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- Title
Semi-Analytical Approach in BiER4BP for Exploring the Stable Positioning of the Elements of a Dyson Sphere.
- Authors
Ershkov, Sergey; Leshchenko, Dmytro; Prosviryakov, Evgeniy Yu.
- Abstract
In this study, we present a new approach with semi-analytical and numerical findings for solving equations of motion of small orbiter m, which is moving under the combined gravitational attraction of three primaries, M 1 , M 2 , and M 3 , in case of the bi-elliptic restricted problem of four bodies (BiER4BP), where three such primaries, M 1 , M 2 , and M 3 , are moving on elliptic orbits with hierarchical configuration M 3 << M 2 << M 1 within one plane as follows: third primary body M 3 is moving on elliptical orbit around second M 2 , and second primary M 2 is moving on elliptical orbit around first M 1 . Our aim for constructing the aforementioned quasi-planar motion of planetoid m is obtaining its coordinates supporting its orbit in a regime of close motion to the plane of orbiting the main bodies M 1 , M 2 , and M 3 . Meanwhile, the system of equations of motion was successfully numerically explored with respect to the existence and stable positioning of approximate solution for a Dyson sphere. As a result, the concept of the Dyson sphere for possible orbiting variety of solar energy absorbers was transformed to the elongated Dyson space net with respect to their trajectories for the successful process of absorbing the energy from the Sun; this can be recognized as symmetry reduction. We obtain the following: (1) the solution for coordinates {x, y} is described by the simplified system of two nonlinear ordinary differential equations of second order, depending on true anomaly f; (2) the expression for coordinate z is given by an equation of Riccati-type where small orbiter that quasi-oscillates close to the fixed plane { x , y , 0 } .
- Subjects
EQUATIONS of motion; QUASILINEARIZATION; ELLIPTICAL orbits; NONLINEAR differential equations; PETRI nets; ORBITS (Astronomy); SPHERES; ORDINARY differential equations; SOLAR energy
- Publication
Symmetry (20738994), 2023, Vol 15, Issue 2, p326
- ISSN
2073-8994
- Publication type
Article
- DOI
10.3390/sym15020326