Different methods are proposed and tested for transforming a non-linear differential system, and more particularly a Hamiltonian one, into a map without integrating the whole orbit as in the well-known Poincare return map technique. We construct piecewise polynomial maps by coarse-graining the phase-space surface of section into parallelograms and using either only values of the Poincare maps at the vertices or also the gradient information at the nearest neighbors to define a polynomial approximation within each cell. The numerical experiments are in good agreement with both the real symplectic and Poincare maps

Froeschle, Claude

Petit, Jean-Marc

English

NASA Technical Reports Server

Asteroids, Comets, Meteors 1991, pp. 201-204
Lunar and Planetary Institute, Houston, 1992 / _Z' _) _ _/
N9 - 19
POLYNOMIAL APPROXIMATIONS OF POINCARII MAPS FOR
I-IAMILTONIAN SYSTEMS
201
150
Claude Froeschl6 and Jean-Marc Petit
Observaloire de Nice, O.C.A., B.P. 139, 06003 Nice Cedex, France
Abstract Different methods are proposed and tested for transforming a non linear differential system,
and more particularly a Hamiltonian one, into a map without integrating the whole orbit as in tile well-
known Poincar_ return map technique. We construct piecewise polynomial maps by coarse-graining the
phase-space surface of section into parallelograms and using either only values of the Poincar6 maps at the
vertices or also the gradient information at the nearest neighbours to define a polynomial approximation
within each cell. The numerical experiments are in good agreement with both the real symplectic and
Poincard maps.
A synthetic approach
Poincar6 maps are now of common use for studying the qualitative behaviour of differential equations (see
H6non, 1981). Moreover, in order to study stability problems, many authors have sought explicit algebraic
mappings which approximate, at least qualitatively, the Poincar_ maps obtained from the original Newton
equations. Froesehl_ and Petit (1990, paper I) have reviewed some of these mappings and showed that they
are reliable only as long as one remains within the domain of validity of the approximations made in order
to isolate either -- in the case of deterministic mappings -- an integrable part and some instantaneous
perturbations, or -- for stochastic mappings --- a source of endogeneous/exogeneous stoehasticity (see
Froeschl6 and Rickman, 1988). All these mappings are ad hoc and reliable only in some region of the
phase space and for some specific purpose. In paper I we built a mapping valid everywhere in the phase
space, following an idea already used by Varosi et al. (1987) but in the framework of non-tIamiltonian
systems (i.e., systems where attractors do exist). The method consists of coarse-graining the phase-
space surface of section and then interpolating the value of the image of a point. Linear interpolation
requires a rather fine graining of the phase space, hence it is necessary to compute a lot of points on the
grid. However, Taylor expansions of order 3 and 5 can provide very good results as long as symmetrical
interpolation formulae are applied, for which it is necessary to use an extended grid. Since there are cases
where one cannot cross a given limit, asymmetrical interpolation formulae have been tested, but their
accuracy ",,'as found to be inferior. Therefore Petit and Froeschl6 (1991, paper II) have developed another
type of interpolation, where the information, including that on the gradients, is stored to the same level
of accuracy only for the nearest-neighbouring vertices. Thus, not only images of vertices are computed,
but also tangential mappings at each vertex.
There are in any case two key parameters: the number of bins in each direction N = (total number
of cells) I/D, where D (= 2 and 3 in papers I and II) is the dimension of the surface of section, and M
the order of the Taylor expansion. In order to explore the validity of the synthetic approach, we have
applied our method in two cases:
1) An algebraic area-preserving mapping for which the computation of orbits is very fast. This allows
one to follow a large number of orbits and to carry out enough iterations for a meaningful comparison.
2) A special case of the restricted three-body problem, already studied by Duncan et al. (1989).
In the former case the well-known standard mapping has been used (Froeschl6, 1970; Lichtenberg
and Lieberman, 1983):
X(n+l) = X(n) + a sin(x(n) + y(n)),
y(n+l) = z(n) + y(,_y. (mod 2r)
Fig. 1 shows orbits of the standard mapping for a = -1.3. Indeed such a mapping exhibits all the
well-known typical features of problems with two degrees of freedom, such as invariant curves, "islands",
