This is where the second reaction, the neutral-current reaction ν_χ + D → p + n + ν_χ, comes into play. This is observed via the emitted neutrons, n, and is independent of the flavour of the incoming neutrino, χ. It therefore provides a way to normalize the total flux of neutrinos being emitted by the Sun. In the absence of neutrino oscillations, the flux inferred from the charged-current and neutral-current reactions would be the same, while neutrino oscillations would lower the charged-current rate but not the neutral-current rate. As a result, SNO can determine whether or not neutrinos change flavour regardless of the details of solar models. The third interaction is the same electron-scattering reaction already observed by the two Kamiokande detectors, ν_χ + e^– → ν_χ + e^–, which has some sensitivity to all neutrino flavours but does not allow a clean comparison between them.

Building an experiment like SNO is no simple task. First, you need 1000 tonnes of heavy water, which is not generally found at your local hardware store. Luckily, Ontario Hydro uses large quantities of heavy water in its nuclear reactors and was willing to lend us one reactor’s worth on the condition that we give it back (it is worth hundreds of millions of dollars). Then you need to dig an enormous cavity at great depth in which to house your detector. Again, tremendous good fortune led us to the INCO nickel-mining company, which has been supernaturally tolerant of a bunch of physicists doing rather odd things in its extremely profitable mine. Finally, once you have secured many millions of dollars to fund all of this, you get to the hard part: building the detector itself.

The difficulty arises because of natural background reactions that can mimic neutrino signals. Gamma rays arising from the radioactive decay of ubiquitous uranium and thorium are a particular problem, as they can break up deuterons and release neutrons that cannot be distinguished from those produced by neutral-current reactions. The only way to control this background is to build the detector from specially selected materials in a giant cleanroom – a cleanroom 2 km underground in an active and very dirty mine.

Once all this was accomplished in 1999 the fun really began, because the detector does not just say, “Hey, there was a neutrino – add one to the charged-current list!” The problem is that you cannot directly measure the response of the detector in order to pick out the few – about 10 per day – solar-neutrino events from the tens of events per second coming from background processes. Instead, we had to laboriously understand the behaviour of the detector from first principles using optical and radioactive sources, and computer simulations. Once this effort was complete, actually fitting the neutrino signals was relatively straightforward.

The results, announced in 2001 and 2002, confirmed beautifully the neutrino-oscillation prediction. The number of neutral-current events matched the predictions of the solar models quite precisely, showing that the total neutrino flux is actually spot on. However, the charge-current reaction rate showed that only about a third of these neutrinos are electron neutrinos by the time they reach the Earth, which proved that neutrinos change flavour on the way.

In 2004 we improved this measurement by adding two tonnes of salt to the heavy water, which makes the neutrons from the neutral-current events much easier to detect. But just to be absolutely sure that solar neutrinos really do change flavour, we are now repeating the experiment yet again. This time, however, we will be able to detect the neutral-current events independently of the charged-current events using an array of very sensitive neutron detectors. This will make the detector more sensitive to the mixing between electron- and muon-type neutrinos (and hence improve the measurement of the angle θ₁₂), while at the same time making extra sure that we have not been fooled by our first two measurements.

So, SuperKamiokande’s atmospheric-neutrino results from 1998 showed that neutrinos have mass, while, a few years later, SNO showed that neutrinos can change flavour. Does this prove that neutrino oscillations occur? Well, not quite, because a number of other models have been proposed that can also explain these data, ranging from new neutrino properties to the effects of higher dimensions. Luckily, in 1994 another Japanese group had proposed a very clever experiment called KamLAND, which provided the final piece of evidence for neutrino oscillations.

KamLAND is a large detector built in the old Kamiokande cavity that takes advantage of Japan’s nuclear reactors, which are powerful sources of electron antineutrinos (some 30% of Japan’s energy comes from nuclear power stations). Coincidentally, these reactors are at the right distance away for neutrino physics: close enough for their antineutrinos to be detected, but far enough away that neutrino oscillations should significantly suppress the number of electron antineutrinos detected.

The most recent results from KamLAND, reported last summer, clearly show not only a suppression of the detected flux, but also a distortion of the spectrum as a function of energy, which is precisely what the oscillation model predicts. The real clincher, however, is that the suppression is much less than that seen for solar neutrinos because their oscillation is modified as they pass through the dense matter of the Sun. This is exactly what is expected for a model of neutrino oscillations, but not for any of the other models, and seems to be the final piece of evidence needed to state that neutrinos really do oscillate. Furthermore, it allows us to measure Δm₁₂² accurately, which, combined with the solar-neutrino measurements, constrains the values of the neutrino-oscillation parameters.

