie on a mathematical torus of circular cross-section and are parametrized by standard equations. The induced field is computed by direct integration of the Biot-Savart law. Field line patterns of the induced field are obtained and several properties are examined for a large family of knots/unknots up to 51 crossings. The intensity of the induced field at the origin of the reference system (center of the torus) is found to depend linearly on the number of toroidal coils and reaches maximum values near the boundary of the mathematical torus. New analytical estimates and bounds on energy and helicity are established in terms of winding number and minimum crossing number. These results find useful applications in several contexts when the source field is either vorticity, electric current or magnetic field, from vortex dynamics to astrophysics and plasma physics, where highly braided magnetic fields and currents are present.

Published

2017

4. On torus knots and unknots

Author

Chiara Oberti, Renzo L. Ricca, Ricca, R, and Oberti, C

Subjects

Algebra and Number Theory, Crossing number (knot theory), linking number, Winding number, Mathematical analysis, torsion, Geometry, Clifford torus, Torus, MAT/07 - FISICA MATEMATICA, Curvature, Mathematics::Geometric Topology, 01 natural sciences, Torus knot, 010305 fluids & plasmas, Knot (unit), writhe, curvature, 0103 physical sciences, Total curvature, parametric equation, 010306 general physics, Mathematics, Writhe

Abstract

A comprehensive study of geometric and topological properties of torus knots and unknots is presented. Torus knots/unknots are particularly symmetric, closed, space curves, that wrap the surface of a mathematical torus a number of times in the longitudinal and meridian direction. By using a standard parametrization, new results on local and global properties are found. In particular, we demonstrate the existence of inflection points for a given critical aspect ratio, determine the location and prescribe the regularization condition to remove the local singularity associated with torsion. Since to first approximation total length grows linearly with the number of coils, its nondimensional counterpart is proportional to the topological crossing number of the knot type. We analyze several global geometric quantities, such as total curvature, writhing number, total torsion, and geometric ‘energies’ given by total squared curvature and torsion, in relation to knot complexity measured by the winding number. We conclude with a brief presentation of research topics, where geometric and topological information on torus knots/unknots finds useful application.

Published

2016