Struct nalgebra::base::UniformNorm

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pub struct UniformNorm;
Expand description

L-infinite norm aka. Chebytchev norm aka. uniform norm aka. suppremum norm.

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impl<T: SimdComplexField> Norm<T> for UniformNorm

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fn norm<R, C, S>(&self, m: &Matrix<T, R, C, S>) -> T::SimdRealFieldwhere R: Dim, C: Dim, S: Storage<T, R, C>,

Apply this norm to the given matrix.
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fn metric_distance<R1, C1, S1, R2, C2, S2>( &self, m1: &Matrix<T, R1, C1, S1>, m2: &Matrix<T, R2, C2, S2> ) -> T::SimdRealFieldwhere R1: Dim, C1: Dim, S1: Storage<T, R1, C1>, R2: Dim, C2: Dim, S2: Storage<T, R2, C2>, ShapeConstraint: SameNumberOfRows<R1, R2> + SameNumberOfColumns<C1, C2>,

Use the metric induced by this norm to compute the metric distance between the two given matrices.

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impl<T> Any for Twhere T: 'static + ?Sized,

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fn type_id(&self) -> TypeId

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fn from(t: T) -> T

Returns the argument unchanged.

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impl<T, U> Into<U> for Twhere U: From<T>,

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fn into(self) -> U

Calls U::from(self).

That is, this conversion is whatever the implementation of From<T> for U chooses to do.

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impl<T> Same<T> for T

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type Output = T

Should always be Self
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impl<SS, SP> SupersetOf<SS> for SPwhere SS: SubsetOf<SP>,

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fn to_subset(&self) -> Option<SS>

The inverse inclusion map: attempts to construct self from the equivalent element of its superset. Read more
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fn is_in_subset(&self) -> bool

Checks if self is actually part of its subset T (and can be converted to it).
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fn to_subset_unchecked(&self) -> SS

Use with care! Same as self.to_subset but without any property checks. Always succeeds.
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fn from_subset(element: &SS) -> SP

The inclusion map: converts self to the equivalent element of its superset.
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impl<T, U> TryFrom<U> for Twhere U: Into<T>,

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type Error = Infallible

The type returned in the event of a conversion error.
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Performs the conversion.
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type Error = <U as TryFrom<T>>::Error

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impl<V, T> VZip<V> for Twhere V: MultiLane<T>,

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fn vzip(self) -> V