relation

Üdvözlöm, Ön a relation szó jelentését keresi. A DICTIOUS-ban nem csak a relation szó összes szótári jelentését megtalálod, hanem megismerheted az etimológiáját, a jellemzőit és azt is, hogyan kell a relation szót egyes és többes számban mondani. Minden, amit a relation szóról tudni kell, itt található. A relation szó meghatározása segít abban, hogy pontosabban és helyesebben fogalmazz, amikor beszélsz vagy írsz. Arelation és más szavak definíciójának ismerete gazdagítja a szókincsedet, és több és jobb nyelvi forráshoz juttat.

Angol

Főnév

relation (tsz. relations)

viszony
(matematika) reláció

Basic relations:

equality: = → ${\textstyle =}$
not equal to: \neq or \ne → ${\textstyle \neq }$ ≠
less than: ] → ${\textstyle <}$
greater than: ] → ${\textstyle >}$
less than or equal to: \leq or \le → ${\textstyle \leq }$ ≤
greater than or equal to: \geq or \ge → ${\textstyle \geq }$ ≥
approximately equal to: \approx → ${\textstyle \approx }$ ≈
proportional to: \propto → ${\textstyle \propto }$ ∝
congruence: \equiv → ${\textstyle \equiv }$ ≡
subset of: \subset → ${\textstyle \subset }$ ⊂
subset of or equal to: \subseteq → ${\textstyle \subseteq }$ ⊆
superset of: \supset → ${\textstyle \supset }$ ⊃
superset of or equal to: \supseteq → ${\textstyle \supseteq }$ ⊇
set membership: \in → ${\textstyle \in }$ ∈
not set membership: \notin → ${\textstyle \notin }$ ∉

special relations:

divides: \mid → ${\textstyle \mid }$ ∣
does not divide: \nmid → ${\textstyle \nmid }$ ∤
parallel to: \parallel → ${\textstyle \parallel }$ ∥
not parallel to: \nparallel → ${\textstyle \nparallel }$ ∦
perpendicular to: \perp → ${\textstyle \perp }$ ⟂
isomorphic to: \cong → ${\textstyle \cong }$ ≅
equivalent to: \sim → ${\textstyle \sim }$ ∼
not equivalent to: \nsim → ${\textstyle \nsim }$ ≁
equivalence relation: \simeq → ${\textstyle \simeq }$ ≃
asymptotically equal to: \asymp → ${\textstyle \asymp }$ ≍

logical relations:

implies: \rightarrow → ${\textstyle \rightarrow }$ →
if and only if: \leftrightarrow → ${\textstyle \leftrightarrow }$ ↔
logical and: \land → ${\textstyle \land }$ ∧
logical or: \lor → ${\textstyle \lor }$ ∨

set relations:

element of: \in → ${\textstyle \in }$
not an element of: \notin → ${\textstyle \notin }$
subset: \subset → ${\textstyle \subset }$
superset: \supset → ${\textstyle \supset }$
subset or equal to: \subseteq → ${\textstyle \subseteq }$
superset or equal to: \supseteq → ${\textstyle \supseteq }$

miscellaneous relations:

proportional to: \propto → ${\textstyle \propto }$ ∝
approximately equal: \approx → ${\textstyle \approx }$ ≈
congruent modulo: \equiv → ${\textstyle \equiv }$ ≡
union: \cup → ${\textstyle \cup }$ ∪
intersection: \cap → ${\textstyle \cap }$ ∩
symmetric difference: \triangle → ${\textstyle \triangle }$ △

common poset relations:

less than or equal to: (partial order): \preceq → ${\textstyle \preceq }$ - this denotes the partial order relation, meaning "less than or equal to" under a given partial order.
strictly less than: (partial order): \prec → ${\textstyle \prec }$ - 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 → ${\textstyle \succeq }$ - this is the reverse of the partial order relation, meaning "greater than or equal to."
strictly greater than: (partial order): \succ → ${\textstyle \succ }$ - 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 ${\textstyle x\preceq y}$ holds for some ${\textstyle y}$ , but there is no ${\textstyle z}$ such that ${\textstyle z\prec x}$ .
maximal element: for a maximal element in a poset, the relation ${\textstyle x\succeq y}$ holds for some ${\textstyle y}$ , but there is no ${\textstyle z}$ such that ${\textstyle z\succ x}$ .

other related symbols in poset theory:

join least upper bound: \vee → ${\textstyle \vee }$ - this denotes the join operation in a lattice or poset, which is the least upper bound of two elements.
meet greatest lower bound: \wedge → ${\textstyle \wedge }$ - 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 → ${\textstyle \lessdot }$ - 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 → ${\textstyle \parallel }$ - this is used to denote that two elements are incomparable in a poset, meaning neither ${\textstyle x\preceq y}$ nor ${\textstyle y\preceq x}$ holds.
non-comparable relation: \npreceq → ${\textstyle \npreceq }$ - this indicates that the element is not "less than or equal to" in the poset.

További információk

relation - Szótár.net (en-hu)
relation - Sztaki (en-hu)
relation - Merriam–Webster
relation - Cambridge
relation - WordNet
relation - Яндекс (en-ru)
relation - Google (en-hu)
relation - Wikidata
relation - Wikipédia (angol)

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