Multiplication of natural numbers can be understood as iterated addition, and we can understand binary Cartesian products as set-indexed coproducts; for sets $X$ and $Y$,
$$X\times Y\cong\coprod_XY\cong\coprod_YX.$$
The internalization of indexed coproducts is dependent sums, so we need these to ask the question
What categories with dependent sums does this relationship fail in for objects $X$ and $Y$? Is there a name for categories where this property holds?
