In this article very general bounded minimal homogeneous domains are considered. Under certain natural additional conditions new sharp results on Bergman type analytic spaces in minimal bounded homogeneous domains are obtained. Domains we consider here are direct generalizations of the well-studied so-called bounded symmetric domains in $\mathbb C^n.$ In the unit disk and in the unit ball all our results were obtained by first author. Some results were obtained previously in tubular and bounded pseudoconvex domains. Our proofs are heavily based on properties of so called $r$-lattices for these general domains provided in recent papers of Yamaji. Our proofs are also based on arguments provided earlier in less general domains.We partially extend an embedding result from Yamaji's paper.