Perturbation theory for normal operators

Abstract

Let E x A(x) be a C-mapping with values unbounded normal operators with common domain of definition and compact resolvent. Here C stands for C∞, Cω (real analytic), C[M] (Denjoy--Carleman of Beurling or Roumieu type), C0,1 (locally Lipschitz), or Ck,α. The parameter domain E is either R or Rn or an infinite dimensional convenient vector space. We completely describe the C-dependence on x of the eigenvalues and the eigenvectors of A(x). Thereby we extend previously known results for self-adjoint operators to normal operators, partly improve them, and show that they are best possible. For normal matrices A(x) we obtain partly stronger results.