Christophe LETELLIER
15/01/2008

Edward Lorenz

**Edward Lorenz**

The Lorenz system was introduced by Edward Lorenz in 1963 when he was questioning the root of the difficulty to correctly predict the wheather. In order to check whether the model quality was involved or not, he used an extremely simplified description of a Rayleigh-Bénard convection as studied by one of his pupil, Barry Saltzman [1]. Lorenz thus obtained the set of three ordinary differential equations [2]

With parameter values , and , the so-called Lorenz attractor is obtained (Fig. 1). An quite extended study of the parameter space was recently performed [3]

**Fig. 1: The Lorenz attractor.**

With this simple model, Lorenz understood that the origin of the lack of predictability of wheather events was inherent to the phenomena and was not resulting from the simplicity of the model.
On December 29, 1972, Lorenz presented in a session devoted to the *Global Atmospheric Research Program in Washington* a text entitled

Lorenz had sometimes used a sea gull as a symbol for sensitive dependence. But the swith to a butterfly, as Lorenz wrote in his book *The Essence of Chaos* [4], was actually made by the session convenor, the meteorologist Philip Merilees, who was unable to check with him when he had to sumit the program title. Lorenz partly answered the question as
“*over the years minuscule disturbances neither increase nor decrease the frequency of occurre,ce of various wheather events such as tornados; the most that they may do is to modify the sequence in which these events occur*”.

First topological analysis of the Lorenz system was made by Robert Williams and J. S. Birman [5] [6]. They considered the periodic orbits embedded within the attractor as knots and built a “*knot holded*” that became a “*template*” in Gilmore’s works [7].

The topology of the Lorenz system is not so easy to characterize due to the symmetry properties of the system. Indeed, the Lorenz system is invariant under a rotation symmetry around the -axis. This has deep consequences in the analysis as investigated by Letellier, Dutertre and Gouesbet [8]. The concept of “*fundamental domain*” (one wing of the Lorenz attractor) can be used to tasselate the phase space. The Lorenz attractor is thus made of two copies of the fundamental domain. The dynamical analysis can be simplified by projecting the whole attractor onto the fundamental domain. This approach was related to the relation between “*covers*” and “*images*” as introduced by Miranda & Stone [9] and detailed here.

**G. H. Quincke**

The spontaneous rotation of an insulating particle immersed
in a low conducting liquid and submitted to a high dc
electric field was observed as early as 1896 by Georg Hermann Quincke (1834-1924)
[10]. The
mechanism involved is the following: During their migration
from one electrode to the other, the free charges (ions) of the
liquid accumulate at the surface of the particle, inducing a
dipole moment *P*. If the charge relaxation time of the liquid
is shorter than that of the solid, the direction of *P* is opposite
to that of the field. Then, for a field intensity high
enough, this configuration is unstable and the particle begins
to rotate in order to flip the orientation of the induced dipole
along the field direction. A noticeable property of the Quincke rotation is that
the angular velocity does not depend on the particle size.

Taking into account the inertia of the particle, the dynamics of the particle obeys nonlinear equations which are strictly equivalent to the Lorenz equations [11].

The rotor is a glass capillary tube (length *L*=5 cm, outer
radius *a*=1 mm, inner radius *b*=0.5 mm) mounted on two
needle points (Fig. 2). The cylinder is supported by a frame
that contains two cavities in which the needle points fit. This
mounting allows the cylinder to rotate almost freely around
its axis with a very low precession. The rotor is immersed in transformer oil whose viscosity
is *h*=14 mPa s and placed between two square stainless steel
electrodes (4 cm long) separated by a 1 cm gap.

**Fig. 2: Experimental setup conducted by Peters and coworkers.**

A first-return map to the maxima of the angular velocity of the rotor obtained by Peters and coworkers [10] presents the characteristic cusp of the Lorenz map (Fig. 3).

**Fig. 3 : Experimental first-return map with a shape characteristic of the Lorenz map.**

[1] **B. Saltzman**, Finite amplitude free convection as an initial value problem-I, *Journal of the Atmospheric Sciences*, **19**, 329-341, 1962.

[2] **E. Lorenz**, Deterministic nonperiodic flow, *Journal of the Atmospheric Sciences*, **20**, 130-141, 1963.

[3] **R. Barrio & S. Serrano**, A three-parametric study of the Lorenz model, *Physica D*, **229**, 43–51, 2007 - Bounds for the chaotic region in the Lorenz model, *Physica D*, **238**, 1615-1624, 2009.

[4] **E. Lorenz**, *The Essence of Chaos*, UCL Press, 1993.

[5] **R. F. Williams**, The structure of Lorenz attractors, *IHES Publications Mathématiques*, **50**, 73-100, 1979.

[6] **J. S. Birman & R. F. Williams**, Knotted periodic orbits in dynamical systems I: Lorenz’s equations, *Topology*, **22** (1), 47-82, 1983.

[7] **G. B. Mindlin & R. Gilmore**, Topological analysis and synthesis of chaotic time series, *Physica D*, **58**, 229-242, 1992.

[8] **C. Letellier, P. Dutertre & G. Gouesbet**, Characterization of the Lorenz system taking into account the equivariance of the vector field,
*Physical Review E*, **49** (4), 3492-3495, 1994.

[9] **R. Miranda & E. Stone**, The proto-Lorenz system,
*Physics Letters A*, **178**, 105-113, 1993.

[10] **G. Quincke**, Über Rotationen im constanten electrischen Felde,
*Annalen der Physik und Chemie*, **59**, 417-486, 1896.

[11] **F. Peters, L. Lobry & E. Lemaire**,
Experimental observation of Lorenz chaos in the Quincke rotor dynamics,
*Chaos*, **15**, 013102, 2005.