The strong perfect graph conjecture of Berge for line graphs of linear 3-colored hypergraphs

The well-known Strong Perfect Graph Conjecture of C.Berge states that a graph G is perfect if and only if neither G nor its complement G contain add holes (i. e. induced simple cycles of odd length greater than 3). The Strong Perfect Graph Conjecture is proved for line graphs of linear 3-colored hypergraphs (it means the strong coloring).