ideal
A perfect standard of beauty, intellect etc., or a standard of excellence to aim at.
ideal en 30 secondes
- (noun) A perfect standard of beauty, intellect etc., or a standard of excellence to aim at.
- (noun) A subring closed under multiplication by its containing ring.
- (noun) (lattice theory) A non-empty lower set (of a partially ordered set) which is closed under binary suprema (a.k.a. joins).
Meanings
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noun A perfect standard of beauty, intellect etc., or a standard of excellence to aim at.
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noun A subring closed under multiplication by its containing ring.
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noun (lattice theory) A non-empty lower set (of a partially ordered set) which is closed under binary suprema (a.k.a. joins).
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noun A collection of sets, considered small or negligible, such that every subset of each member and the union of any two members are also members of the collection.
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noun (Lie theory) A Lie subalgebra (subspace that is closed under the Lie bracket) 𝖍 of a given Lie algebra 𝖌 such that the Lie bracket [𝖌,𝖍] is a subset of 𝖍.
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adjective Optimal; being the best possibility.
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adjective Perfect, flawless, having no defects.
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adjective Pertaining to ideas, or to a given idea.
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adjective Existing only in the mind; conceptual, imaginary.
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adjective Teaching or relating to the doctrine of idealism.
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adjective Not actually present, but considered as present when limits at infinity are included.
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Summary
A perfect standard of beauty, intellect etc., or a standard of excellence to aim at.
- (noun) A perfect standard of beauty, intellect etc., or a standard of excellence to aim at.
- (noun) A subring closed under multiplication by its containing ring.
- (noun) (lattice theory) A non-empty lower set (of a partially ordered set) which is closed under binary suprema (a.k.a. joins).