Gravitational Lensing

In Relativity by Brian Koberlein5 Comments

In an earlier post I wrote about how Einstein argued that gravity is not a force but rather a curvature of space and time. As beautiful as this idea is, how do we know that space is really curved? We can can answer that question by another one: how could we tell if space is flat?

In our everyday world we could demonstrate that a table is flat (or level) by rolling a smooth marble across its surface. If the table is perfectly flat, then a marble will always roll in a straight line. If the table is warped a bit, then we would see the marble change direction due to the warping of the surface.

We can use a similar trick to determine is space is flat. You might remember that Newton said gravity was a force between two masses. In classical physics light doesn’t have any mass, so according to Newton gravity cannot change the speed or direction of light. In Newton’s universe, if you shine a beam of light in any direction, it will travel in a straight line. Of course in Newton’s universe, space is flat.

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Lensing in Abel 2218. Source: APOD

If space is curved, then light can change direction. Just as any bumps or dips in the surface of our table causes the marble to change direction, any warps or wefts in space will cause light to change direction. In Einstein’s universe gravity can act as a lens, causing light to bend slightly near a mass.

This effect was first observed by Eddington in 1919, when he observed the deflection of star light due to the Sun during a total eclipse. But the effect is more dramatic when seen on the galactic scale. The image here is such an example. It is a Hubble image of a cluster of galaxies. You can see a pattern of thin arcs around the central galaxy. Those arcs are formed by the light of galaxies behind the central one. As their light heads our way, it is bent by the central mass, which smears their image out into thin arcs.

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Simulated lensing.

In the second figure I’ve plotted a simple model of this effect. The small gray circle is a distant disk of light, the cross mark is the location of a closer galaxy-sized mass, and the yellow arcs represent the image of the distant disk, warped and bent by the gravitational curvature of the galaxy. The gravitational lensing we see in galactic clusters is just as Einstein’s theory predicts.

Space and time are really curved.

If you’d like to play around with gravitational lensing yourself, check out this demonstration created in Mathematica. It is what I used to create the gravitational lens figure in my previous post. It requires a plugin, but it’s a cool demo.

Comments

    1. Really? Does it have an (electric) permitivity? How about a (magnetic) permeability? What are ε0 and μ0? Are these not properties of space?

      In space, can there be an electric field? A magnetic field? If so, how can it be that space has no properties?

      (To other readers: ε0 and μ0 are central to classical electromagnetism, summarized in Maxwell’s equations. In classical electromagnetism these properties of space are what gives light, and all electromagnetic radiation, its speed. If you could somehow change either, the speed of light would be different)

  1. Space has an index of refraction. Warped space has a different index of refraction. This means the speed of light changes in a gravitational field leading to lensing.

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