John Lucas (philosopher)

John Randolph Lucas FBA (born 18 June 1929) is a British philosopher.

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Overview

John Lucas was educated at Winchester College and Balliol College, Oxford, where he studied first mathematics, then Greats (Philosophy and Ancient History), obtaining first class honours, and proceeding to an MA in Philosophy in 1954. He spent the 1957-58 academic year at Princeton University, deepening his understanding of mathematics and logic. For 36 years, until his 1996 retirement, he was a Fellow and Tutor of Merton College, Oxford, and he remains an emeritus member of the University Faculty of Philosophy. He is a Fellow of the British Academy.

Lucas is perhaps best known for his paper "Minds, Machines and Gödel," arguing that an automaton cannot represent a human mathematician, essentially refuting computationalism.

A prolific author with unusually diverse teaching and research interests, Lucas has written on the philosophy of mathematics, especially the implications of Gödel's incompleteness theorem, the philosophy of mind, free will and determinism, the philosophy of science including two books on physics coauthored with Peter E. Hodgson, causality, political philosophy, ethics and business ethics, and the philosophy of religion.

The son of a Church of England clergyman, and an Anglican himself, Lucas describes himself as "a dyed-in-the-wool traditional Englishman." He and Morar Portal have four children, among them Edward Lucas, International Editor of The Economist. Sartorially independent, he had the cool-weather habit of wearing a tie over his sweater and under a jacket.

In addition to his philosophical career, Lucas has a practical interest in business ethics. He helped found the Oxford Consumers' Group,[1] and was its first Chairman in 1961-3, serving again in 1965.

Main philosophical contributions

Free will

Lucas (1961) began a lengthy and heated debate over the implications of Gödel's incompleteness theorems for the anthropic mechanism thesis, by arguing that:[2]

  1. Determinism ↔ For any human h there exists at least one (deterministic) logical system L(h) which reliably predicts h's actions in all circumstances.
  2. For any logical system L a sufficiently skilled mathematical logician (equipped with a sufficiently powerful computer if necessary) can construct some statements T(L) which are true but unprovable in L. (This follows from Gödel's first theorem.)
  3. If a human m is a sufficiently skillful mathematical logician (equipped with a sufficiently powerful computer if necessary) then if m is given L(m), he or she can construct T(L(m)) and
  4. Determine that they are true--which L(m) cannot do.
  5. Hence L(m) does not reliably predict m's actions in all circumstances.
  6. Hence m has free will.
  7. It is implausible that the qualitative difference between mathematical logicians and the rest of the population is such that the former have free will and the latter do not.

His argument was strengthened by the discovery by Hava Siegelmann in the 1990s that sufficiently complex analog recurrent neural networks were not Turing Machines[3]

Space, time and causality

Lucas wrote several books on the philosophy of science and space-time (see below). In A treatise on time and space he introduced a transcendental derivation of the Lorenz Transformations based on Red and Blue exchanging messages (in Russian and Greek respectively) from their respective frames of reference which demonstrates how these can be derived from a minimal set of philosophical assumptions.

In The Future Lucas gives a detailed analysis of tenses and time, arguing that "the Block universe gives a deeply inadequate view of time. It fails to account for the passage of time, the pre-eminence of the present, the directedness of time and the difference between the future and the past"[4] and in favour of a tree structure in which there is only one past or present (at any given point in spacetime) but a large number of possible futures. "We are by our own decisions in the face of other men's actions and chance circumstances weaving the web of history on the loom of natural necessity"[5]

Career highlights

Notes

  1. ^ http://www.communigate.co.uk/oxford/oxfordconsumergroup/index.phtml .
  2. ^ Adapted mainly from [1]
  3. ^ H.T. Siegelmann, "Computation Beyond the Turing Limit," Science, 238(28), April 1995: 632-637
  4. ^ The Future p8
  5. ^ The Future p4

Books

External links