# Search results

• some additional tautologies and equivalences.      Idempotence for conjunction      Idempotence for disjunction      Disjunctive addition      Disjunctive
11 KB (290 words) - 22:50, 23 March 2015
• conclude, that . is similar. The following equivalences hold: (Idempotence) (Commutativity) (Associativity) (Absorption) (Distributivity)
7 KB (1,083 words) - 00:28, 5 April 2012
• Name Rule 1a Idempotency 1b 2a Identity 2b 3a Boundedness 3b 4a Complement Laws 4b 5a Absorption 5b 6 Involution or Double Negation 7a Consensus
11 KB (1,303 words) - 22:16, 9 December 2015
• that remains is to check assosiativity, the absorption axioms and the idempotency axioms. The associativity is trivially satisfied, and for all . As
17 KB (1,977 words) - 01:21, 1 March 2016
• conjunction is Gödel t-norm. It has the axioms of basic logic plus an axiom of idempotence of conjunction, and its models are called G-algebras. Product fuzzy logic
22 KB (2,939 words) - 11:11, 20 January 2015
• \mathrm {P} \leftrightarrow \mathrm {P} \land \mathrm {P} \,\!}      Idempotence for conjunction ⊨
2 KB (20,118 words) - 04:04, 27 May 2009
• } {\displaystyle \Box \in \{\vee ,\wedge \}} Idempotency laws: a ◻ a =
20 KB (4,509 words) - 20:54, 1 June 2016
• } {\displaystyle \Box \in \{\vee ,\wedge \}} Idempotency laws: a ◻ a =
2 KB (75,991 words) - 07:18, 24 June 2016