Modern atomic clocks only use caesium atoms as oscillators. Why don't we use other atoms for this role?
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13$\begingroup$ Cesium is not the only material used in atomic clocks. Rubidium has also been used in commercially available atomic clocks. $\endgroup$– The PhotonCommented Jun 29, 2015 at 19:20
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7$\begingroup$ Cesium is also not really "state of the art"; strontium clocks are starting to outpace it, although maybe not for commercial purposes just yet. See for instance the work of Jun Ye's group at JILA. $\endgroup$– zeldredgeCommented Jun 29, 2015 at 19:24
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4$\begingroup$ It's union rules. $\endgroup$– Hot LicksCommented Jun 29, 2015 at 21:38
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4$\begingroup$ This will probably change. I know that many people are also working on Yb atomic clocks because the element offers even better time-stability. $\endgroup$– MartinCommented Jun 29, 2015 at 21:45
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2$\begingroup$ At this point, because it's a definition? "The time it takes for 9,192,631,770 oscillations of a a cesium-133 atom." $\endgroup$– KevinCommented Jul 2, 2015 at 4:56
5 Answers
"Because that is how the second is defined" is nice - but that immediately leads us to the question "why did Cesium become the standard"?
To answer that we have to look at the principle of an atomic clock: you look at the frequency of the hyperfine transition - a splitting of energy levels caused by the magnetic field of the nucleus. For this to work you need:
- an atom that can easily be vaporized at a low temperature (in solids, Pauli exclusion principle causes line broadening; in hot gases, Doppler broadening comes into play)
- an atom with a magnetic field (for the electron - field interaction): odd number of protons/neutrons
- an atom with just one stable isotope (so you don't have to purify it, and don't get multiple lines)
- a high frequency for the transition (more accurate measurement in shorter time)
When you put all the possible candidate elements against this table, you find that Cs-133 is your top candidate. Which made it the preferred element; then the standard; and now, pretty much the only one used.
I found much of this information at http://www.thenakedscientists.com/forum/index.php?topic=12732.0
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2$\begingroup$ @TankorSmash - that's interesting. I do see that I was using it in the "now more current" sense (which is the first definition that shows up if you Google 'what does "beg the question" mean'). I think my meaning is well-understood. See also english.stackexchange.com/a/306/63462 . Still - I have edited my answer - don't want poor language to get in the way of clarity. $\endgroup$– FlorisCommented Jun 29, 2015 at 21:16
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2$\begingroup$ @TankorSmash It's not a clear-cut case but I think "begs the question" was fine in this case. Saying "The second was defined that way" does more or less presuppose the answer to "Why is the second defined using caesium clocks", which is what begging the question means. $\endgroup$ Commented Jun 30, 2015 at 8:05
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1$\begingroup$ @MasonWheeler: Not an electron, a cesium atom, and its particular transition has a frequency of 9,192,631,770 per second. That's not exactly a round number. $\endgroup$– MSaltersCommented Jul 1, 2015 at 8:00
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3$\begingroup$ The "easily-vaporized" requirement is actually for two reasons - it has to be a gas, to avoid the Pauli broadening encountered in condensed phases of matter, and it has to be a relatively-low-temperature gas, to minimize the Doppler broadening caused by the thermal motion of the caesium atoms in the clock. $\endgroup$– VikkiCommented Feb 22, 2022 at 19:13
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1$\begingroup$ @Vikki thanks for that comment - I have incorporated your suggestion into the answer. $\endgroup$– FlorisCommented Feb 23, 2022 at 0:25
The choice of cesium is due to various factors. It's worth noting that your statement "Modern atomic clocks only use caesium atoms" is simply untrue. At the very least, rubidium and hydrogen clocks are common, and you can get rubidium standards on eBay for well under $200. But the best performance comes from using cesium. In part this is because it was chosen as the standard, and as such it is considered more useful to spend development effort on improvements to the standard rather than an alternative.
But why was cesium chosen? Various factors:
At reasonable temperatures, cesium has a high vapor pressure, making resonance effects relatively easy to observe.
Large hyperfine transition, creating better Q of the resulting resonator.
As opposed to rubidium, cesium only has one stable isotope, so getting a really pure gas is much easier. No isotopic separation required.
EDIT - PlasmaHH has remarked on the superior frequency stability of hydrogen over cesium. While this is true, cesium shows better intrinsic accuracy (about 2 orders of magnintude), and no ageing effects, where hydrogen does age. The combination makes cesium a better standard, since a standard has no reference to check against in order to calibrate out drifts. See http://www.chronos.co.uk/files/pdfs/itsf/2007/workshop/ITSF_workshop_Prim_Ref_Clocks_Garvey_2007.pdf for a discussion by a manufacturer.
