\newcommand{\R}{\mathbf{R}} Let $X$ be a Banach space. Using derivatives in the sense of vector distributions, we show that the space $DC([0,1],X)$ of all d.c.\ mappings from $[0,1]$ into $X$, in a natural norm, is isomorphic to the space $M_{bv}([0,1], X)$ of all vector measures with bounded variation. The same is proved for the space $BDC_b((0,\infty), X)$ of all bounded d.c.\ mappings with a bounded control function. The result for the space $DC([0,1], \R)$ of all continuous d.c.\ functions was (essentially) proved by M. Zippin [The space of differences of convex functions on $[0,1]$, Serdica Math. J. 26 (2000) 331--352] by a quite different method. The space $BDC_b((0,\infty), \R)$ consists of all differences of two bounded convex functions. Internal characterizations of its members were given by O. B{\"o}hme [On functions which are the difference of two bounded convex functions on $(0,\infty)$, Math. Nachr. 122 (1985) 45--58], but our characterization of its Banach structure is new.