While working on a project, I ended up having to take direct limits, for which I admit I don't have a good intuition. Hoping that it is a simple problem for those who have more experience with direct limits than I do, I decided to ask it here.
Let $(G_i)_{i \in \mathbb{N}}$ be a sequence of abelian groups such that $G_i \subseteq G_{i+1}$ and consider the directed system
$G_0 \times G_1 \times \dots \rightarrow_{\varphi_0} G_1 \times G_2 \times \dots \rightarrow_{\varphi_1} \dots$
where each homomorphism $\varphi_k$ is given by $(\alpha,\beta,\gamma,\delta,\dots) \mapsto (\alpha\beta, \gamma, \delta, \dots)$. Is it possible to describe the direct limit of this system in terms of standard group theoretic constructions? I am aware of the standard construction of direct limits by taking an appropriate quotient of the disjoint union. I was hoping that there is a "simpler" description which avoids disjoint unions.
Here is what I was able to think so far. Consider the system
$G_1 \times G_2 \dots \rightarrow_{\psi_0} G_2 \times G_3 \dots \rightarrow_{\psi_1} \dots$
where each homomorphism $\psi_k$ is the left shift map given by $(\alpha,\beta,\gamma,\delta,\dots) \mapsto (\beta, \gamma, \delta, \dots)$. If I am not mistaken, the direct limit of this system should be the reduced product of the groups $G_i$ along the cofinite filter, where the isomorphism takes any element in the direct limit to the equivalence class of the appropriate sequence.
This suggests that the reduced product should be a part of the original direct limit I am considering. However, I can't really figure out how the first component that I discarded is going to interact with the reduced product.