The
quantum world is a strange place. If you look at an object, it changes. If you
know how fast it’s moving, you can’t know where it is. Measurements that
happened in the past can seemingly be erased later. Particles are sometimes
waves and can be in two places at once. Cats may be both dead and alive. These
are things we say when talking about the quantum world, but is this really what
is going on?
Quantum
mechanics is an incredibly well-established theory. It has passed every test
it’s ever been subjected to. It underlies much of the technological progress we
have seen in the past century, for what would electronics be without discrete
energy levels, which came to us courtesy of quantum mechanics? We have the
mathematics and we know how to work it, yet even after a century of debate, we
don’t know what the mathematics of quantum mechanics means.
Let’s
take an example: the idea that particles can be in two places at once. We are
familiar with particles that are in one place at a time – an electron, say,
that hits a screen and leaves a dot. These particles make an appearance in
quantum mechanics as a possible solution to the equations, as we expect.
But
quantum mechanics is a linear theory, which means if particles in particular
places exist, then so do sums of those particles. We call those sums
“superpositions”. And what is a particle in one place plus the same particle in
another place? It’s not two particles – that would be described by a product,
not a sum. Could you say that if we have a sum, then that’s a particle which is
in both places? Well, it’s been said many times, so arguably one can.
However, I don’t know what a superposition is, other than a piece of mathematics that we need in order to explain what we observe. We need superpositions because they give particles their wave-like properties. When we see waves interfering in water – cancelling out where a crest meets a trough – this is a non-quantum effect, a “classical” effect as physicists say. But it turns out that single particles can interfere with themselves. When we send an individual particle of light, or photon, through two thin slits in a plate – a double-slit – we see, as expected, a dot on the screen behind the plate. But if we continue doing this for many photons, we see an interference pattern built up from individual dots.
The only
way we can explain this pattern is that each particle is a sum – a
superposition – of two paths, one going through the left slit and one through
the right. So why not just say that the particle goes both ways?
There
are two reasons I don’t like this phrase. One is that a superposition of two
paths is not something in space. It belongs in an abstract mathematical
structure called a Hilbert space. It just has no analogue in physical space.
This is why we can’t find good words to describe it. It doesn’t belong in the
world we know; it’s something else entirely.
The
other problem with these superpositions is that while they exist in the
mathematics, we don’t observe them. When we observe a particle, it’s either in
one place or it isn’t. Indeed, if we measure which slit the photon went
through, the interference pattern vanishes. And what is the point of saying
that a particle really goes both ways when we never see it doing that?
The
rather boring truth is therefore that superpositions are mathematical
structures with certain properties. It’s not something we ever experience and
so all analogies and metaphors fail. The quantum world seems “strange” and
“weird” to us because we try to explain it with words that refer to our
everyday experience. This is why you read perplexing popular science articles
about cats that can allegedly be separated from their grin, or experiments that
supposedly show that reality doesn’t exist. These articles don’t make any more
sense to me than they make to you – it’s because they indeed don’t make sense.
I should admit here that I am very much an instrumentalist. I don’t think that the mathematics of our theories is itself real – I am comfortable with saying it’s a tool that we use to describe nature and leave it at this. I have no quarrel with superpositions living in abstract mathematical spaces, so long as they are tools that deliver correct predictions – which they do.
But I am
also a science writer and so I recognise the problem: lumping mathematical
definitions on the unsuspecting reader is not a promising way to build an
audience. Even if we were willing to lose readers, it wouldn’t aid our goal of
explaining what is going on in the mathematics. And so we forgo accurate descriptions
like superpositions or Hilbert spaces for headline-making grinless cats and
other absurdities. There’s no easy way out of this conundrum. I admit that I
myself have used, and will likely continue to use, the expression “in two
places at once”. Because at least my audience is familiar with it, which is
worth something.
Every
once in a while though, I think we should bring up the mathematical
expressions, so that in the long run our readers will get used to them. It has
happened before: we have become used to talking about electric and magnetic
fields, electromagnetic radiation even. These are also abstract mathematical
entities outside our direct experience. But electromagnetism has become such an
elementary part of our education that we talk about it comfortably.
There is
another reason we shouldn’t pretend it’s a mystery that mathematical structures
have no good verbal explanation, which is that it distracts from the actual
problems that quantum mechanics has. You may have put me down as a shut-up-and-calculate
person, as physicist David Mermin phrased it. And you’d be right. But this is
exactly why I have a problem with quantum mechanics. Quantum mechanics tells us
what happens in the act of a measurement, yet it does not explain what a measurement
is. We can’t calculate it. And yet we know that a measurement is what makes
quantum effects disappear.
That we
don’t understand how quantum effects disappear was illustrated by Erwin
Schrödinger with his famous cat thought experiment. Schrödinger suggested that
an atom that is both decayed and not decayed could be used to trigger the
release of a toxin that then both kills a cat and not. This argument shows that
without the act of a measurement, superpositions can become amplified to
macroscopic size. But we don’t observe dead-and-alive cats, so what gives?
The
standard reply to this conundrum is that the cat is constantly being measured.
Not by us, but by air molecules and even radiation in the cosmic microwave
background. These measurements, so the story goes, make quantum effects
disappear very quickly. But this is really just a story that isn’t born out in
the mathematics. For a shut-up-and-calculate person like me, it’s a real
problem indeed.
In my mind, therefore, the proliferation of quantum woo in the media distracts from the real problem at the heart of quantum mechanics: that we don’t know what a measurement is. Quantum mechanics is strange, yes. But let’s not pretend it’s stranger than it is.
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