Quantum Philosophy

Not to be confused with Quantum (book).

Quantum Philosophy is a 2002 book by the physicist Roland Omnès, in which he aims to show the non-specialist reader how modern developments in quantum mechanics allow the recovery of our common sense view of the world.

Book contents

Brief summary of Omnès' central argument

Omnès' project is not quite as it at first sounds. He is not trying to show that quantum mechanics itself can be understood in a common sense framework, quite the opposite. He argues that modern science has, necessarily, become more and more formal, and more and more remote from common sense, as it strives to make itself an accurate reflection of the physical world. But he argues that we have now come near enough to scaling the 'magnificent peaks' of the formal mathematics needed to describe reality for one thing to have finally become clear: it is now possible to demonstrate, formally, and starting from the underlying principles of quantum mechanics, that the laws of classical logic, classical probability and classical dynamics apply to objects at the macroscopic level.

As Omnès makes explicit, this is the exact opposite of the classical epistemological project. It has always, up to now, been necessary to access reality by first presupposing the laws of classical common sense. Now finally, we can enter the world either at the formal level, or at the classical level, and we find that each entails the other: experiment has led to the quantum formalism; the quantum formalism now, finally, allows the recovery of the framework of classical reasoning under which the experiments took place.

Omnès emphasises throughout that no new principles, other than those described when quantum mechanics was developed in the 1920s, are needed. Moreover, some additional principles which seemed to be required then (such as wavefunction collapse, or its slightly more formal sister, wavefunction reduction) are no longer needed. Classical behaviour can now be recovered in a system described entirely by a single, unitary (time-reversible) wavefunction.

The mathematical developments which allowed this progress have taken place in two fields: quantum decoherence and the consistent histories approach to quantum mechanics.

The consistent histories approach makes mathematically explicit which sets of classical questions can be consistently asked of a single quantum system, and, conversely, which sets of questions are fundamentally inconsistent, and thus meaningless when asked together. We can therefore demonstrate formally why it is that the questions which Einstein, Podolsky and Rosen assumed could be asked together, of a single quantum system, simply cannot be asked together. On the other hand, we can demonstrate that classical, logical reasoning often does apply, even to quantum experiments – but we can now be mathematically exact about the limits of classical logic.

Quantum decoherence, on the other hand (in combination with the consistent histories approach), recovers classical behaviour at the macroscopic level. The formal mathematics of this approach allows us to demonstrate, finally, that is impossible (or rather, massively improbable) for a macroscopic Schrödinger's cat to exist for longer than a minuscule time (related to the macroscopic energy dissipation time by a factor involving the square of Planck's constant) in a quantum superposition of its |alive> and |dead> states. Even for a cat otherwise isolated from the rest of the Universe, and even with no observer present, there are so many unknowns in the quantum state of the whole cat, that the relevant mathematics determine that only the normally observed classical states of the cat are at all probable, except over the very shortest of timescales. This reasoning is developed formally within measurement theory, and applies to any macroscopic, non-super cooled measuring device, whether or not there is an observer to watch it.

Collaborators

Omnès makes clear that others contributed materially to the research described in his book, including Robert Griffiths, Murray Gell-Mann, and James Hartle.

Bibliography

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