Given a finite measure space $(A,\Sigma,\mu)$, for $p \in (1,\infty)$,
if {$f_n$} is a bounded sequence in $L^p(A)$ converging in measure to $f \in L^p (A)$, then {$f_n$} converges to $f$ for the weak topology on $L^P(A)$.
Thanks in advance.
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1First, use this. Then show (by contradiction, e.g.) that convergence in measure suffices. – David Mitra Apr 17 '15 at 10:43