object
LU extends UFunc
Type Members
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type
Impl[V, VR] = UImpl[LU.this.type, V, VR]
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type
Impl2[V1, V2, VR] = UImpl2[LU.this.type, V1, V2, VR]
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type
Impl3[V1, V2, V3, VR] = UImpl3[LU.this.type, V1, V2, V3, VR]
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type
Impl4[V1, V2, V3, V4, VR] = UImpl4[LU.this.type, V1, V2, V3, V4, VR]
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Value Members
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final
def
!=(arg0: AnyRef): Boolean
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final
def
!=(arg0: Any): Boolean
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final
def
##(): Int
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final
def
==(arg0: AnyRef): Boolean
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final
def
==(arg0: Any): Boolean
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implicit
def
LU_DM_Cast_Impl[T](implicit cast: (T) ⇒ Double): Impl[DenseMatrix[T], (DenseMatrix[Double], Array[Int])]
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final
def
apply[V1, V2, V3, V4, VR](v1: V1, v2: V2, v3: V3, v4: V4)(implicit impl: Impl4[V1, V2, V3, V4, VR]): VR
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final
def
apply[V1, V2, V3, VR](v1: V1, v2: V2, v3: V3)(implicit impl: Impl3[V1, V2, V3, VR]): VR
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final
def
apply[V1, V2, VR](v1: V1, v2: V2)(implicit impl: Impl2[V1, V2, VR]): VR
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final
def
apply[V, VR](v: V)(implicit impl: Impl[V, VR]): VR
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final
def
asInstanceOf[T0]: T0
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implicit
def
canZipMapValuesImpl[T, V1, VR, U](implicit handhold: HandHold[T, V1], impl: Impl2[V1, V1, VR], canZipMapValues: CanZipMapValues[T, V1, VR, U]): Impl2[T, T, U]
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def
clone(): AnyRef
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final
def
eq(arg0: AnyRef): Boolean
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def
equals(arg0: Any): Boolean
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def
finalize(): Unit
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final
def
getClass(): Class[_]
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def
hashCode(): Int
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final
def
inPlace[V, V2, V3](v: V, v2: V2, v3: V3)(implicit impl: generic.UFunc.InPlaceImpl3[LU.this.type, V, V2, V3]): Unit
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final
def
inPlace[V, V2](v: V, v2: V2)(implicit impl: generic.UFunc.InPlaceImpl2[LU.this.type, V, V2]): Unit
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final
def
inPlace[V](v: V)(implicit impl: generic.UFunc.InPlaceImpl[LU.this.type, V]): Unit
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final
def
isInstanceOf[T0]: Boolean
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final
def
ne(arg0: AnyRef): Boolean
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final
def
notify(): Unit
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final
def
notifyAll(): Unit
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final
def
synchronized[T0](arg0: ⇒ T0): T0
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def
toString(): String
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final
def
wait(): Unit
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final
def
wait(arg0: Long, arg1: Int): Unit
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final
def
wait(arg0: Long): Unit
Inherited from AnyRef
Inherited from Any
Computes the LU factorization of the given real M-by-N matrix X such that X = P * L * U where P is a permutation matrix (row exchanges).
Upon completion, a tuple consisting of a matrix A and an integer array P.
The upper triangular portion of A resembles U whereas the lower triangular portion of A resembles L up to but not including the diagonal elements of L which are all equal to 1.
For 0 <= i < M, each element P(i) denotes whether row i of the matrix X was exchanged with row P(i-1) during computation (the offset is caused by the internal call to LAPACK).