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norm [2014/03/21 11:11]
127.0.0.1 external edit 		norm [2016/05/01 16:00]
nikolaj
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 | @#55CCEE: context ​    | @#55CCEE: $F$ ... subfield of $\mathbb{C}$ | | @#55CCEE: context ​    | @#55CCEE: $F$ ... subfield of $\mathbb{C}$ |
 | @#55CCEE: context ​    | @#55CCEE: $V$ ... $F$-vector space | | @#55CCEE: context ​    | @#55CCEE: $V$ ... $F$-vector space |
- 
 | @#FFBB00: definiendum | @#FFBB00: $p\in \mathrm{Norm}(V)$ | | @#FFBB00: definiendum | @#FFBB00: $p\in \mathrm{Norm}(V)$ |
- 
 | @#55EE55: postulate ​  | @#55EE55: $p:V\to \mathbb R $ | | @#55EE55: postulate ​  | @#55EE55: $p:V\to \mathbb R $ |
- +| $v,w\in V$ | |
-| $v,w\in V$ | +
 | @#55EE55: postulate ​  | @#55EE55: $p(v+w) \le p(v)+p(w)$ | | @#55EE55: postulate ​  | @#55EE55: $p(v+w) \le p(v)+p(w)$ |
 | @#55EE55: postulate ​  | @#55EE55: $p(v)=0 \implies v=0$ | | @#55EE55: postulate ​  | @#55EE55: $p(v)=0 \implies v=0$ |
- +| $\lambda\in F$ | |
-| $\lambda\in F$ | +
 | @#55EE55: postulate ​  | @#55EE55: $p(\lambda\cdot v) = |\lambda|\cdot p(v)$ | | @#55EE55: postulate ​  | @#55EE55: $p(\lambda\cdot v) = |\lambda|\cdot p(v)$ |
  
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 The last axiom $\ p(v)=0 \implies v=0\ $ isn't part of [[seminorm]]. The last axiom $\ p(v)=0 \implies v=0\ $ isn't part of [[seminorm]].
 +
 === Reference === === Reference ===
 Wikipedia: [[http://​en.wikipedia.org/​wiki/​Norm_%28mathematics%29|Norm]] Wikipedia: [[http://​en.wikipedia.org/​wiki/​Norm_%28mathematics%29|Norm]]
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