TRMM
TRMM[sd,ul,ts,dg,α,a,b]
computes the multiplication of a triangle matrix a and a full matrix b as α opts[a].b or α b.opts[a] and resets b to the result.
詳細とオプション
- To use TRMM, you first need to load the BLAS Package using Needs["LinearAlgebra`BLAS`"].
- The following arguments must be given:
-
sd input string left/right side string ul - input string
upper/lower triangular string ts input string transposition string dg input string diagonal ones string α input expression scalar mutliple a input expression rectangular matrix b input/output symbol rectangular matrix; the symbol value is modified in place - The left/right side string sd may be specified as:
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"L" a is on the left side of the dot product "R" a is on the right side of the dot product - The upper/lower triangular string ul may be specified as:
-
"U" the upper triangular part of a is used "L" the lower triangular part of a is used - The transposition strings describe the operators opts and may be specified as:
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"N" no transposition "T" transpose "C" conjugate transpose - The diagonal ones string dg may be specified as:
-
"U" the main diagonal of a is assumed to contain only ones "N" the actual values of the main diagonal of a are used - Dimensions of the matrix arguments must be such that the dot product is well defined.
例題
すべて開くすべて閉じる例 (1)
Compute UpperTriangularize[a].b and save it in b:
Properties & Relations (4)
TRMM["L","U","N","N",α,a,b] is equivalent to b=α UpperTriangularize[a].b:
TRMM["L","L","T","N",α,a,b] is equivalent to b=αTranspose[LowerTriangularize[a]].b:
Note this is not TRMM["L","U","T","N",α,a,L] as the lower triangular part is used for the transpose:
If dg="U", the diagonal values of a are assumed to be ones:
The diagonal in a has been effectively replaced by ones:
If a is a rectangular matrix then only the leading upper or lower triangular part of a is used:
The matrix a is effectively truncated to its upper left corner:
テキスト
Wolfram Research (2017), TRMM, Wolfram言語関数, https://reference.wolfram.com/language/LowLevelLinearAlgebra/ref/TRMM.html.
CMS
Wolfram Language. 2017. "TRMM." Wolfram Language & System Documentation Center. Wolfram Research. https://reference.wolfram.com/language/LowLevelLinearAlgebra/ref/TRMM.html.
APA
Wolfram Language. (2017). TRMM. Wolfram Language & System Documentation Center. Retrieved from https://reference.wolfram.com/language/LowLevelLinearAlgebra/ref/TRMM.html