Is it true that if $U \subset V$ are vectors spaces, one can always find a vector space $X \subset V $ so that $V = U \oplus X$?
I know this it true when $V$ is finite dimensional, but is it true also in the infinite dimension case?
Thanks.
Is it true that if $U \subset V$ are vectors spaces, one can always find a vector space $X \subset V $ so that $V = U \oplus X$?
I know this it true when $V$ is finite dimensional, but is it true also in the infinite dimension case?
Thanks.