关键词: 微分算子 ,  , 辛空间 ,  ,  ,  , Lagrangian子流型 ,  ,  , 奇异点 ,  ,  ,  , 直和空间

Abstract: The characterization of self-adjoint domains for symmetric differential operators with interior singular points in the direct sum spaces was investigated. By constructing different quotient spaces, using the method of symplectic geometry. The self-adjoint extensions of symmetric differential operators in the direct sum spaces for the different deficiency indices at (1,1)singular points was studied. The classification and description of complete Lagrangian submanifold that correspond with self-adjoint domains of second order differential operators were given.

Key words: Differential operators ,  , Symplectic spaces ,  Lagrangian submanifold  ,  Singular points  ,  , Direct sum spaces