
- EDITOR-IN-CHIEF
- DEPUTY EDITOR-IN-CHIEF
- Editorial board
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- Passed Away
Volume 30, Number 4
Special Issue: Celebrating the 75th Birthday of V.V. Kozlov (Issue Editors: Sergey Bolotin, Vladimir Dragović, and Dmitry Treschev)
Adler V. E., Veselov A. P.
Abstract
We show that the equations of motion of a rigid body about a fixed point in
the Newtonian field with a quadratic potential are special reduction of period-one closure of
the Darboux dressing chain for the Schrödinger operators with matrix potentials. Some new
explicit solutions of the corresponding matrix system and the spectral properties of the related
Schr¨odinger operators are discussed.
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Agrachev A., Motta M.
Abstract
We explicitly compute the maximal Lyapunov exponent for a switched system on
$\mathrm{SL}_2(\mathbb R)$ and the corresponding switching function which realizes the maximal exponent. This
computation is reduced to the characterization of optimal trajectories for an optimal control
problem on the Lie group.
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Ali A. Z., Sachkov Y. L.
Abstract
In this paper the two-dimensional Lorentzian problem on the anti-de Sitter plane
is studied. Using methods of geometric control theory and differential geometry, we describe
the reachable set, investigate the existence of Lorentzian length maximizers, compute extremal
trajectories, construct an optimal synthesis, characterize Lorentzian distance and spheres, and
describe the Lie algebra of Killing vector fields.
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Barbieri S., Biasco L., Chierchia L., Zaccaria D.
Abstract
In this note, we briefly discuss how the singular KAM theory of [7] — which was worked out for the mechanical case $\frac12 |y|^2+\varepsilon f(x)$ — can be extended to convex real-analytic
nearly integrable Hamiltonian systems
with Hamiltonian in action-angle variables given by $h(y)+\varepsilon f(x)$ with $h$ convex and
$f$ generic.
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Bloch A. M., Zenkov D. V.
Abstract
Nonholonomic systems are mechanical systems with ideal velocity constraints that
are not derivable from position constraints and with dynamics identified by the Lagrange –
d’Alembert principle. This paper reviews infinite-dimensional and field-theoretic nonholonomic
systems as well as Hamel’s formalism for these settings.
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Bufetov A. I., Zavolokin I. I.
Abstract
The aim of this note is to present a simple observation that a slight refinement
of the contraction mapping principle allows one to recover the precise convergence rate in the
Picard – Lindelöf theorem.
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Dragović V., Gajić B., Jovanović B.
Abstract
We consider motion of a material point placed in a constant homogeneous magnetic field in $\mathbb{R}^n$ and also motion restricted to the sphere $S^{n-1}$.
While there is an obvious integrability of the magnetic system in $\mathbb{R}^n$, the integrability of the system restricted to the sphere $S^{n-1}$ is highly nontrivial. We prove
complete integrability of the obtained restricted magnetic systems for $n\leqslant 6$. The first integrals of motion of the magnetic flows on the spheres $S^{n-1}$, for $n=5$ and $n=6$, are polynomials of degree
$1$, $2$, and $3$ in momenta.
We prove noncommutative integrability of the obtained magnetic flows for any $n\geqslant 7$ when the systems allow a reduction to the cases with $n\leqslant 6$. We conjecture that the restricted magnetic systems on $S^{n-1}$ are integrable for all $n$.
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Dragović V., Radnović M.
Abstract
The celebrated Poncelet porism is usually studied for a pair of smooth conics that
are in a general position. Here we discuss Poncelet porism in the real plane — affine or projective,
when that is not the case, i. e., the conics have at least one point of tangency or at least one of
the conics is not smooth. In all such cases, we find necessary and sufficient conditions for the
existence of an $n$-gon inscribed in one of the conics and circumscribed about the other.
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Huang Y. C., Taimanov I. A.
Abstract
We describe the Ozawa solution to the Davey – Stewartson II equation from the
point of view of surface theory by presenting a soliton deformation of surfaces which is ruled
by the Ozawa solution. The Ozawa solution blows up at a certain moment and we describe
explicitly the corresponding singularity of the deformed surface.
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Ilyashenko Y. S.
Abstract
In [7] an open set of structurally unstable families of vector fields on a sphere was
constructed. More precisely, a vector field with a degeneracy of codimension three was discovered
whose bifurcation in a generic three-parameter family has a numeric invariant. This vector field
has a polycycle and two saddles, one inside and one outside this polycycle; one separatrix of
the outside saddle winds towards the polycycle and one separatrix of the inside saddle winds
from it. Families with functional invariants were constructed also. In [2] a hyperbolic polycycle
with five vertices and no saddles outside it was constructed whose bifurcations in its arbitrary
narrow neighborhood (semilocal bifurcations in other words) have a numeric invariant and thus
are structurally unstable. This paper deals with semilocal bifurcations. A hyperbolic polycycle
with nine edges is constructed whose semilocal bifurcation in an open set of nine-parameter
families has a functional invariant.
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Kilin A. A., Pivovarova E. N., Ivanova T. B.
