Title of article :
Complex symplectic geometry with applications to vector differential operators
Author/Authors :
YANG, Chuan-Fu Nanjing University of Science and Technology - Department of Applied Mathematics, China
Abstract :
Let l(y) be a formally self-adjoint vector-valued differential expression of order n on an interval (a, infty)(-infty leq a infty) with complex matrix-valued function coefficients and finite equal deficiency indices. In this paper, applying complex symplectic algebra, we give a reformulation for self-adjoint domains of the minimal operator associated with l(y) and classify them
Keywords :
Symplectic algebra , Lagrangian subspace , vector , valued differential operator , self , adjoint domains
Journal title :
Turkish Journal of Mathematics
Journal title :
Turkish Journal of Mathematics