Long-baseline experiments

If terrestrial experiments like KamLAND can observe the neutrino oscillations originally seen by solar-neutrino experiments, are there terrestrial experiments that can detect the oscillations seen in atmospheric neutrinos? The answer is yes, but it means we have to make our own high-energy neutrinos, and this requires an accelerator.

The idea of creating a pure, collimated beam of neutrinos has been around since the muon neutrino was discovered in the early 1960s. The starting point is to send a beam of protons into some target to produce pions, which then decay to produce a beam of muons and muon neutrinos. By stopping the muons before all but a very few can decay, a beam consisting almost solely of muon neutrinos emerges. Two types of experiments can be done with such a beam. First, one can look for a reduction in the flux of muon neutrinos from the expected value as a function of energy or distance; and second, one can look for electron or tau neutrinos in the beam that could not have been there when it was generated.

Experiments of this latter type have a long history, but we now know they were looking in the wrong place. Guided by a theoretical prejudice that all the mixing angles would be small and by the belief that neutrino masses should be large enough to explain the missing matter in the universe, researchers were looking for small mixing angles and large mass differences. But we now know from the results of solar, atmospheric and reactor oscillation experiments that we should be looking for small mass differences and large mixing angles, and a new generation of experiments has been designed to do just that.

The first of these, called K2K, produced its first results in 2000. The proton beam is produced at the KEK laboratory just north of Tokyo, and the resulting muon-neutrino beam is fired 250 km under Japan to the SuperKamiokande detector. Sure enough, this experiment has seen too few muon neutrinos, exactly as would be expected if the atmospheric-neutrino anomaly really is caused by neutrino oscillations.

A number of other such long-baseline experiments are either under construction or being planned. The first of these, called MINOS, will fire an intense beam of muon neutrinos from Fermilab near Chicago to a detector in the Soudan mine in Minnesota (a distance of 735 km). Unlike water Cerenkov detectors, MINOS consists of a large iron calorimeter in the presence of a magnetic field, which can track and measure the momentum of charged particles as they pass through the detector. MINOS can therefore make a more precise measurement of the energy spectrum of the muons arising from interactions with the Fermilab neutrinos, and thus allow a more precise determination of the energy at which the oscillations are at a maximum. This will allow us make better measurements of Δm₂₃², which is currently poorly determined.

Another long-baseline experiment called CNGS is under construction in Europe, where muon neutrinos will be fired from CERN in Geneva to the Gran Sasso National Laboratory near Rome (a distance of 730 km). The two large detectors being built at Gran Sasso – OPERA and ICARUS – will make extremely precise measurements of the resulting particle tracks. By actually observing tau neutrinos in the beam, this should enable the CNGS team to confirm a central prediction of our current models of neutrino oscillations – that the atmospheric-neutrino anomaly is caused primarily by the oscillation of muon to tau neutrinos.

I believe it was Eddington who said that anything that is consistent with all existing experimental data must be wrong, because some of the data are almost certainly wrong. For those who wish to believe in neutrino oscillations it is therefore a relief that one experiment – LSND at Los Alamos – does not fit into the neutrino picture outlined here.

In 1996 the LSND team claimed to see evidence for the appearance of electron neutrinos in a muon-neutrino beam, which suggested a small mixing angle and a relatively large value of Δm₁₂². Although another experiment with similar sensitivity called KARMEN at the Rutherford Appleton Laboratory in the UK has seen no evidence for this effect, the results of a dedicated experiment called MiniBooNE are keenly awaited. The MiniBooNE detector is based at Fermilab, and will search for electrons in a beam of muon neutrinos produced by Fermilab’s proton accelerator. If MiniBooNE sees no effect, then everyone, except possibly Eddington, can breathe a sign of relief and believe the three-neutrino oscillation picture painted by the existing experiments. On the other hand, if MiniBooNE confirms the LSND result then we live in a very strange world indeed and the mixing phenomenon would have to be much more complex than our current understanding.

Measuring θ₁₃: the next step in the story

So where do we stand with the measurements of the fundamental neutrino-oscillation parameters? Solar-neutrino experiments and KamLAND have measured the angle θ₁₂ to be about 32° and the mass difference Δm₁₂² to be about 8 x 10^-5 eV². Atmospheric-neutrino oscillation measurements have constrained θ₂₃ to be nearly 45° (i.e. neutrinos oscillate as much as is possible) and also measured Δm₂₃² to be about 2.5 x 10^-3 eV². This leaves the third mixing angle, θ₁₃.

