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On the Surjectivity of Certain Maps

We prove in this article the surjectivity of three maps. We prove in Theorem $1.6$ the surjectivity of the Chinese remainder reduction map associated to the projective space of an ideal with a given factorization into ideals whose radicals are pairwise distinct maximal ideals. In Theorem $1.7$ we prove the surjectivity of the reduction map of the strong approximation type for a ring quotiented by an ideal which satisfies unital set condition. In Theorem $1.8$ we prove for Dedekind type domains which include Dedekind domains, for $k\geq 2$, the map from $k$-dimensional special linear group to the product of projective spaces of $k$ mutually co-maximal ideals associating the $k$-rows or $k$-columns is surjective. Finally this article leads to three interesting questions $[1.9, 1.10, 1.11]$ mentioned in the introduction section.