Revision as of 08:30, 14 November 2006 edit Mct mht (talk \| contribs) 4,336 edits No edit summary ← Previous edit		Revision as of 20:27, 14 November 2006 edit undo Mct mht (talk \| contribs) 4,336 edits m →Quasinormal operators: typo Next edit →
Line 32: '''Fact:''' A bounded operator ''A'' is quasinormal if and only if in its [[polar decomposition]] ''A'' = ''UP'', the partial isometry ''U'' and positive operator ''P'' commute. Given a quasinormal ''A'', the ~~ideal~~idea is to construct dilations for ''U'' and ''P'' in a sufficiently nice way so everything commutes. Suppose for the moment that ''U'' is an isometry. Let ''V'' be the unitary dilation of ''U'', :<math> V = \begin{bmatrix} U & I - UU^* \\ 0 & - U^* \end{bmatrix}

Subnormal operator: Difference between revisions