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What effects does the motion of the Sun have on the perihelion precession of Mercury?

Astronomy Asked on December 21, 2021

According to the wikipedia page, there are multiple effects contributing to the perihelion precession of Mercury.

Of course, according to this link and this link we know that the Sun is itself orbiting around a barycenter that sometimes crosses its own surface. Are there any calculations that tell us what effects this has on the perihelion precession of mercury?

Edit: I see now that you can do calculations in a barycentric reference frame or in a heliocentric reference frame. If one chooses to use the heliocentric frame (which is an accelerating frame), one would have to take into account "third body effects" on Mercury.

My question now comes down to the following: do we know whether or not these third body effects were taken into account in the calculation for the 532 arcsec/century value listed in the wiki link?

2 Answers

What effects does the motion of the Sun have on the perihelion precession of Mercury?

A better way to phrase that question is "What effects do the planets have on the perihelion precession of Mercury?"

When calculating the perihelion precession of a planet, one is implicitly working in a heliocentric frame, one in which the Sun is viewed as fixed. Perihelion precession is defined as the precession of the motion of a planet relative to the Sun. The motion of the Sun is irrelevant. The motion of a planet with respect to the barycenter is significantly more complex than is the motion of a planet with respect to the Sun. To illustrate, I'll quote from an answer I gave on physics.SE five years ago:

The following plot shows the distances between Venus and the Sun (red) and Venus and the solar system barycenter (black) from January 1970 to December 2014. The horizontal (time) axis is in days from 12 Noon TT, 1 January 2000.

Distance between Venus and the Sun versus Venus and the solar system barycenter, from January 1970 to December 2014

Note that the red curve, the distance between the Sun and Venus, exhibits a key characteristic of an elliptical orbit, which is a repetitive, nearly sinusoidal distance curve. The black curve, the distance between the solar system barycenter and Venus, does not. It exhibits beats and other nastiness.

One way to model the behavior of a planet orbiting the Sun while acknowledging the presence of other planets is to treat the center of the Sun as the center of an accelerating frame of reference. This results in what aerospace engineers and solar system modelers call "third body effects". The effective acceleration of Mercury toward Jupiter in a heliocentric frame is the gravitational acceleration of Mercury toward Jupiter less the gravitational acceleration of the Sun toward Jupiter.

This approach combined with numerical integration could be used to model the entire solar system. Doing so would have the advantage of not having to worry about where the barycenter is. It has the disadvantage of making an already highly coupled set of differential equations even more highly coupled. That disadvantage outweighs the advantage, making solar system modelers use a barycentric approach when modeling the entire solar system.

Neither approach (numerically integrating the solar system from a heliocentric vs barycentric approach) was used to discover the problem with Mercury's orbit by Urbain Le Verrier in the 19th century. The numerical integration techniques currently used to model the solar system very much depend on digital computers, something that didn't exist in the 19th century. The number of calculations needed far exceeded the capabilities of the human computers available in the 19th century.

Instead, Le Verrier and others who followed used Lagrange's planetary equations, or variations of those equations to model Mercury's behavior. These equations yield the contributions of perturbing forces (or perturbing potentials) to the time derivatives of various orbital elements. In particular, what is $dotomega$, the time derivative of the argument of perihelion, for Mercury?

Le Verrier calculated that the planets would cause Mercury's orbit to precess by 526.7 arc seconds per century. By 1912, Doolittle (and others) had found some issues with Le Verrier's calculations and had refined the Newtonian effects of other planets on Mercury's orbit to a precession of 532.36 arc seconds per century.

Neither Le Verrier's value nor Doolittle's refinement agreed with observation. There was a 43 arc second per century discrepancy between Mercury's observed perihelion precession and the calculated values, which Einstein showed was very nicely explained by general relativity. Note that the relativistic effect is small, less than 10% of the combined planetary effects.


References:

Doolittle, Eric. "The secular variations of the elements of the orbits of the four inner planets computed for the epoch 1850.0 GMT." Transactions of the American Philosophical Society 22.2 (1912): 37-189.

Answered by David Hammen on December 21, 2021

The cause of the motion of the Sun is the gravitational effects of primarily the outer, massive planets. These also perturb the orbit of Mercury. So rather than "orbiting around a barycentre" you might think of the motion of Mercury and the other inner planets and the Sun as moving in an irregular and constantly changing gravitational field.

When there are only two bodies, the motion in this changing field can be calculated and it is elliptical motion around a barycentre. But when there are three or more bodies the motion is more complex.

So the effect of gravitational perturbation is to cause the orbit to precess, by 532 arcseconds a century (as noted in your wikipedia link, which references an article in the Astronomical Journal). This includes all the gravitational effects of the other planets, including the motion of the sun.

Answered by James K on December 21, 2021

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