Abstract
This paper addresses the problem of a homogeneous ball rolling on the inner surface
of a circular cylinder in a field of gravity parallel to its axis. It is assumed that the ball rolls
without slipping on the surface of the cylinder, and that the cylinder executes plane-parallel
motions in a circle perpendicular to its symmetry axis. The integrability of the problem by
quadratures is proved. It is shown that in this problem the trajectories of the ball are quasiperiodic
in the general case, and that an unbounded elevation of the ball is impossible. However,
in contrast to a fixed (or rotating) cylinder, there exist resonances at which the ball moves on
average downward with constant acceleration.
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Kudryavtseva E. A.
Abstract
In the present paper, we obtain real-analytic symplectic normal forms for integrable Hamiltonian
systems with $n$ degrees of freedom in small neighborhoods of singular points having the type ``universal unfolding of $A_n$ singularity'', $n\geqslant 1$ (local singularities), as well as in small neighborhoods of compact orbits containing such singular points (semilocal singularities).
We also obtain a classification, up to real-analytic symplectic equivalence, of real-analytic Lagrangian foliations in saturated neighborhoods of such singular orbits (semiglobal classification).
These corank-one singularities (local, semilocal and semiglobal ones) are structurally stable.
It turns out that all integrable systems are symplectically equivalent near their singular points of this type, thus there are no local symplectic invariants.
A complete semilocal (respectively, semiglobal) symplectic invariant of the singularity
is given by a tuple of $n-1$ (respectively $n-1+\ell$) real-analytic function germs in $n$ variables, where $\ell$ is the number of connected components of the complement of the singular orbit in the fiber.
The case $n=1$ corresponds to nondegenerate singularities (of elliptic and hyperbolic types)
of one-degree-of-freedom Hamiltonians; their symplectic classifications were known.
The case $n=2$ corresponds to parabolic points, parabolic orbits and cuspidal tori.
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Markeev A. P.
Abstract
This paper addresses the spatial restricted elliptic problem of three bodies (material
points) gravitating toward each other under Newton’s law of gravitation. The eccentricity of
the orbit of the main attracting bodies is assumed to be small, and nonlinear oscillations of
a passively gravitating body near a Lagrangian triangular libration point are studied. It is
assumed that in the limiting case of the circular problem the ratio of the frequency of rotation
of the main bodies about their common center of mass to the value of one of the frequencies
of small linear oscillations of the passive body is exactly equal to three. A detailed analysis is
made of two different particular cases of influence of the three-dimensionality of the problem
on the characteristics of nonlinear oscillations of the passive body.
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Matveev V. S.
Abstract
We study two-dimensional Riemannian metrics which are superintegrable in the
class of integrals polynomial in momenta. The study is based on our main technical result,
Theorem 2, which states that the Poisson bracket of two integrals polynomial in momenta
is an algebraic function of the integrals and of the Hamiltonian. We conjecture that twodimensional
superintegrable Riemannian metrics are necessarily real-analytic in isothermal
coordinate systems, and give arguments supporting this conjecture. A small modification of the
arguments, discussed in the paper, provides a method to construct new superintegrable systems.
We prove a special case of the above conjecture which is sufficient to show that the metrics
constructed by K. Kiyohara [9], which admit irreducible integrals polynomial in momenta,
of arbitrary high degree $k$, are not superintegrable and in particular do not admit nontrivial
integrals polynomial in momenta, of degree less than $k$. This result solves Conjectures (b)
and (c) explicitly formulated in [4].
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Mironov A. E., Yin S.
Abstract
Recently it was proved that every billiard trajectory inside a $C^3$ convex cone has a finite number of reflections. Here, by a $C^3$ convex cone, we mean a cone whose section with some hyperplane is a strictly convex, closed $C^3$ hypersurface of that hyperplane, with an everywhere nondegenerate second fundamental form. In this paper, we prove that there exist $C^2$ convex cones with billiard trajectories that undergo infinitely many reflections in finite time. We also provide an estimation of the number of reflections for billiard trajectories inside elliptic cones in $\mathbb{R}^3$ using two first integrals.
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Pochinka O. V., Shubin D. D.
Abstract
In this paper we consider nonsingular Morse – Smale flows on closed orientable 3-manifolds, under the assumption that among the periodic orbits of the flow there is only one
saddle orbit and it is twisted. It is found that any manifold admitting such flows is either a lens
space, or a connected sum of a lens space with a projective space, or Seifert manifolds with base
sphere and three special layers. A complete topological classification of the described flows is
obtained and the number of their equivalence classes on each admissible manifold is calculated.
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Polekhin I. Y.
Abstract
We consider the problem of existence of forced oscillations on a Riemannian
manifold, the metric on which is defined by the kinetic energy of a mechanical system. Under the
assumption that the generalized forces are periodic functions of time, we find periodic solutions
of the same period. We present sufficient conditions for the existence of such solutions, which
essentially depend on the behavior of geodesics on the corresponding Riemannian manifold.
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Tsiganov A. V.
Abstract
We present some new Poisson bivectors that are invariants by the Clebsch system
flow. Symplectic integrators on their symplectic leaves exactly preserve the corresponding
Casimir functions, which have different physical meanings. The Kahan discretization of the
Clebsch system is discussed briefly.
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