and stochastic zones where the points wander in a chaotic way. Figs. lb and lc are magnifications of the
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202 Asteroids, Comets, Meteors 1991
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small boxes shown in (a), respectively at the right border and near the left border.
Figs. 2a-c: Same as in Figs. la-c but using a Taylor approximation of order 3 with a
regular grid and _lecentered formulae.
Figs_3a--c: The same as in Figs. !a-c but using a Taylor approximation of order 3 with a
non-r+:gular grid and decentered formu!ae.
Figs. 4a-c: The same as in Figs. la-c bug Using a Taylor approximation of order 3 with a
regular grid and the gradient method.
Asteroids,Comets,Meteors1991 203
small boxes indicated in Fig. la. At this magnification level, details like second-order islands become
evident and the approximation levels of the synthetic maps are easily visualized. Figs. 2a, 2b and
2c correspond to the same orbits and the same magnifications as Figs. la-c, but using the Taylor
interpolation mapping of order M = 3 with decentered formulae on the edges of the mapping; here the
grid was regular and characterized by N = 40. The results are very similar to those of the original map,
except for the box close to the frontier. Figs. 3a-c correspond to the same formulae, but with cells having
half the size of the previous ones close to the edges. Apparently, this does not improve drastically the
quality of the mapping in the frontier box. On the other hand, a definite improvement is obtained using
the gradient formulae (for more details about these formulae, see papers I and II).
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plane giving (as polar coordinates) eccentricity and mean longitude at conjunction with
the planet, for the Neptune-to-Sun mass ratio m/Mo = 5.178 10-_ and a Jacob° constant
of 3.0080694.
Figs. 5b-d: The same as Fig. 5a but for the synthetic maps T1, T3 and TJ, respectively.
204 Asteroids, Comets, Meteors 1991
i
Let us switch to the tests of the method on a special case of the restricted three-body problem, for
which Duncan et al. have developed a special mapping. Fig. 5a shows orbits of the Poincar_ map taking
as surface of section the plane defined by the eccentricity and the mean longitude as polar coordinates,
at the times when the particle is in conjunction with the planet (i.e., in the rotating frame, when y = 0
and _) > 0). Figs. 5b-d show plots of the corresponding orbits for the Taylor synthetic mappings of
order 1, 3 and 5, using a grid with N = 100. While the linear mapping T1 displays only poor qualitative
similarities with the Poincar_ map, the map T3 correctly reproduces the locations,shapes and sizes of the
zones containing regular orbits. Of course, the T5 map is even better. It should be noted that in order
to obtain the same accuracy, we had to use a smaller grid size (i.e., more points) than for the standard
map, since the functions which have to be interpolated are less regular. _:
Conclusions
Synthetic maps appear to be valuable tools for celestial mechanics. We have presented here only
some partial results. For instance another important development concerns problems wlth more than two
degrees of freedom, for Which the situation is less straightforward than described above. The number of
operations required for the Taylor approximation increases drastically with the dimensions of the surface
of section. Of course a lower-order map can be used by decreasing the grid size, but a further difficulty
lies in the task of storing and recalling the values of the computed imagesa t the Vertices. This is the
reason why we have used a hash function when dealing with problems with three degrees of freedom (see
paper Ii). : :
Aknowledgements
The authors wish to thank R. Grauer for stimulating discussions at the very beginning of this
research. We also wish to thank P. Farinella for fruitfull comments during this work.
References
Duncan, M., Quinn, T., Tremaine, S.: 1989, Icarus 82, 402
Froeschl_, C.: 1970, Astron. Astrophys. 9, 15
Froeschl_, C., Rickman, H.: 1988, Celestial Mech. 43,265
Froeschl_, C., Petit, J.M.: 1990, Astron. Astrophys. 238,413-423
H_non, M.: 1981, Cours des Houches XXXVI, North Holland, Amsterdam 57
Lichtenberg, A.J., Lieberman, M.A.: 1983, Regular and Stochastic Motion, Springer-Verlag.
Petit, J.M., Froeschl@, C.: i991, to be submitted to Astron. Astrophys.
Varosi, F., Grebogi, C., Yorke,:J.A.: 1987, Phys: Lett. A 124, 59
oF .:,c,c'RQuJ L TY


Polynomial approximation of Poincare maps for Hamiltonian system

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