Let $C$ be a category with a zero object $0$, small products, and small coproducts. Let $(A_i)_{i \in I}$ be a (possibly infinite) list of objects. There is a canonical map $\amalg_{i \in I} A_i \to \prod_{i \in I} A_i$. If this map is an isomorphism, we denote the product / coproduct by $\oplus_...