The free will theorem of John H. Conway and Simon B. Kochen states that if we have a free will in the sense that our choices are not a function of the past, then, subject to certain assumptions, so must some elementary particles. Conway and Kochen's paper was published in Foundations of Physics in 2006.[1] In 2009, the authors published a stronger version of the theorem in the Notices of the American Mathematical Society.[2] Later, in 2017, Kochen elaborated some details.[3]
Axioms
The proof of the theorem as originally formulated relies on three axioms, which Conway and Kochen call "fin", "spin", and "twin". The spin and twin axioms can be verified experimentally.
- Fin: There is a maximal speed for propagation of information (not necessarily the speed of light). This assumption rests upon causality.
- Spin: The squared spin component of certain elementary particles of spin one, taken in three orthogonal directions, will be a permutation of (1,1,0).
- Twin: It is possible to "entangle" two elementary particles and separate them by a significant distance, so that they have the same squared spin results if measured in parallel directions. This is a consequence of quantum entanglement, but full entanglement is not necessary for the twin axiom to hold (entanglement is sufficient but not necessary).
In their later 2009 paper, "The Strong Free Will Theorem",[2] Conway and Kochen replace the Fin axiom by a weaker one called Min, thereby strengthening the theorem. The Min axiom asserts only that two experimenters separated in a space-like way can make choices of measurements independently of each other. In particular it is not postulated that the speed of transfer of all information is subject to a maximum limit, but only of the particular information about choices of measurements. In 2017, Kochen argued that Min could be replaced by Lin – experimentally testable Lorentz covariance.[3]
The theorem
The free will theorem states:
Given the axioms, if the choice about what measurement to take is not a function of the information accessible to the experimenters (Free Will assumption), then the results of the measurements cannot be determined by anything previous to the experiments.
That is an "outcome open" theorem.
If the outcome of an experiment was open, then one or two of the experimenters might have acted under free will.
Since the theorem applies to any arbitrary physical theory consistent with the axioms, it would not even be possible to place the information into the universe's past in an ad hoc way. The argument proceeds from the Kochen–Specker theorem, which shows that the result of any individual measurement of spin was not fixed independently of the choice of measurements. As stated by Cator and Landsman regarding hidden-variable theories:[4] "There has been a similar tension between the idea that the hidden variables (in the pertinent causal past) should on the one hand include all ontological information relevant to the experiment, but on the other hand should leave the experimenters free to choose any settings they like."
Reception
According to Cator and Landsman,[4] Conway and Kochen prove that "determinism is incompatible with a number of a priori desirable assumptions". Cator and Landsman compare the Min assumption to the locality assumption in Bell's theorem and conclude in the strong free will theorem's favor that it "uses fewer assumptions than Bell’s 1964 theorem, as no appeal to probability theory is made". The philosopher David Hodgson supports this theorem as showing quite conclusively that "science does not support determinism": that quantum mechanics proves that particles do indeed behave in a way that is not a function of the past.[5] Some critics argue that the theorem applies only to deterministic, and not even to stochastic, models.[6]
See also
Notes
- ↑ Conway, John; Simon Kochen (2006). "The Free Will Theorem". Foundations of Physics. 36 (10): 1441. arXiv:quant-ph/0604079. Bibcode:2006FoPh...36.1441C. doi:10.1007/s10701-006-9068-6. S2CID 12999337.
- 1 2 Conway, John H.; Simon Kochen (2009). "The strong free will theorem" (PDF). Notices of the AMS. 56 (2): 226–232.
- 1 2 Kochen, Simon (2017). "Born's Rule, EPR, and the Free Will Theorem". arXiv:1710.00868 [quant-ph].
- 1 2 Cator, Eric; Klaas Landsman (2014). "Constraints on determinism: Bell versus Conway–Kochen". Foundations of Physics. 44 (7): 781–791. arXiv:1402.1972. Bibcode:2014FoPh...44..781C. doi:10.1007/s10701-014-9815-z. S2CID 14532489.
- ↑ David Hodgson (2012). "Chapter 7: Science and determinism". Rationality + Consciousness = Free Will. Oxford University Press. ISBN 9780199845309.
- ↑ Sheldon Goldstein, Daniel V. Tausk, Roderich Tumulka, and Nino Zanghì (2010). What Does the Free Will Theorem Actually Prove? Notices of the AMS, December, 1451–1453.
References
- Conway and Kochen, The Strong Free Will Theorem, published in Notices of the AMS. Volume 56, Number 2, February 2009.
- Rehmeyer, Julie (August 15, 2008). "Do Subatomic Particles Have Free Will?". Science News.
- Introduction to the Free Will Theorem, videos of six lectures given by J. H. Conway, Mar. 2009.
- Wüthrich, Christian (September 2011). "Can the World Beshown to be Indeterministic after all?". In Beisbart, Claus; Hartmann, Stephan (eds.). Can the world be shown to be indeterministic after all? (PDF). Probabilities in Physics. Oxford University Press. pp. 365–389. doi:10.1093/acprof:oso/9780199577439.003.0014. ISBN 978-0199577439.