For a linear operator on a finite-dimensional complex vector space , the spectrum of is simply the subset of the complex numbers consisting of the eigenvalues of .
In the case that is an infinite-dimensional complex separable Hilbert space, the (normal) eigenvalues only form the discrete spectrum. Instead, the full spectrum is the set of all for which the resolvent is not a bounded operator.
In other words, the spectrum is the complement of the subset of complex numbers for which the resolvent is a bounded operator.
If is a bounded linear operator on a complex separable Hilbert space, then the spectrum is a compact subset of .
The set of ordinary normal eigenvalues of is a subset of called the discrete spectrum of . In particular case when is a compact operator the spectrum consists of the discrete spectrum only, except for possible addition of point .
See also
Last revised on November 27, 2024 at 11:27:13. See the history of this page for a list of all contributions to it.