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- Cohen–Hewitt_factorization_theorem abstract "In mathematics, the Cohen–Hewitt factorization theorem states that if V is a left module over a Banach algebra B with approximate left unit {ui}, then an element v in V can be factorized as a product v = bw (for b in B, w in V) whenever lim uiv = v. The theorem was introduced by Paul Cohen (1959) and Edwin Hewitt (1964).".
- Cohen–Hewitt_factorization_theorem wikiPageID "43192161".
- Cohen–Hewitt_factorization_theorem wikiPageLength "1165".
- Cohen–Hewitt_factorization_theorem wikiPageOutDegree "6".
- Cohen–Hewitt_factorization_theorem wikiPageRevisionID "637268824".
- Cohen–Hewitt_factorization_theorem wikiPageWikiLink Banach_algebra.
- Cohen–Hewitt_factorization_theorem wikiPageWikiLink Category:Banach_algebras.
- Cohen–Hewitt_factorization_theorem wikiPageWikiLink Category:Theorems_in_functional_analysis.
- Cohen–Hewitt_factorization_theorem wikiPageWikiLink Duke_Mathematical_Journal.
- Cohen–Hewitt_factorization_theorem wikiPageWikiLink Mathematics.
- Cohen–Hewitt_factorization_theorem wikiPageWikiLink Module_(mathematics).
- Cohen–Hewitt_factorization_theorem wikiPageWikiLinkText "Cohen–Hewitt factorization theorem".
- Cohen–Hewitt_factorization_theorem authorlink "Edwin Hewitt".
- Cohen–Hewitt_factorization_theorem authorlink "Paul Cohen".
- Cohen–Hewitt_factorization_theorem first "Edwin".
- Cohen–Hewitt_factorization_theorem first "Paul".
- Cohen–Hewitt_factorization_theorem last "Cohen".
- Cohen–Hewitt_factorization_theorem last "Hewitt".
- Cohen–Hewitt_factorization_theorem wikiPageUsesTemplate Template:Analysis-stub.
- Cohen–Hewitt_factorization_theorem wikiPageUsesTemplate Template:Citation.
- Cohen–Hewitt_factorization_theorem wikiPageUsesTemplate Template:Harvs.
- Cohen–Hewitt_factorization_theorem year "1959".
- Cohen–Hewitt_factorization_theorem year "1964".
- Cohen–Hewitt_factorization_theorem subject Category:Banach_algebras.
- Cohen–Hewitt_factorization_theorem subject Category:Theorems_in_functional_analysis.
- Cohen–Hewitt_factorization_theorem hypernym Module.
- Cohen–Hewitt_factorization_theorem type Software.
- Cohen–Hewitt_factorization_theorem comment "In mathematics, the Cohen–Hewitt factorization theorem states that if V is a left module over a Banach algebra B with approximate left unit {ui}, then an element v in V can be factorized as a product v = bw (for b in B, w in V) whenever lim uiv = v. The theorem was introduced by Paul Cohen (1959) and Edwin Hewitt (1964).".
- Cohen–Hewitt_factorization_theorem label "Cohen–Hewitt factorization theorem".
- Cohen–Hewitt_factorization_theorem sameAs Q18206043.
- Cohen–Hewitt_factorization_theorem sameAs m.0113y991.
- Cohen–Hewitt_factorization_theorem sameAs Cohen–Hewitts_faktoriseringssats.
- Cohen–Hewitt_factorization_theorem sameAs Q18206043.
- Cohen–Hewitt_factorization_theorem wasDerivedFrom Cohen–Hewitt_factorization_theorem?oldid=637268824.
- Cohen–Hewitt_factorization_theorem isPrimaryTopicOf Cohen–Hewitt_factorization_theorem.