We also need to know a bit more about the neutrino-mass states. With three different masses there are only two independent mass differences, and since we have already measured two mass differences you might think we were done. Unfortunately, it is not that simple. The reason why is that we do not know a priori the ordering of the mass states, because the vacuum-neutrino oscillations we have measured depend on the square of the mass differences and are therefore independent of their sign. But matter effects, such as those present for neutrinos that escape the dense interior of the Sun, do depend on the sign of the mass difference. We therefore know from the oscillations of solar neutrinos that ν₂ is more massive than ν₁. But since we have not yet seen any matter effects in the oscillations of atmospheric neutrinos, because the Earth is not sufficiently dense, there are two remaining possible orderings (figure 2).

Determining θ₁₃ and the mass hierarchy is the target of the next generation of planned experiments. We already know from experiments on shorter baselines than KamLAND that the angle θ₁₃, unlike the other two angles, is small. New experiments plan to look for θ₁₃ in the so-called sub-leading oscillations that arise when the effects of all three neutrinos are taken into account. These oscillations would produce small ripples on the primary oscillation pattern, and cause the additional appearance of electron neutrinos in a terrestrial muon-neutrino beam. New reactor and accelerator oscillation experiments have been proposed that will use a near detector and a far detector in order to improve the sensitivity to tiny suppressions and small appearance probabilities, and hence to smaller values of θ₁₃.

Long-baseline experiments such as MINOS offer some sensitivity to these second-order effects, but to significantly improve on our existing knowledge we will require entirely new facilities using even more intense neutrino beams. The first of these “superbeam” experiments, called T2K, is currently being built in Japan, and will involve firing a neutrino beam with unprecedented intensity through 295 km of rock from the JPARC facility on the east coast of the country to SuperKamiokande on the west. At the energies and distances involved, the type of oscillations seen in solar neutrinos will not produce any significant effect, so any electron neutrinos seen in the muon-neutrino beam would be a signal of oscillations modulated by the third angle θ₁₃.

Another new experiment called NOvA is planned at Fermilab, which will utilize the same beam used for MINOS. This experiment will be at higher energies and longer baselines than the T2K experiment, which will hopefully allow matter effects to be observed and enable us to determine the mass hierarchy.

The more distant future: the neutrino factory

So what does all this have to do with the excess of matter over antimatter in the universe, as promised all those words ago? A clue could lie in the parameter δ. Producing a matter-antimatter asymmetry requires the laws of physics to be different for matter and antimatter, and a non-zero value of δ would indeed lead to differences in the oscillations of neutrinos and antineutrinos. A related effect in the early universe called leptogenesis could then lead to a matter-antimatter imbalance. But leptogenesis depends on parameters that cannot be measured on Earth, so we must therefore first measure δ and then trust our theorists to find the right model to connect δ to leptogenesis.

The basic idea is simple: you start with a beam of muon neutrinos and measure the probability that they change into electron neutrinos, then switch to a beam of muon antineutrinos and measure the probability of a transition to electron antineutrinos at the same energy and baseline. Any difference would indicate that δ is not zero, provided that you pass the antineutrinos through an antimatter Earth and allow them to interact with an antimatter detector. Unfortunately this is beyond the science budgets of most countries, so we have to measure both neutrinos and antineutrinos with a detector made of ordinary matter and correct for the uninteresting differences that this introduces (which limits the sensitivity of the experiment).

Superbeam neutrino experiments may be sensitive to values of δ that are near π/2 or 3π/2, where CP violation is the largest (see box 2 below), but to really pin this angle down we need even more intense and “cleaner” neutrino beams. A feasibility study is currently taking place at CERN to find out if this can be achieved with beams of unstable nuclei, which undergo beta decay and produce pure beams of electron neutrinos or antineutrinos.

An even more ambitious plan is to build a “neutrino factory”, which would produce very pure and intense neutrino beams that could be fired thousands of kilometres through the Earth to distant detectors. Such a machine would make pions, which would decay into muons, as in a conventional long-baseline experiment. But it would then accelerate these muons to high energies so that they produce a collimated neutrino beam with a well-known energy when they decay. This would allow us to measure neutrino oscillations with a sensitivity that is orders of magnitude better than any other planned experiment, although the difficulty and expense of such an undertaking are considerable.

One major challenge is to find a way to collect and accelerate the muons before they have time to decay. Existing methods to “cool” particles by reducing their angular or energy spread are too slow to be used for muons (which rapidly decay into other particles). This has led to a major international experiment called MICE (Muon Ionization Cooling Experiment) at the Rutherford Appleton Laboratory that will test an entirely new type of cooling (see Physics World April p5). Technological developments such as MICE should make it possible to build a neutrino factory some time soon, hopefully before I retire in about 20 years.

