We extend the edge-coloring notion of core (subgraph induced by the vertices of maximum degree) to $t$-core (subgraph induced by the vertices $v$ with $d(v)+μ(v)> Δ+t$), and find a sufficient condition for $(Δ+t)$-edge-coloring. In particular, we show that for any $t\geq 0$, if the $t$-core of $G$ has multiplicity at most $t+1$, with its edges of multiplicity $t+1$ inducing a multiforest, then $χ'(G) \leq Δ+t$. This extends previous work of Ore, Fournier, and Berge and Fournier. A stronger version of our result (which replaces the multiforest condition with a vertex-ordering condition) generalizes a theorem of Hoffman and Rodger about cores of $Δ$-edge-colourable simple graphs. In fact, our bounds hold not only for chromatic index, but for the \emph{fan number} of a graph, a parameter introduced by Scheide and Stiebitz as an upper bound on chromatic index. We are able to give an exact characterization of the graphs $H$ such that $\mathrm{Fan}(G) \leq Δ(G)+t$ whenever $G$ has $H$ as its $t$-core.