The Optimal Toaster Problem

If we have $T $ slices of bread and want the slices to be toastes $vec V$ times, then if we had a single slot toaster, we'd need $sum vec V$ turns.

Since we have $K$ slots, we'll instead need at least $frac{sum vec V}K$ turns.
Let's say that a strategy is perfect if it allows us to toast all toasts to the wished toastiness in $lceilfrac{sum vec V}Krceil$ turns.

Then we can find a perfect strategy for the toasting process, if one exists, by means of network flow (and therefore just as well using linear programming):

We create the graph as follows:

• We create the source vertex $S_I$ and the sink vertex $S_O$.

• We create a vertex $v_i$ for every toast.

• We add a vertex $t_i$ for every turn.

• For all $i$, we add an edge from the source $S_I$ to $v_i$ with capacity of $V_i$.
  

• For all $i$ we add an edge from $t_i$ to the sink $S_O$ with capacity of $K$.

• For all $i,j$ we add an edge with infinite capacity from $v_i$ to $t_j$

Now we search for a maximal flow in this graph. There's two outcomes:
Either we obtain a maximal flow that maximally utilizes all edges from $S_I$ to $v_i$. Then there exists a perfect strategy, and we con reconstruct it from the flow.
Or the maximal flow doesn't utilize all these edges maximally, in which case there is no perfect strategy.