Bounded analytic maps, Wall fractions and ABC flow

In this work we study the qualitative properties of real analytic bounded maps defined in the infinite complex strip. The main tool is approximation by continued g-fractions of Wall. As an application, the ABC flow system is considered which is essential to the origin of the solar magnetic field.Comment: 14 pages, submitted. arXiv admin note: text overlap with arXiv:1210.480

The meromorphic non-integrability of the three-body problem

We study the planar three-body problem and prove the absence of a complete set of complex meromorphic first integrals in a neighborhood of the Lagrangian solution. We use the Ziglin's method and study the monodromy group of the corresponding normal variational equations.Comment: 17 pages, submitted to Crelle's Journa

Continued g-fractions and geometry of bounded analytic maps

In this work we study qualitative properties of real analytic bounded maps. The main tool is approximation of real valued functions analytic in rectangular domains of the complex plane by continued g-fractions of Wall. As an application, the Sundman-Poincar\'e method in the Newtonian three-body problem is revisited and applications to collision detection problem are considered.Comment: 16 pages, 6 figures, submitte

On the convergence of continued fractions at Runckel's points and the Ramanujan conjecture

We consider the limit periodic continued fractions of Stieltjes $$\frac{1}{1-} \frac{g_1 z}{1-} \frac{g_2(1-g_1) z}{1-} \frac{g_3(1-g_2)z}{1-...,}, z\in \mathbb C, g_i\in(0,1), \lim\limits_{i\to \infty} g_i=1/2, \quad (1)$$ appearing as Shur--Wall $g$-fraction representations of certain analytic self maps of the unit disc $|w|< 1$, $w \in \mathbb C$. We precise the convergence behavior and prove the general convergence [2, p. 564 ] of (1) at the Runckel's points of the singular line $(1,+\infty)$ It is shown that in some cases the convergence holds in the classical sense. As a result a counterexample to the Ramanujan conjecture [1, p. 38-39] stating the divergence of a certain class of limit periodic continued fractions is constructed.Comment: 8 page

On the existence of polynomial first integrals of quadratic homogeneous systems of ordinary differential equations

We consider systems of ordinary differential equations with quadratic homogeneous right hand side. We give a new simple proof of a result already obtained in [8,10] which gives the necessary conditions for the existence of polynomial first integrals. The necessary conditions for the existence of a polynomial symmetry field are given. It is proved that an arbitrary homogeneous first integral of a given degree is a linear combination of a fixed set of polynomials.Comment: 9 pages. to appear in . Phys. A: Math. Gen. 33, 200

On some exceptional cases in the integrability of the three-body problem

We consider the Newtonian planar three--body problem with positive masses $m_1$, $m_2$, $m_3$. We prove that it does not have an additional first integral meromorphic in the complex neighborhood of the parabolic Lagrangian orbit besides three exceptional cases $\sum m_i m_j/(\sum m_k)^2= 1/3$, $2^3/3^3$, $2/3^2$ where the linearized equations are shown to be partially integrable. This result completes the non-integrability analysis of the three-body problem started in our previous papers and based of the Morales-Ramis-Ziglin approach.Comment: 7 page

The meromorphic non-integrability of the planar three-body problem

We study the planar three-body problem and prove the absence of a complete set of complex meromorphic first integrals in a neighborhood of the Lagrangian solution.Comment: 4 pages, Frenc

On some collinear configurations in the planar three-body problem

We study the planar Newtonian three-body problem and analyse the configurations in which the three bodies or their velocities are collinear. The existence of such configurations, also called generalised syzygies, was previously investigated by the author in [4] for bounded solutions. In this paper we generalise our result to the case of negative energy and provide a more simple proof. We also study periodic solutions admitting a particular geometric rigidity and show that they always suffer syzygies i.e. collinear in positions configurations.Comment: submitte