zelfadjooint

Zelfadjooint is a term found in some Dutch-language mathematical writings to describe a self-adjoint joint operator concept. The usage is not standardized, and in many contexts the standard terminology self-adjoint (or Hermitian) together with commutativity is used instead. When people speak of zelfadjooint, they typically mean a collection of operators that are individually self-adjoint and possess a joint spectral structure allowing simultaneous analysis.

In formal terms, on a complex Hilbert space H, a set of operators A1, A2, … is called

Key properties include real spectra for each Ai, the possibility of defining joint functions through the joint

Examples are straightforward in finite-dimensional spaces: two commuting Hermitian matrices, such as diagonal matrices, admit a

See also: self-adjoint, Hermitian, adjoint, commuting operators, spectral theorem.