Revision as of 01:24, 23 September 2019 edit Comech (talk \| contribs) 364 edits added links to proofs and a translated version of article (1957). ← Previous edit		Revision as of 01:42, 23 September 2019 edit undo Comech (talk \| contribs) 364 edits →Equivalent definitions of normal eigenvalues Next edit →
Line 51: # <math>\lambda\in\sigma(A)</math> is an isolated point in <math>\sigma(A)</math>, its algebraic multiplicity <math>\nu=\dim\mathfrak{L}_\lambda</math> is finite, and the range of <math>A-\lambda I_{\mathbf{X}}</math> is [[Closed range theorem\|closed]]. The equivalence of (1) and (35) is proved in ~~Lemma~~Theorem 4.21 of (Gohberg–Krein 1957, 1960)~~, and then equivalence of (1) with (2) and (4) follows from the continuity of the index~~. The equivalence of (1) and (53) is proved in Theorem 24.12 of (Gohberg–Krein ~~1969~~1957, 1960), and then equivalence of (1) with (2) and (4) follows from the [[Fredholm_operator#Properties\|stability of the index]]. The equivalence of (1) and (6) is stated in (Gohberg–Krein 1969, Chapter 1, §2.1).

Normal eigenvalue: Difference between revisions