Guest But Posted February 14, 2005 Posted February 14, 2005 Dumb question: Is the infinite dimensional vector space (with finite number of non-zero components of course) over a countable field countable? I tried to look it up, but couldn't find anything. I don't need a proof, just maybe a little plausible explanation if possible.
matt grime Posted February 14, 2005 Posted February 14, 2005 Not necessarily, since you've not said if there is a countable basis. There is no such thing as "the" infinite dimensional vector space. You are asking is [math]\coprod_{a \in \Alpha} F_a[/math] countable if each F_a is countable. That depends on the indexing set \Alpha
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