Contents
1
.
CHK:
2
.
tmp; MW
3
.
Sub
3.1
.
vector norm
3.2
.
matrix norm
3.3
.
p-adic norm
3.4
.
polynomial norm
3.5
.
t-norm, triangular norm
3.6
.
ADDHERE
3.7
.
ADDHERE
3.8
.
ADDHERE
3.9
.
ADDHERE
4
.
MKL
5
.
기타 , cmp
5.1
.
seminorm
5.2
.
conorm
5.2.1
.
t-conorm, triangular conorm
6
.
Twins
[
edit
]
1
.
CHK:
¶
벡터공간,vector_space
에서 정의? 벡터공간에 노름이 있으면
노름공간,normed_space
=
노름벡터공간,normed_vector_space
?
[
edit
]
2
.
tmp; MW
¶
// mw
복소수,complex_number
의
norm
은 complex_modulus (aka complex_norm )
https://mathworld.wolfram.com/ComplexModulus.html
사원수,quaternion
의
norm
은
https://mathworld.wolfram.com/QuaternionNorm.html
[
edit
]
3
.
Sub
¶
유클리드_노름,Euclidean_norm
- w
aka L2_norm ? ''그럼 pagename normalization rule for
norms
?
[
edit
]
3.1
.
vector norm
¶
vector_norm
=,vector_norm . vector_norm
vector_norm
?
vector_norm
??
vector_norm
??
jkjkjkjkjk
L1_norm = L1 norm = 맨해튼/taxicab norm
taxicab norm
..... rel. L1 distance = L1_distance = Manhattan_distance
맨해튼_거리,Manhattan_distance
=맨해튼_거리,Manhattan_distance
Manhattan_distance
=,Manhattan_distance . Manhattan_distance {
Manhattan_distance
맨해튼_거리
Manhattan_distance
ggggggggggg
Manhattan_distance
? fffffffffff
거리,distance
거리,distance
}
https://mathworld.wolfram.com/L1-Norm.html
Semitwins:
AI 용어사전: 맨하탄 거리
(https://terms.naver.com/entry.naver?docId=6653637&cid=69974&categoryId=69974)
L2 norm = Euclidean_norm ... rel. Euclidean_distance
https://mathworld.wolfram.com/L2-Norm.html
Lp_norm ? pagname ??
Lp norm
infinity_norm ... tmp see
https://blog.naver.com/waterforall/223058427336
https://mathworld.wolfram.com/L-Infinity-Norm.html
https://mathworld.wolfram.com/VectorNorm.html
[
edit
]
3.2
.
matrix norm
¶
matrix norm
matrix_norm
https://mathworld.wolfram.com/MatrixNorm.html
(double bar, 그 외는 single bar)
"matrix norm"
matrix norm
iiiiiiiiiii
[
edit
]
3.3
.
p-adic norm
¶
p-adic_norm
https://mathworld.wolfram.com/p-adicNorm.html
p진노름 ?
"p-adic norm"
p-adic norm
[
edit
]
3.4
.
polynomial norm
¶
polynomial norm
다항식노름 ?
다항식노름,polynomial_norm
- w; curr see
https://mathworld.wolfram.com/PolynomialNorm.html
"polynomial norm"
polynomial norm
polynomial norm
[
edit
]
3.5
.
t-norm, triangular norm
¶
t-norm
t노름,t-norm
?
t-norm
?
t-norm, triangular norm
t-norm
triangular norm
Rel
퍼지논리,fuzzy_logic
esp
t노름퍼지논리,t-norm_fuzzy_logic
see
t-norm_fuzzy_logic
(2023-11-22)
"Any kind of fuzzy logic
whose semantics
(
시맨틱스,semantics
)
valuates
(
valuation
... curr at
평가,evaluation?action=highlight&value=,valuation
맨아래)
conjunction
s
by means of t-norms."
[
edit
]
3.6
.
ADDHERE
¶
[
edit
]
3.7
.
ADDHERE
¶
[
edit
]
3.8
.
ADDHERE
¶
[
edit
]
3.9
.
ADDHERE
¶
ADDHERE
ADDHERE
[
edit
]
4
.
MKL
¶
노름공간
{
노름공간
노름공간
노름공간
노름공간
=
https://www.kms.or.kr/mathdict/list.html?key=kname&keyword=노름공간
{ 2023-10-30 현재 3개:
complete normed space 완비노름공간 // [[완비노름공간,complete_normed_space] =완비노름공간,complete_normed_space =,complete_normed_space . 완비노름공간 complete_normed_space
{ complete normed space
complete_normed_space
?
완비노름공간
}
normed space 노름공간
real normed space 실노름공간 //
실노름공간,real_normed_space
=실노름공간,real_normed_space =,real_normed_space 실노름공간 real_normed_space { real normed space
real_normed_space
?
실노름공간
}
}
}
바나흐_공간,Banach_space
{
바나흐 공간
바나흐 공간
"바나흐 공간" }
[
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]
5
.
기타 , cmp
¶
[
edit
]
5.1
.
seminorm
¶
seminorm
https://mathworld.wolfram.com/Seminorm.html
https://encyclopediaofmath.org/wiki/Semi-norm
[
edit
]
5.2
.
conorm
¶
conorm
=,conorm =,conorm . conorm
conorm
?
https://en.wiktionary.org/wiki/conorm
[
edit
]
5.2.1
.
t-conorm, triangular conorm
¶
t-conorm
t-conorm
=
https://en.wiktionary.org/wiki/t-conorm
Cmp
t-norm
t-conorm, triangular conorm
t-conorm
triangular conorm
rel
퍼지논리,fuzzy_logic
[
edit
]
6
.
Twins
¶
norm
https://mathworld.wolfram.com/Norm.html
https://encyclopediaofmath.org/wiki/Norm
https://ncatlab.org/nlab/show/norm
노름,norm
노름(수학)
{"
거리,distance
의
일반화,generalization
가
거리함수,distance_function
{
거리함수
}, 혹은
metric
라면 //
distance_function
metric#Noun
2. (네 개의 조건으로 정의됨)
distance function and metric
거리함수 metric 차이
노름
은
크기,size
의 일반화다.
세 조건으로 정의되며 두개만 만족하면
반노름,seminorm
{
seminorm
seminorm 정의
seminorm 정의
}
"}
AI 용어사전: 놈
(https://terms.naver.com/entry.naver?docId=6653587&cid=69974&categoryId=69974)
특성: (? 공리?)
absolute homogeneity = absolute_homogeneity
동차성,homogeneity
삼각부등식,triangle_inequality
성립
오직 원점에서만 그 값이 0임
Norm_(mathematics)
=
https://simple.wikipedia.org/wiki/Norm_(mathematics
)
Norm_(mathematics)
=
https://en.wikipedia.org/wiki/Norm_(mathematics
)
Retrieved from http://www.red-ruby.com/wiki/wiki.php/노름,norm
last modified 2023-12-06 07:15:21