Abstract
We implement an advanced technique to provide combinatorial interpretations of some Rogers–Ramanujan type identities, also known as sum–product identities. Specifically, we elaborate on the notion of modular Ferrers diagrams to explain these identities in terms of n–color overpartitions. Additionally, we reveal the interdependence between split part n–color partitions, 2–color F–partitions, and n–color overpartitions.
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