Add to ORKGThe use of the neighborhood of collinear libration point (L1 or L2) of the Sun-Earth system has long been of practical importance in connection with projects implemented by NASA and ESA. A celestial body motion is considered in a rotating frame within the Hill's problem of the circular restricted three-body problem. It is known that collinear libration points are unstable but its instability can be used as a positive factor for maneuvering a celestial body in the near-Earth space. For example, it may be used to solve the problem of comet and asteroid hazard to monitor space objects posing threat to the Earth. We offer a methodology for constructing control algorithms for the orbital motion of a celestial body. This methodology is based on t...
Movements of the celestial bodies in our solar system inspired Isaac Newton to work out his profound...
[eng] This work aims the study of the Rapid Transition Mechanism that explains some properties of or...
Published version of an article in the journal: Mathematical Problems in Engineering. Also available...
The two-bodies problem can be fully solved, and was solved by Kepler (1609) and Newton (1687). The g...
[eng] In this dissertation, we show the effectiveness of the exploitation of the Circular Restricted...
The fascinating idea of shepherding asteroids for science and resource utilisation is being consider...
In this study, the feasibility of using libration point orbits to explore small solar system bodies,...
In the circular restricted three-body problem, three-dimensional bounded motion associated with the ...
The fascinating idea of shepherding asteroids for science and resource utilization is being consider...
In the circular restricted three-body problem, three-dimensional bounded motion associated with the ...
Spacecraft formations possess many applications in the future of space exploration. During the last ...
AbstractSpacecrafts in periodic or quasi-periodic orbits near the collinear libration points are pro...
One of the most important aspects when dealing with a Potentially Hazardous Object (PHO) is the accu...
A new method for L2 libration-point orbit stationkeeping is proposed in this paper using continuous ...
One of the most important aspects when dealing with a Potentially Hazardous Object (PHO) is the accu...
Movements of the celestial bodies in our solar system inspired Isaac Newton to work out his profound...
[eng] This work aims the study of the Rapid Transition Mechanism that explains some properties of or...
Published version of an article in the journal: Mathematical Problems in Engineering. Also available...
The two-bodies problem can be fully solved, and was solved by Kepler (1609) and Newton (1687). The g...
[eng] In this dissertation, we show the effectiveness of the exploitation of the Circular Restricted...
The fascinating idea of shepherding asteroids for science and resource utilisation is being consider...
In this study, the feasibility of using libration point orbits to explore small solar system bodies,...
In the circular restricted three-body problem, three-dimensional bounded motion associated with the ...
The fascinating idea of shepherding asteroids for science and resource utilization is being consider...
In the circular restricted three-body problem, three-dimensional bounded motion associated with the ...
Spacecraft formations possess many applications in the future of space exploration. During the last ...
AbstractSpacecrafts in periodic or quasi-periodic orbits near the collinear libration points are pro...
One of the most important aspects when dealing with a Potentially Hazardous Object (PHO) is the accu...
A new method for L2 libration-point orbit stationkeeping is proposed in this paper using continuous ...
One of the most important aspects when dealing with a Potentially Hazardous Object (PHO) is the accu...
Movements of the celestial bodies in our solar system inspired Isaac Newton to work out his profound...
[eng] This work aims the study of the Rapid Transition Mechanism that explains some properties of or...
Published version of an article in the journal: Mathematical Problems in Engineering. Also available...