The pay-off

So, neutrino oscillations have been discovered. But it is worth remembering that both confirmed observations of neutrino oscillations arose from experiments that were initially built to look for something else. In fact, when Ray Davis originally proposed his experiment, most people thought it was a waste of time (one reviewer even compared it to trying to measure the distance to the Moon by standing on a ladder and holding up your hand!). In today’s hypercompetitive funding system, it is very doubtful that Davis could have secured the resources to build the experiment at all. We must therefore be careful that we do not squeeze out the sense of adventure and curiosity that leads to the entirely new. Not finding exactly what you were looking for is not a risk to be mitigated in designing experiments, it is why we do experiments.

Neutrino oscillations may seem an odd quirk of quantum mechanics, but they could help us understand particle physics at a far deeper level. Paradoxically, the very smallness of neutrino masses leads many theorists to believe that they provide a window on physics at much higher energies than our accelerators can reach. The mixing of neutrinos, which can, in principle, be measured even more accurately than the more familiar mixing of quarks, may help explain the puzzle of why there are three versions of all the particles in the first place. Neutrino mass is important in our understanding of the universe as a whole, and, furthermore, neutrinos may have generated all the matter from which we are made. Not a bad pay-off for a tank of cleaning fluid and some wonky backgrounds in a proton-decay experiment.

Box 1: Neutrino oscillations in theory

If neutrinos have mass, then the identity of a given neutrino becomes a bit complicated. This is because in addition to the electron (ν_e), muon (ν_μ) and tau (ν_τ) “flavour” states that have well-defined weak interactions, neutrinos have another set of states – denoted ν₁, ν₂ and ν₃ – that have well-defined masses. Any particular neutrino will appear either as a ν_e, ν_μ or ν_τ if a measurement is sensitive to weak interactions, or as a ν₁, ν₂ or ν₃ if a measurement is sensitive to mass. It is possible for these two sets to be the same, but, in general, they will be “mixed”. In other words, a ν_e will be partly ν₁, partly ν₂ and partly ν₃, and similarly for ν_μ and ν_τ.

If we consider mixing between just two neutrino states as an example, this mixing can be described in terms of a single mixing angle θ (see equation 1).

$\left(\frac{{\nu }_{\mu }}{{\nu }_e}\right)=\left(\frac{\cos \theta \sin \theta }{–\sin \theta \cos \theta }\right)\left(\frac{{\nu }_1}{{\nu }_2}\right)$Real-life reactions produce flavour states: for instance, thermonuclear reactions in the Sun generate only ν_e. However, it is the mass states that propagate through space. If we take the simplest case of θ = 45°, the above equation states that ν_e = ν₁ – ν₂ and ν_μ = ν₁ + ν₂. Recalling that particles can also be described as waves, this means that the ν₁ and ν₂ waves are oscillating out of phase in the case of a ν_e, while ν₁ and ν₂ are in phase for ν_μ. If ν₁ and ν₂ have different masses, they will also have different wavelengths, and thus their relative phases will change with time or distance (see wavelength diagram).

If we start with a pure ν_μ beam (left), the ν₁ and ν₂ waves will eventually become completely out of phase and appear as a ne (middle), before changing back into a ν_μ as the beam continues to propagate (right). The speed with which this change of identity takes place depends on the difference between the two wavelengths, which depends on the differences between the squares of the masses of ν₁ and ν₂, Δm₁₂² = m₂² – m₁². In fact, the probability of finding a ν_μ in an initially pure nm beam with an energy E after it has travelled a distance L is given by (see equation 2).

$P\left({\nu }_{\mu }\to {\nu }_{\mu }\right)=1–{\sin }^{2}2\theta {\sin }^2\left(1.27\frac{\Delta m^{2}L}{E}\right)$

When the neutrinos are travelling through empty space, the decrease in the overall ν_μ flux (and the corresponding increase in the ν_e flux) thus depends on the amount of mixing, θ. However, since a ν_e experiences slightly different interactions in matter compared with a ν_μ or a ν_τ, the oscillations can actually be enhanced when a neutrino passes through the Sun or the Earth. Real experiments also involve all three neutrinos, which can lead to “oscillations on oscillations” that will be significant in future experiments (see text). Three-flavour oscillations require more parameters to be measured than in the two-flavour case described here: three mixing angles (θ₁₂, θ₂₃ and θ₁₃), two independent mass differences (Δm₁₂² and Δm₂₃²) and one additional parameter, δ, which could produce differences in the oscillations of neutrinos and antineutrinos.