Bounded Operators: Linearity & Inequality

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mathplease
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a linear operator T: X -> Y is bounded if there exists M>0 such that:

ll Tv llY [tex]\leq[/tex] M*ll v llX for all v in X

conversely, if i know this inequality is true, is it always true that T: X ->Y and is linear?
 
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I think that it is automatically continuous. Is that what you wanted instead? As noted, this clearly doesn't imply linearity.
 
Jamma said:
I think that it is automatically continuous. Is that what you wanted instead? As noted, this clearly doesn't imply linearity.

i see, yes. so in general, to show that something is a bounded linear operator from X to Y, you need to show the inequality, prove linearity and show that its a mapping from X to Y?
 
micromass said:
Yes, these are the things you need to show!

haha, thanks guys. much clearer now.
 
Note that linearity implies boundedness over finite dimensions- the linear maps are just the matrices. You only really need to take the boundedness into account when you are working over infinite-dimensional vector spaces.