equality (definitional, propositional, computational, judgemental, extensional?, intensional?, decidable)
identity type, equivalence of types, definitional isomorphism
isomorphism, weak equivalence, homotopy equivalence, weak homotopy equivalence, equivalence in an (∞,1)-category
Examples.
Logical equivalence is the equivalence of propositions in logic.
It is also called the biconditional “”, the conditional in both directions “”, “”.
| symbol | in propositional logic | Unicode |
|---|---|---|
| typing relation | U+003A | |
| = | propositional equality relation | U+003D |
| logical negation operator | U+00AC | |
| double negation | U+00AC&U+00AC | |
| , | negation of converse implication, or negation of converse conditional | U+21CD, U+219A |
| , | negation of logical equivalence, or negation of biconditional | U+21CE, U+21AE |
| , | negation of implication, or negation of conditional | U+21CF, U+219B |
| , | converse implication, or converse conditional | U+21D0, U+2190 |
| , | implication, or conditional | U+21D2, U+2192 |
| , | logical equivalence, or biconditional | U+21D4, U+2192 |
| logical conjunctionoperator | U+2227 | |
| logical dysjunction operator | U+2228 | |
| inequality, or apartness relation | U+2260 | |
| syntactic entailment relation | U+22A2 | |
| semantic entailment relation | U+22A8 | |
| truth value, or top element | U+22A3 | |
| false value, or bottom element | U+22A4 | |
| , | logical exclusive dysjunction operator | U+22BB, U+2295 |
| logical non-conjunction operator | U+22BC | |
| logical non-dysjunction operator | U+22BD |
| symbol | in first-order logic | Unicode |
|---|---|---|
| universal quantifier | U+2200 | |
| existential quantifier | U+2203 | |
| uniqueness quantifier | U+2203&U+0021 | |
| negation of existential quantifier | U+2204 |
| symbol | in set theory | Unicode |
|---|---|---|
| × | binary Cartesian product, or binary product | U+00D7 |
| empty, or uninhabited set | U+2205 | |
| membership relation | U+2208 | |
| negation of membership relation | U+2209 | |
| containment relation | U+220B | |
| negation of containment relation | U+220C | |
| n-ary Cartesian product, or product operator | U+220F | |
| n-ary disjoint union, or coproduct operator | U+2210 | |
| binary intersection operator | U+2229 | |
| binary union operator | U+222A | |
| subset of relation | U+2282 | |
| superset of relation | U+2283 | |
| negation of subset relation | U+2284 | |
| negation of superset relation | U+2285 | |
| inclusion relation, or subset of, or equal to | U+2286 | |
| converse of inclusion relation, or superset of, or equal to | U+2287 | |
| binary disjoint union, or binary coproduct operator | U+2294 | |
| n-ary intersection operator | U+22C2 | |
| n-ary union operator | U+22C3 |
| symbol | in linear logic |
|---|---|
| additive truth | |
| additive falsehood | |
| multiplicative falsehood | |
| multiplicative truth | |
| linear implication | |
| multiplicative conjunction | |
| additive disjunction | |
| additive conjunction | |
| multiplicative disjunction | |
| exponential conjunction | |
| exponential disjunction | |
| negation |
computational trinitarianism =
propositions as types +programs as proofs +relation type theory/category theory
See also
Wikipedia, Logical equivalence
Wikipedia, If and only if
Wikipedia, Logical biconditional
Last revised on July 4, 2026 at 16:51:08. See the history of this page for a list of all contributions to it.