Innovenergy_trunk/frontend/node_modules/fp-ts/lib/HeytingAlgebra.d.ts

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/**
* Heyting algebras are bounded (distributive) lattices that are also equipped with an additional binary operation
* `implies` (also written as ``). Heyting algebras also define a complement operation `not` (sometimes written as
* `¬a`)
*
* However, in Heyting algebras this operation is only a pseudo-complement, since Heyting algebras do not necessarily
* provide the law of the excluded middle. This means that there is no guarantee that `a ¬a = 1`.
*
* Heyting algebras model intuitionistic logic. For a model of classical logic, see the boolean algebra type class
* implemented as `BooleanAlgebra`.
*
* A `HeytingAlgebra` must satisfy the following laws in addition to `BoundedDistributiveLattice` laws:
*
* - Implication:
* - `a → a <-> 1`
* - `a ∧ (a → b) <-> a ∧ b`
* - `b ∧ (a → b) <-> b`
* - `a → (b ∧ c) <-> (a → b) ∧ (a → c)`
* - Complemented
* - `¬a <-> a → 0`
*
* @since 2.0.0
*/
import { BoundedDistributiveLattice } from './BoundedDistributiveLattice'
/**
* @category model
* @since 2.0.0
*/
export interface HeytingAlgebra<A> extends BoundedDistributiveLattice<A> {
readonly implies: (x: A, y: A) => A
readonly not: (x: A) => A
}