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=Binary Mass-Transfer=
=Binary Mass-Transfer=
In connection with our own efforts to realistically model dynamical, mass-transfer events in close binary systems, we have noticed the spontaneous development of standing waves in the equatorial regions of the accreting star.  As is illustrated in Figure 3, below, during each of the three cited model evolutions (A, B, and C) we have identified standing waves that are very clearly 3-sided (triangular; bottom row of Figure 3), 4-sided (box-shaped; middle row of Figure 3), or 5-sided (pentagonal; top row of Figure 3).  In association with our published discussion of each of these three evolutions &#8212; relevant links are provided at the top of each Figure column &#8212; an animation sequence has been provided that shows the model's time-evolutionary behavior.  (Evolution A has been followed through 15.3 P<sub>0</sub>; evolution B has been followed through 18.3 P<sub>0</sub>; and evolution C has been followed through 34.0 P<sub>0</sub>, where P<sub>0</sub> is the associated model's initial binary orbital period.) If you watch any one of these evolutions, you will see the smooth development of these nonlinear-amplitude, standing-wave structures in sequence.  Looking closely, at an appropriate time in each evolution, you should also be able to identify the development of a (low-amplitude) standing wave structure that has 6 sides; that is, a hexagonal standing wave.  We wonder whether the physical processes that conspire to excite a hexagonal-shaped standing wave in our binary mass-transfer simulations is at all related to the physical processes that are responsible for creating and ''sustaining'' the hexagonal-shaped storm in Saturn's northern hemisphere.
In connection with our own efforts to realistically model dynamical, mass-transfer events in close binary systems, we have noticed the spontaneous development of standing waves in the equatorial regions of the accreting star.  As is illustrated in Figure 3, below, during each of the three cited model evolutions (A, B, and C) we have identified standing waves that are very clearly 3-sided (triangular; bottom row of Figure 3), 4-sided (box-shaped; middle row of Figure 3), or 5-sided (pentagonal; top row of Figure 3).  In association with our published discussion of each of these three evolutions &#8212; relevant links are provided at the top of each Figure column &#8212; an animation sequence has been provided that shows the model's time-evolutionary behavior.  (Evolution A has been followed through 15.3 P<sub>0</sub>; evolution B has been followed through 18.3 P<sub>0</sub>; and evolution C has been followed through 34.0 P<sub>0</sub>, where P<sub>0</sub> is the associated model's initial binary orbital period.) If you watch any one of these evolutions, you will see the smooth development of these nonlinear-amplitude, standing-wave structures in sequence.  Looking closely, at an appropriate time in each evolution, you should also be able to identify the development of a (low-amplitude) standing wave structure that has 6 sides; that is, a hexagonal standing wave.  We have wondered whether the physical processes that conspire to resonately excite a hexagonal-shaped standing wave in our binary mass-transfer simulations is related to the physical processes that are responsible for creating and ''sustaining'' the hexagonal-shaped storm in Saturn's northern hemisphere.


Several key references:
Several key references:

Revision as of 22:09, 13 July 2019


Saturn

Here we draw heavily from the review by L. Spilker (14 June 2019) titled, Cassini-Huygens' exploration of the Saturn system: 13 years of discovery that has appeared in Science, Vol. 364, Issue 6445, pp. 1046 - 1051. This review reminds us to emphasize that, although virtually all of the chapters of our H_Book have been written from the standpoint of analyzing the structure, stability, and dynamics of stars, much of our discussion is applicable in a fairly straightforward manner to studies of planets — especially the gas giants — because they are also self-gravitating fluids.

Whitworth's (1981) Isothermal Free-Energy Surface
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Structure and Stability

Excerpt from the first paragraph on p. 1050 of L. Spilker (2019):

Saturn's ring system acts like a seismograph, providing a measure of Saturn's internal oscillations (or normal modes) that directly probe the interior of the planet … and provide a means for measuring its deep rotation rate. These vibrations, determined by Saturn's nonuniform internal structure, are probably driven by convection inside the planet, which cause oscillations in Saturn's gravity field … Preliminary modeling of the propagation behavior of this collection of waves provides an interior rotation rate for Saturn of ∼ 10.6 hours …

See also:


Excerpts from the article by L. Iess et al. (2019), Science, Vol. 364, Issue 6445, p. 1052 titled, Measurement and implications of Saturn's gravity field and ring mass:

… the mass distribution inside a fluid and rapidly rotating planet like Saturn is largely driven by the ratio between centrifugal and gravitational forces. In static conditions, the planet should rotate uniformly and its gravity field should be axially and hemispherically symmetric and thus described by zonal harmonics.


