On the geometry of curves and conformal geodesics in the Möbius space

Magliaro, Marco; Mari, Luciano; Rigoli, Marco

doi:10.1007/s10455-011-9250-8

Cited by 11 publications

(15 citation statements)

References 24 publications

(52 reference statements)

Supporting

Mentioning

Contrasting

Order By: Relevance

“…Using Lemma 2.3, an explicit integration of the critical curves was carried out in [26] (see also [22]). The proof of Theorem 2.2 is a direct consequence of this integration.…”

Section: Critical Curvesmentioning

confidence: 99%

“…In this paper we address the question of existence and properties of closed critical curves for the functional L. Actually, it suffices to consider the 3-dimensional case only, since from the results in [22] we can see that any closed critical curve in R n lies in some R 3 ⊂ R n , up to a conformal transformation. It is known that a generic space curve is determined, up to conformal transformations, by the conformal arclength and two conformal curvatures (cf.…”

Section: Introductionmentioning

confidence: 99%

See 1 more Smart Citation

Quantization of the conformal arclength functional on space curves

Musso

Nicolodi

2017

Communications in Analysis and Geometry

View full text Add to dashboard Cite

By a conformal string in Euclidean space is meant a closed critical curve with non-constant conformal curvatures of the conformal arclength functional. We prove that (1) the set of conformal classes of conformal strings is in 1-1 correspondence with the rational points of the complex domain $\{q\in \mathbb{C} \,:\, 1/2 < \mathrm{Re}\, q < 1/\sqrt{2},\,\, \mathrm{Im}\, q > 0,\,\, |q| < 1/\sqrt{2}\}$ and (2) any conformal class has a model conformal string, called symmetrical configuration, which is determined by three phenomenological invariants: the order of its symmetry group and its linking numbers with the two conformal circles representing the rotational axes of the symmetry group. This amounts to the quantization of closed trajectories of the contact dynamical system associated to the conformal arclength functional via Griffiths' formalism of the calculus of variations.Comment: 24 pages, 6 figures. v2: final version; minor changes in the exposition; references update

show abstract

“…Using Lemma 2.3, an explicit integration of the critical curves was carried out in [26] (see also [22]). The proof of Theorem 2.2 is a direct consequence of this integration.…”

Section: Critical Curvesmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Quantization of the conformal arclength functional on space curves

Musso

Nicolodi

2017

Communications in Analysis and Geometry

View full text Add to dashboard Cite

show abstract

“…Chains arise as projections of null geodesics of the Fefferman conformal structure. Inspired by the strong interrelationships between cr and Lorentzian conformal geometry and by some earlier works on conformal geometry of curves [13,36,38,43], we analyze global properties of Legendrian curves in the 3-sphere equipped with its standard cr-structure. In addition to the aforementioned interrelationships with Lorentzian conformal geometry, the fact that the cr-transformation group of S 3 is a real form of PSL(3, C), explains the many formal similarities with classical projective differential geometry of plane curves [6,26,42,40,46].…”

Section: Introductionmentioning

confidence: 99%

The Cauchy–Riemann strain functional for Legendrian curves in the 3-sphere

Musso

Salis

2020

Annali di Matematica

View full text Add to dashboard Cite

The lower-order cr-invariant variational problem for Legendrian curves in the 3-sphere is studied and its Euler-Lagrange equations are deduced. Closed critical curves are investigated. Closed critical curves with non-constant cr-curvature are characterized. We prove that their cr-equivalence classes are in one-to-one correspondence with the rational points of a connected planar domain. A procedure to explicitly build all such curves is described. In addition, a geometrical interpretation of the rational parameters in terms of three phenomenological invariants is given. (4.2) 4.2. The strain functional and its critical curves. Let J ⊂ I be a closed interval. The integral S J (γ) = J sdt,

show abstract

“…We consider the conformally invariant variational problem on generic curves defined by the conformal arclength functional ℒ = . For = 3 and higher dimensions this variational problem was studied in [7], [11]. A generic space curve is determined, up to conformal transformations, by the conformal arclength and two conformal curvatures.…”

Section: Introductionmentioning

confidence: 99%