Difference between revisions of "Minimal negation operator"

\(\begin{matrix} (~) & = & 0 & = & \operatorname{false} \'"`UNIQ-MathJax1-QINU`"' * The point \((0, 0, \ldots , 0, 0)\) with all 0's as coordinates is the point where the conjunction of all negated variables evaluates to \(1,\!\) namely, the point where:

\[(x_1)(x_2)\ldots(x_{n-1})(x_n) = 1.\]

To pass from these limiting examples to the general case, observe that a singular proposition \(s : \mathbb{B}^k \to \mathbb{B}\) can be given canonical expression as a conjunction of literals, \(s = e_1 e_2 \ldots e_{k-1} e_k\). Then the proposition \(\nu (e_1, e_2, \ldots, e_{k-1}, e_k)\) is \(1\!\) on the points adjacent to the point where \(s\!\) is \(1,\!\) and 0 everywhere else on the cube.

For example, consider the case where \(k = 3.\!\) Then the minimal negation operation \(\nu (p, q, r)\!\), when there is no risk of confusion written more simply as \((p, q, r)\!\), has the following venn diagram:

For a contrasting example, the boolean function expressed by the form \(((p),(q),(r))\!\) has the following venn diagram:

Glossary of basic terms

• A boolean domain \(\mathbb{B}\) is a generic 2-element set, say, \(\mathbb{B} = \{ 0, 1 \},\) whose elements are interpreted as logical values, usually but not invariably with \(0 = \operatorname{false}\) and \(1 = \operatorname{true}.\)

• A boolean variable x is a variable that takes its value from a boolean domain, as x ∈ B.

• In situations where boolean values are interpreted as logical values, a boolean-valued function f : X → B or a boolean function g : B^k → B is frequently called a proposition.

• Given a sequence of k boolean variables, x₁, …, x_k, each variable x_j may be treated either as a basis element of the space B^k or as a coordinate projection x_j : B^k → B.

• This means that the k objects x_j for j = 1 to k are just so many boolean functions x_j : B^k → B , subject to logical interpretation as a set of basic propositions that generate the complete set of \(2^{2^k}\) propositions over B^k.

• A literal is one of the 2k propositions x₁, …, x_k, (x₁), …, (x_k), in other words, either a posited basic proposition x_j or a negated basic proposition (x_j), for some j = 1 to k.

• In mathematics generally, the fiber of a point y under a function f : X → Y is defined as the inverse image \(f^{-1}(y)\).

• In the case of a boolean function f : B^k → B, there are just two fibers:
  • The fiber of 0 under f, defined as \(f^{-1}(0)\), is the set of points where f is 0.
  • The fiber of 1 under f, defined as \(f^{-1}(1)\), is the set of points where f is 1.

• When 1 is interpreted as the logical value true, then \(f^{-1}(1)\) is called the fiber of truth in the proposition f. Frequent mention of this fiber makes it useful to have a shorter way of referring to it. This leads to the definition of the notation \([|f|] = f^{-1}(1)\!\) for the fiber of truth in the proposition f.

• A singular boolean function s : B^k → B is a boolean function whose fiber of 1 is a single point of B^k.

• In the interpretation where 1 equals true, a singular boolean function is called a singular proposition.

• Singular boolean functions and singular propositions serve as functional or logical representatives of the points in B^k.

• A singular conjunction in B^k → B is a conjunction of k literals that includes just one conjunct of the pair \(\{ x_j,\ \nu (x_j) \}\) for each j = 1 to k.

• A singular proposition s : B^k → B can be expressed as a singular conjunction:

See also

• Ampheck
• Anamnesis
• BACD
• Boole, George
• Boolean algebra
• Boolean function
• Boolean logic
• Boolean-valued function

• Continuous predicate
• Differentiable manifold
• Differential topology
• Dynamical system
• Exclusive disjunction
• Leibniz, G.W.
• Logical connective
• Logical graph

• Meno
• Multigrade operator
• Parametric operator
• Peirce, C.S.
• Sole sufficient operator
• Truth table
• Universal algebra
• Zeroth order logic

External links

• Wolfram Atlas of Simple Programs
  • ECARs (Elementary Cellular Automata Rules)
  • ECAR Index
  • ECAR Rule Icons
  • ECAR Examples
  • ECAR Boolean Forms

Aficionados

• See Talk:Minimal negation operator for discussions/comments regarding this article.
• See Minimal negation operator/Aficionados for those who have listed Minimal negation operator as an interest.
• See Talk:Minimal negation operator/Aficionados for discussions regarding this interest.

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