News Release

Saturn's rings in a supercomputer

Researchers from the Lomonosov Moscow State University as a part of international team of scientists explained the structure of Saturn's rings and modeled them using a supercomputer -- this result can be applied to a variety of systems

Peer-Reviewed Publication

Lomonosov Moscow State University

Voyager 2 False-Color Image of Saturn's Rings

image: This is a Voyager 2 false-color image of Saturn's rings. Subtle color variations due to differences in surface composition of the particles making up the rings are enhanced in this image produced by combining ultraviolet, clear, and orange frames. view more 

Credit: NASA

Why some planets, like Saturn or Jupiter, have their rings, while others like, the Earth or Mars do not? It turned out that "the size does not matter" -- not only giants as Saturn possess the rings, but even tiny asteroids do: According to the recent discovery of the Spitzer Space Telescope, the remote asteroid Chariklo, which is only 260 km in diameter, also has rings.

A natural answer may be the following: Occasionally, in a far past, some planets had much more material in their vicinity then the other ones. The material was in a form of dust. Dust particles merged together, due to gravitational or adhesive forces, and larger and larger aggregates appeared in a system. This seems to be clear, but what had happened to the particles, when they ceased to grow, reaching a size of a house? What was a mechanism that hindered their further growth? It remained enigmatic. Moreover, the particle size distribution followed, with a high accuracy, a beautiful mathematical law of "inverse cubes". This law, for instance, implies, that the abundance of particles of size 2 meters is 8 time less than that of particles of size 1 meter; the abundance of particles of size 3 meter is respectively 27 times less, and so on. The nature of this law was also a riddle.

An international team of scientists managed to resolve the above riddles of the particle size distribution in Saturn's rings. The team had four Russians on board: a graduate of the M.V. Lomonosov Moscow State University Nikolai Brilliantov - presently professor at the University of Leicester in the UK, Pavel Krapivsky - presently professor at the Boston University in the USA, Anna Bodrova from the Chair of Polymer and Crystal Physics of the Faculty of Physics of the M.V. Lomonosov Moscow State Unversity and Vladimir Stadnichuk, from the same Chair of Polymer and Crystal Physics. The researches have shown that the observed size distribution is universal and expected to be the same for all planetary rings, provided the rings' particles have a similar nature. Furthermore, the scientists managed to unravel the mystery of the "inverse cubes" law. The according article co-authored by professors Frank Spahn from the University of Potsdam, Germany, Jürgen Schmidt from the University of Oulu, Finland and Hisao Hayakawa from the Kyoto University, Japan, has been published in the journal Proceedings of the National Academy of Sciences.

The magnificent Saturn Rings stretch by hundred of thousand kilometers outward from Saturn. In the other, perpendicular direction they are incredibly thin -- only a few tens of meters, which makes the Saturn rings the most sharp object in nature, million times "sharper" than the sharpest razor. The rings consist of ice particle with a tiny addition of rocky material and orbit the planet with an enormous speed of 72,000 kilometers per hour. But this is an average or orbital speed, while the individual velocities have slightly different values. Commonly deviations from the orbital speed are extremely small, only a few meters per hour! When rings' particles collide with such low velocities, they merge, since the attractive surface forces keep them together. As a result a joint aggregate is formed, similar to what happens if two snowballs are squeezed together. In this way the rings' particles permanently merge. There exist, however, an opposite process: A very small fraction of particles has a significant deviation of their velocity from the average one. When such "fast" particles collide with the neighbors, both particles crumble into small pieces. This occurs very seldom but nevertheless leads to a steady balance between aggregation and fragmentation.

Scientists have constructed a mathematical model of the above processes in rings and studied this model by various methods. In particular, they solved numerically a vast system of differential equations. This could be efficiently done only with a use of a powerful supercomputer. This part of the work has been carried out by the Moscow part of the team, who exploited "Chebyshev" -- the supercomputer of the M.V. Lomonosov Moscow State University. "Chebyshev", named in honor of a famous Russian mathematician, is one of the most powerful computers in Europe.

The researchers have solved the riddle of the "inverse cubes" law; they also explained why the abundance of particles, larger than certain size, dramatically drops down. Moreover, an important conclusion followed from their model: The particles' size distribution in planetary rings is universal. That is, it would follow the same laws provided the nature of the rings' particles is the same as that of the Saturn rings. According to the researchers, in particular, as Anna Bodrova from the Moscow State University explained, this universality is yet a well-grounded hypothesis. In order to confirm or to refute it, a thorough investigation of other rings is needed.

The results of the study entail a number of other scientific conclusions, for example, concerning the mechanism of rings formation and evolution. The results show that the rings of Saturn are in a steady-state. Furthermore, since the characteristic time of the rings' respond to any external perturbation does not exceed 10 000 years, nothing catastrophic has happened to the rings since the Bronze Age.

According to the Nobel Prize winner in Physics and Fellows of the Royal Society, Pyotr Kapitsa:

"There's nothing more practical than a good theory". This statement, also attributed to a German-American psychologist Kurt Lewin, is totally relevant for the above research: The scientists have developed a rather universal mathematical tool, which could be straightforwardly applied to a variety of systems in nature and industry. Whenever a system is comprised of particles that can merge colliding at low velocities and break into small pieces colliding at large velocities, the size distribution of particles will demonstrate the amazing "inverse cubes" law.


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