If $X$ is an infinite dimensional separable Banach space (like $C^0(\Omega)$, for a compact metric space $\Omega$ ), and $\{x _ j \} _ {j\ge 1}$ is a dense sequence 
in its unit ball, one considers the norm on $X^*$ defined by $$ ||| u |||:=\sum _ {j=1} ^\infty 2 ^ {-j} |\langle u, x _ j  \rangle |\\ ,$$  which is weaker than the dual norm $\| \cdot \|$, since  $ |||u|||\le \| u\|$. On the space $ X ^ * $, the $|||\cdot|||$ norm topology and the $w^*$ topology  differ, because the latter is not metrizable. However, they induce the same topology on any bounded subset.