Üdvözlöm, Ön a
reláció szó jelentését keresi. A DICTIOUS-ban nem csak a
reláció szó összes szótári jelentését megtalálod, hanem megismerheted az etimológiáját, a jellemzőit és azt is, hogyan kell a
reláció szót egyes és többes számban mondani. Minden, amit a
reláció szóról tudni kell, itt található. A
reláció szó meghatározása segít abban, hogy pontosabban és helyesebben fogalmazz, amikor beszélsz vagy írsz. A
reláció és más szavak definíciójának ismerete gazdagítja a szókincsedet, és több és jobb nyelvi forráshoz juttat.
Kiejtés
Főnév
reláció
- (matematika) Az halmazon definiált reláción az -ból -ba történő megfeleltetéseket értjük. Azaz egy reláció olyan speciális megfeleltetés, ahol az indulási és érkezési halmaz azonos.
Származékok
Fordítások
Lásd még
Basic relations:
- equality:
=
→
- not equal to:
\neq
or \ne
→ ≠
- less than:
]
→
- greater than:
]
→
- less than or equal to:
\leq
or \le
→ ≤
- greater than or equal to:
\geq
or \ge
→ ≥
- approximately equal to:
\approx
→ ≈
- proportional to:
\propto
→ ∝
- congruence:
\equiv
→ ≡
- subset of:
\subset
→ ⊂
- subset of or equal to:
\subseteq
→ ⊆
- superset of:
\supset
→ ⊃
- superset of or equal to:
\supseteq
→ ⊇
- set membership:
\in
→ ∈
- not set membership:
\notin
→ ∉
special relations:
- divides:
\mid
→ ∣
- does not divide:
\nmid
→ ∤
- parallel to:
\parallel
→ ∥
- not parallel to:
\nparallel
→ ∦
- perpendicular to:
\perp
→ ⟂
- isomorphic to:
\cong
→ ≅
- equivalent to:
\sim
→ ∼
- not equivalent to:
\nsim
→ ≁
- equivalence relation:
\simeq
→ ≃
- asymptotically equal to:
\asymp
→ ≍
logical relations:
- implies:
\rightarrow
→ →
- if and only if:
\leftrightarrow
→ ↔
- logical and:
\land
→ ∧
- logical or:
\lor
→ ∨
set relations:
- element of:
\in
→
- not an element of:
\notin
→
- subset:
\subset
→
- superset:
\supset
→
- subset or equal to:
\subseteq
→
- superset or equal to:
\supseteq
→
miscellaneous relations:
- proportional to:
\propto
→ ∝
- approximately equal:
\approx
→ ≈
- congruent modulo:
\equiv
→ ≡
- union:
\cup
→ ∪
- intersection:
\cap
→ ∩
- symmetric difference:
\triangle
→ △
common poset relations:
- less than or equal to: (partial order):
\preceq
→ - this denotes the partial order relation, meaning "less than or equal to" under a given partial order.
- strictly less than: (partial order):
\prec
→ - this denotes strict inequality in a partial order, meaning that one element is strictly less than another.
- greater than or equal to: (partial order):
\succeq
→ - this is the reverse of the partial order relation, meaning "greater than or equal to."
- strictly greater than: (partial order):
\succ
→ - this denotes strict inequality in reverse, meaning one element is strictly greater than another in the partial order.
- minimal element: for a minimal element in a poset, the relation holds for some , but there is no such that .
- maximal element: for a maximal element in a poset, the relation holds for some , but there is no such that .
- join least upper bound:
\vee
→ - this denotes the join operation in a lattice or poset, which is the least upper bound of two elements.
- meet greatest lower bound:
\wedge
→ - this denotes the meet operation in a lattice or poset, which is the greatest lower bound of two elements.
- covers: (an element covers another):
\lessdot
→ - this is used to indicate that one element covers another in a hasse diagram, meaning there is no element between them in the poset.
- incomparable:
\parallel
→ - this is used to denote that two elements are incomparable in a poset, meaning neither nor holds.
- non-comparable relation:
\npreceq
→ - this indicates that the element is not "less than or equal to" in the poset.