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The Sitnikov Problem is a ....

Configuration[Bearbeiten | Quelltext bearbeiten]

The Sitnikov Problem has a name of the russian mathematician Kirill Aleksandrovich Sitnikov (* 1926). This is an form of three-body problem. It describs the moution of three primaries resulting from gravitational interaction.

The System consist of 2 primaries (for example stars) with the equal masses (${\displaystyle m_{1}=m_{2}=m_{pr}}$). The third body have a mass (${\displaystyle m_{3}}$), ${\displaystyle m_{3}}$ is much less, then the mass of primaries. This body is confined to a motion perpendicular to the instantaneous plane of motion of the two primaries, which are always equally far away from the barycenter of the system (see Fig.1). The point of origin is in centre of mass of primaries. In such system the motion of third body is one-dimensional - it moves just along ${\displaystyle z}$-Axis.

• General equation of motion

First of all it is necessary to define the energy of the system ${\displaystyle E}$:

${\displaystyle E={\frac {m_{3}}{2}}\left({\frac {dz}{dt}}\right)^{2}-{\frac {2Gm_{3}m_{pr}}{r}},}$

Lets write the second Newton's law:

${\displaystyle \left({\frac {d^{2}z}{dt^{2}}}\right)=-{\frac {2Gm_{pr}z}{r^{3}}},}$

From Fig 1. follows:

${\displaystyle r^{2}=a^{2}+z^{2}\,}$

Now equation of motion is

${\displaystyle \left({\frac {d^{2}z}{dt^{2}}}\right)+{\frac {2Gm_{pr}z}{(z^{2}+a^{2})^{3/2}}}=0,}$

or

${\displaystyle \left({\frac {d^{2}z}{dt^{2}}}\right)+{\frac {z}{(z^{2}+a^{2})^{3/2}}}=0,}$

here ${\displaystyle 2Gm_{pr}=1}$.

Historical Review[Bearbeiten | Quelltext bearbeiten]

The solution of this equation found MacMllan in year 1910. He used theory of series , properties of elliptical integrals and derived the formula for z(t) (see ref.2 in the section Literature):

${\displaystyle z={sin\tau +{\frac {3}{64}}[cos3\tau +cos\tau ]+{\frac {1}{4096}}[79cos\tau +108cos3\tau +29cos5\tau ]\mu ^{2}+...}}$

with ${\displaystyle \mu ={\frac {a^{2}}{1+a^{2}}}}$ and a is a maximum value of ${\displaystyle z}$.

In year 1960 evolved Sitnikov further theory. He studied the chaotic systems as applied to three-body problem. He derived mathematical theorem about chaotic motion of third body (for details see ref.3 in the section Literature).

Circular Case[Bearbeiten | Quelltext bearbeiten]

• )Equations of motion

In the case, when the primaries move on circular orbits, consider that ${\displaystyle a=1/2}$(distance unit is a diameter of the orbit). Final equation of motion with boundary condition in this case

${\displaystyle \left\{{\begin{array}{lll}\left({\frac {d^{2}z}{dt^{2}}}\right)+{\frac {z}{(z^{2}+1/4)^{3/2}}}=0\\{\frac {dz}{dt}}|_{t=0}=0\\z|_{t=0}=z_{ini}.\\\end{array}}\right.}$

The last two equations are boundary condition. They signify, that in start time the velocity of body was zero, and z-coordinate was ${\displaystyle z_{initial}}$. It is possible to use the numerical methods for calculating ${\displaystyle z}$, for example standard Runge - Kutta method 4th order. The results are plotted in the Fig. 2.

