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- Douglas'_lemma abstract "In operator theory, an area of mathematics, Douglas' lemma relates factorization, range inclusion, and majorization of Hilbert space operators. It is generally attributed to Ronald G. Douglas, although Douglas acknowledges that aspects of the result may already have been known. The statement of the result is as follows:Theorem: If A and B are bounded operators on a Hilbert space H, the following are equivalent: for some There exists a bounded operator C on H such that A = BC.Moreover, if these equivalent conditions hold, then there is a unique operator C such that ker(A) = ker(C) A generalization of Douglas' lemma for unbounded operators on a Banach space is given in.".
- Douglas'_lemma wikiPageID "21607408".
- Douglas'_lemma wikiPageRevisionID "604697261".
- Douglas'_lemma hasPhotoCollection Douglas'_lemma.
- Douglas'_lemma subject Category:Operator_theory.
- Douglas'_lemma comment "In operator theory, an area of mathematics, Douglas' lemma relates factorization, range inclusion, and majorization of Hilbert space operators. It is generally attributed to Ronald G. Douglas, although Douglas acknowledges that aspects of the result may already have been known.".
- Douglas'_lemma label "Douglas' lemma".
- Douglas'_lemma sameAs m.05m_dkn.
- Douglas'_lemma sameAs Q5301141.
- Douglas'_lemma sameAs Q5301141.
- Douglas'_lemma wasDerivedFrom Douglas'_lemma?oldid=604697261.
- Douglas'_lemma isPrimaryTopicOf Douglas'_lemma.