A matching in a hypergraph H is a set of pairwise disjoint hyperedges. The matching number ν ( H ) of H is the size of a maximum matching in H . A subset D of vertices of H is a dominating set of H if for every v ∈ V ∖ D there exists u ∈ D such that u and v lie in an hyperedge of H . The cardinality of a minimum dominating set of H is the domination number of H , denoted by γ ( H ) . It was proved that γ ( H ) ≤ ( r − 1 ) ν ( H ) for r -uniform hypergraphs and the 2-uniform hypergraphs (graphs) achieving equality γ ( H ) = ν ( H ) have been characterized. In this paper we generalize the inequality γ ( H ) ≤ ( r − 1 ) ν ( H ) to arbitrary hypergraph of rank r and we completely characterize the extremal hypergraphs H of rank 3 achieving equality γ ( H ) = ( r − 1 ) ν ( H ) .