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Proceedings of GDIS 2008, Belgrade
Spinning gas clouds: Liouville integrable cases
B. Gaffet CNRS and CEA DSM/DAPNIA Service d’Astrophysique, CEN Saclay, 91191 Gif-sur-Yvette Cedex, France
Аннотация:
We consider the class of ellipsoidal gas clouds expanding into a
vacuum
[b1,b2] which has been shown to be a Liouville integrable
Hamiltonian system
[b3]. This system presents several
interesting features, such as the Painlevé property
[b4,b5], the
existence of Bäcklund transformations and the separability of
variables, all shown to be present in at least several sub-cases.
A remarkable result that emerged from the study of the cases of rotation
around a fixed principal axis, was that the Liouville torus, which is the
locus of trajectories of the representative point of the cloud when all
the constants of motion are fixed, could be assimilated with a quartic
surface presenting 16 conic point singularities. The geometry of such
surfaces is entirely determined by the datum of a 6th degree polynomial in
one variable, and the consideration of the corresponding natural
coordinate system then led to the separation of variables for these
cases
[b6]. Further, the equation of the surface takes the form of
a
$4\times4$ determinant, which constitutes a generalization of
Stieltjes
$4\times4$ determinant formulation of the addition formula for
elliptic functions; and the corresponding matrix also defines the system
of the equations of motion; so that it can be said that the differential
system is completely determined by the surface’s geometry.
Forsaking now the assumption of a fixed rotation axis, in cases where the
energy constant takes its minimum value compatible with the other
constants of motion, we found that the Liouville torus was still reducible
to the form of a quartic surface, presenting 15 conic points only instead
of 16 (16 conic points were indeed present originally, but one of them had
to disappear in the process of reducing the surface to the 4th degree).
The geometry of these surfaces is entirely determined by the datum of a
plane unicursal quartic (which is the transformed version of the missing
conic point). The system can be reduced to the form of a differential
equation of second degree, the coefficients of which are polynomials of
degree 7, which are determined by the surface’s geometry, except for their
quadratic dependence on a single free parameter,
$z$. Defining
$u$ the
(time-like) independent variable, and
$\Phi$ the integration constant
(which are functions defined on the Liouville torus), it is found
that
$\Phi$ depends linearly on the parameter:
$\Phi=\Phi(z)$ and then
$u$
may be taken to coincide with
$\Phi(z')$, for any value of
$z'$ distinct
from
$z$. Solving the system for one particular value of
$z$ therefore
also solves it for all other values of the parameter. It appears that the
geometry alone does not specify in this case any particular value of
$z$,
but then any two values lead to differential systems which (although their
solutions differ) turn out to be equivalent. It may also be worth pointing
out that changing
$z$ may be viewed as exchanging the roles of
$u$
and
$\Phi$.
Finally, in degenerate cases the Liouville torus presents a double line of
self-intersection, and the separation of variables can be achieved.
Sections by planes through the double line are conic sections, which may
be labeled by a parameter
$w$, say. Denoting
$\alpha$ the eccentric
anomaly on the conic, the differential system in fact takes a remarkably
simple form:
$da/dw=f(w)$, and involves an elliptic integral.
Ключевые слова:
gas dynamics, complete integrability, Hamiltonian systems, exact solutions.
MSC: 37J35,
76U05,
37N10,
76N15 Поступила в редакцию: 30.10.2008
Принята в печать: 15.01.2009
Язык публикации: английский
DOI:
10.1134/S1560354709040078