In its final 22 orbits, the Cassini spacecraft passed between the rings and the atmosphere of Saturn. In six of these orbits, while the spacecraft was in free fall under the combined attraction of Saturn and its rings, radio tracking from an antenna on Earth was established to measure the radial velocity of the spacecraft with
[high accuracy, which] … allowed us to determine the separate signatures from each zonal harmonic and the ring mass … We found that the measured values of <math>~J_6, J_8</math> and <math>~J_{10}</math> are so large that they cannot be matched with interior models relying on uniform rotation and plausible compositions, but they are in agreement with interior models that assume deep differential rotations extending from the equator into the interior up to distances of 0.7 to 0.8 Saturn radii from the spin axis.


The gravity measurements are consistent with a mass of Saturn's core of 15 to 18 Earth masses.

Hexagon Storm

Excerpt from the the subsection titled "Saturn" on p. 1049 of L. Spilker (2019):

Saturn's alternating eastward and westward jet streams define the bands of cloud that circle the planet … One of the jet streams near 75° north latitude, forms a hexagonal pattern that is two Earth diameters across … Voyager first discovered the hexagon, and it is still there after 35 years … this hexagonal-shaped jet stream … is remarkable for its stability and longevity; its source remains a mystery.

See also:

  • K. H. Baines et al. (2009), Planetary and Space Science, Vol. 57, Issue 14-15, p. 1671: Saturn's north polar cyclone and hexagon at depth revealed by Cassini/VIMS
FIGURE 1 FIGURE 2

Casini image

Image of Saturn's Hexagon Storm

FIGURE 1: obtained from this NASA Newsletter; FIGURE 2: obtained from this NASA/JPL site.
See also the wikipedia page titled, Saturn's hexagon.


Binary Mass-Transfer

In connection with our own efforts to realistically model dynamical, mass-transfer events in close binary systems, we have noticed the spontaneous development of standing waves in the equatorial regions of the accreting star. As is illustrated in Figure 3, below, during each of the three cited model evolutions (A, B, and C) we have identified standing waves that are very clearly 3-sided (triangular; bottom row of Figure 3), 4-sided (box-shaped; middle row of Figure 3), or 5-sided (pentagonal; top row of Figure 3). In association with our published discussion of each of these three evolutions — relevant links are provided at the top of each Figure column — an animation sequence has been provided that shows the model's time-evolutionary behavior. (Evolution A has been followed through 15.3 P0; evolution B has been followed through 18.3 P0; and evolution C has been followed through 34.0 P0, where P0 is the associated model's initial binary orbital period.) If you watch any one of these evolutions, you will see the smooth development of these nonlinear-amplitude, standing-wave structures in sequence. Looking closely, at an appropriate time in each evolution, you should also be able to identify the development of a (low-amplitude) standing wave structure that has 6 sides; that is, a hexagonal standing wave. We have wondered whether the physical processes that conspire to resonately excite a hexagonal-shaped standing wave in our binary mass-transfer simulations is related to the physical processes that are responsible for creating and sustaining the hexagonal-shaped storm in Saturn's northern hemisphere.

Several key references:


FIGURE 3:   Nonlinear-Amplitude Distortions that Develop in Three Separate Model Evolutions
Evolution A Evolution B Evolution C

MFTD (2007)
Model Q0.4D
Animation: video4.mpg
(link is in caption of their Figure 3)

MFSCFEDT (2017)
Model Q0.4P_S1
Animation: apjsaa5bdef26_video.mpg
(link is in caption of their Figure 26)

MFSCFEDT (2017)
Model Q0.5P_G1
Animation: apjsaa5bdef21_video.mpg
(link is in caption of their Figure 21)

Q04DcroppedD.png Q0.4P S1croppedD.png Q0.5P G1croppedD.png
Q04D squareD.png Q0.4P S1 squareD.png Q0.5P G1 squareD.png
Q04D triangleD.png Q0.4P S1 triangleD.png Q0.5P G1 triangleD.png
The evolution identified here as Model Q0.5P_G1 was first discussed in §5.2 of DMTF (2006), wherein it was identified as Model Q0.5-Da; the caption to Figure 7 of that paper contains a link to an (mpeg_file = video3-2.mpg) animation that presents a 3D rendering of this model's evolution.


The following discussion has largely been extracted from §3.1.4 of MFSCFEDT (2017):

In §4 of their paper, MFTD (2007) point out that in the vicinity of the accretor some of the models developed nonlinear-amplitude "equatorial distortions with [azimuthal mode numbers] <math>~6 \ge m \ge 3</math>." As is illustrated by the trio of images displayed in the bottom row of Figure 3, above, at a certain point (or points) in each of these binary mass-transfer evolutions … the disk surrounding the accretor has a triangular shape … This trio of triangular shaped images come from, respectively, evolutionary times: (A, B, C) = (15.3, 17.50, 24.33), as measured in terms of initial orbital periods.

Related Discussions

Whitworth's (1981) Isothermal Free-Energy Surface

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