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$\begingroup$ "best performance" is quite fuzzy here. Mostly AHMs are considered to be more stable in frequency than caesium in the industry. $\endgroup$– PlasmaHHCommented Jun 30, 2015 at 8:19
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1$\begingroup$ @WetSavannaAnimalakaRodVance: active hydrogen maser $\endgroup$– PlasmaHHCommented Jun 30, 2015 at 12:45
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$\begingroup$ Unfortunately $200 on eBay won't buy you the ability to do the Halfele-Keating experiment at home :( I look forward to the day that school children can do it when they go on away on holidays! $\endgroup$ Commented Jun 30, 2015 at 12:47
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$\begingroup$ @SeleneRoutley See leapsecond.com/great2005 "In September 2005 the kids and I took several very accurate cesium atomic clocks from home and parked 5400 feet up Mt Rainier (the volcano near Seattle) for a full two days." $\endgroup$– PM 2RingCommented Feb 23, 2022 at 2:47
As mentioned by WhatRoughBeast, caesium offers several advantage over other microwave standards. Its most important feature is the presence of an atomic transition with a very small linewidth. This allows the energy of this transition to be established very accurately (see the uncertainty principle).
However, caesium is not the only atom with a narrow transition. For example, Yb+ ions have an octupole transition that is nHz wide: an atom excited to this state would last for several years before it decayed. This, in principle, would allow the frequency of the transition to be determined extremely well.
So why do atomic clocks only use caesium? Well...
They don't
The modern second is defined in terms of the Cs hyper-fine transition so, of course, no other clock can be as accurate as caesium, purely by definition. But in the field of atomic clocks, the word "accurate" takes on a specific meaning.
Frequently in physics, we refer to accuracy and precision. The accuracy of something is how well its average agrees with the "correct" value, whereas the precision is how scattered the results are. See the image below.
For atomic clocks, the relevant quantities are accuracy and stability. Here, the accuracy refers to how well the clock realises the SI second and the stability refers to how quickly it does so. The (in)stability of a clock occurs because all measurements have some statistical noise on them: it's only after many measurements that you get the right answer, and the stability tells you how many measurements you need to make.
Secondary representations of the SI second
So if the second is defined by caesium, why did I say that not all clocks use it?
The Comite International des Poids et Mesures (CIPM) in 2012 adopted 8 secondary representations of the SI second. 7 of these are optical clocks which offer many advantages over a caesium fountain (known as a microwave standard).
To know how good a clock is, you must compare it against another clock otherwise you have no reference! The best modern caesium fountains agree with each other to approximately $\frac{\Delta \nu}{\nu} \approx 10^{-16}$. Modern optical atomic clocks, such as ytterbium ion clocks or strontium lattice clocks, can exhibit agreements approaching $\frac{\Delta \nu}{\nu} \approx 10^{-18}$: that's 100 times better! Moreover, optical clocks are still improving quickly. It seems that, very soon, the best optical clocks will outpace microwave clocks by many orders of magnitude. See this article in Nature for more information.
These clocks work by using transitions that use visible frequencies, as opposed to microwave frequencies used in Cs clocks. So, while Cs still is the definition of the second, modern optical clocks offer far better performance and are expected to soon replace caesium as the standard.
The graph below shows the performance of atomic clocks throughout time. The red points represent the points at which optical clocks are performing better than caesium clocks. It is important to notice that caesium fountains have experienced improvements of 5 orders of magnitude over the last 40 years: no mean feat!
Because one second is defined as (from the SI brochure):
the duration of 9192631770 periods of the radiation corresponding to the transition between the two hyperfine levels of the ground state of the caesium-133 atom, ${}^{133}\mathrm{Cs}$.
Thus, using any other atom is irrelevant (even if calculate some correction time factor).
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11$\begingroup$ This sort of still begs the question of why caesium was chosen as the standard, though. $\endgroup$ Commented Jun 29, 2015 at 18:48
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$\begingroup$ @EmilioPisanty That's a nice question, but otherwise than "it's stable, it's ubiquitous, it's historical" I can't found any nice explanation on this. $\endgroup$– m0nhawkCommented Jun 29, 2015 at 18:52
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1$\begingroup$ I'm not sure it belongs here, though. There are two parts of the answer, "because there is a standard which we all need to follow or we're not quite sure we're talking about the same thing", and then "we chose caesium as the standard because...". The original post as posed is well answered by the first (and your) answer - Pinki would have to elaborate on how much detail they are after. $\endgroup$ Commented Jun 29, 2015 at 18:55
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3$\begingroup$ If some other isotope was better, we would use, and simply calculate the period of transition based on a comparison with caesium for commercial purposes. $\endgroup$ Commented Jun 29, 2015 at 23:07
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1$\begingroup$ For the historical basis behind the definition, see Wikipedia and this question. $\endgroup$ Commented Jul 1, 2015 at 22:49
As other users have said, it has one stable isotope, so that's nice.
It's also the SI standard. We define the second by Caesium. Specifically:
The second is the duration of 9 192 631 770 periods of the radiation corresponding to the transition between the two hyperfine levels of the ground state of the cesium 133 atom.
So, if we were to use another atom, it would not be as precise. Even if we calculated how many periods of another substance it took to equal a second, even if it was only off by a factor of 10-12 , it'd still be not as accurate as the system we're using today.
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$\begingroup$ If you built an oscillator that was more stable than a cesium clock, it would no handicap for its frequency to not be some exact multiple of 1 Hz. Any frequency can be synthesized from any other frequency by means of a Phase Locked Loop. $\endgroup$ Commented Jun 29, 2015 at 22:28
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$\begingroup$ The problem, if I understand correctly, is that given any other type of oscillator, we don't know what the frequency is, in seconds. We can measure it, but there are limits to how accurately we can measure it. $\endgroup$ Commented Jun 30, 2015 at 4:34