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Ockham algebra - Wikipedia

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In mathematics, an Ockham algebra is a bounded distributive lattice {\displaystyle L} with a dual endomorphism, that is, an operation {\displaystyle \sim \colon L\to L} satisfying

  • {\displaystyle \sim (x\wedge y)={}\sim x\vee {}\sim y},
  • {\displaystyle \sim (x\vee y)={}\sim x\wedge {}\sim y},
  • {\displaystyle \sim 0=1},
  • {\displaystyle \sim 1=0}.

They were introduced by Berman (1977), and were named after William of Ockham by Urquhart (1979). Ockham algebras form a variety.

Examples of Ockham algebras include Boolean algebras, De Morgan algebras, Kleene algebras, and Stone algebras.