It is possible to calculate the period of motion started from principles of theoretical mechanics (see for example ref.1 in the section Literature):

${\displaystyle {\frac {p}{4}}={\frac {1}{\sqrt {2}}}\int _{z_{ini}}^{0}{\frac {dz}{\sqrt {-{\frac {1}{\sqrt {1/4+z_{ini}^{2}}}}+{\frac {1}{\sqrt {1/4+z^{2}}}}}}}}$

The numerical calculating of this solution give the next periods of the oscillations:

if ${\displaystyle z_{initial}=0.2}$ then period ${\displaystyle p=2.42}$

if ${\displaystyle z_{initial}=0.7}$ then period ${\displaystyle p=4.27}$

if ${\displaystyle z_{initial}=1.3}$ then period ${\displaystyle p=8.07}$

This Results confirm the accuracy of Figure 2.

Elliptic Case[Bearbeiten | Quelltext bearbeiten]

• )Trajectory

The differential equation of Sitnikov-Problem in elliptic case another. Now it is necessary to take into consideration the dependence of ${\displaystyle a(t)}$.

${\displaystyle \left({\frac {d^{2}z}{dt^{2}}}\right)+{\frac {z}{(z^{2}+a^{2}(t))^{3/2}}}=0,}$

Note that, from well known results in the two-body problem (see ref.1 in the section Literature):

${\displaystyle a(t)={\frac {1}{2}}(1-e\cdot \cos(t))+O(e^{2})}$

Here ${\displaystyle O(e^{2})}$ is all parts of ${\displaystyle a(t)}$, that have order of value ${\displaystyle e^{2}}$. It means that for example if eccentricity e=0.1, then part ${\displaystyle O(e^{2})}$ have order 0.01. In first approximation it is possible to neglect this part. The results of numerical calculating are plotted in Fig.3-4.

• )The surfaces of section

Now, when trajectories were calculated in elliptic case, it is possible to plot the surfaces of section (SOS). The phase space have in our case three dimensions: time, velocity and distance from center mass. When one of this dimensions is ${\displaystyle const}$,then we have just two dimensions and get SOS. SOS is just one of vivid ways to represent numerical results. For example here SOS are in coordinates ${\displaystyle (z,z_{dot})}$.

In the Fig.5 are some examples of SOS of motion. The area ${\displaystyle (z\in (2-,2),z_{dot}\in (-2,2))}$ was divided into ${\displaystyle 21\times 21}$ points. At every point was the trajectory calculated (values of ${\displaystyle z}$ and ${\displaystyle z_{dot}}$ for each time point). Then were kipped from this trajectory just points, when the primaries are in perihelion. To the finite arrays, that plotted here, were added just finite trajectories (i.e. ${\displaystyle z_{max}<10}$ is serve as a criterion for finite trajectory).

• ) Finite motion as a whole

Here area ${\displaystyle (z\in (2-,2),z_{dot}\in (-2,2))}$ was divided into ${\displaystyle 50\times 50}$ points. For every point was calculated trajectory. Next must be checked the max value of ${\displaystyle z}$. When like previous ${\displaystyle z_{max}<10}$, it is possible to assume, that the motion is bounded and add at the plot the black point in this place. Fig.6 represents some results.

For getting of eccentricity dependence of area of finite motion, it is necessary to count the black points and disjoint at ${\displaystyle 50\times 50}$(total number of points) for different eccentricities. It is plotted in the Fig.7.

Applications[Bearbeiten | Quelltext bearbeiten]

Although it is almost impossible, that three celestial bodies can make Sitnikov-Configuration, the Sitnikov-Problem was studied already relative long time, because it is possible to discover in this fairly simple System all properties of a chaotic system. Such system is excellent serve for generalized research of chaotic effects in dynamical systems.

Literarure[Bearbeiten | Quelltext bearbeiten]

1. Landau, Livshitc: Theoretical Meachanics, Moskwa, "Nauka", 1988.

2. MacMillan: An Integrable Case In The Restricted Problem Of Three Bodies . In:The Astronomical Journal, №625-626, pp. 11-13.

3. K. A. Sitnikov: The existence of oscillatory motions in the three-body problems. In: Doklady Akademii Nauk SSSR, 133/1960, S. 303–306, ISSN 0002-3264 (englische Übersetzung in Soviet Physics. Doklady., 5/1960, S. 647–650)