About: Cohen–Hewitt factorization theorem

Property	Value
dbo:abstract	In mathematics, the Cohen–Hewitt factorization theorem states that if is a left module over a Banach algebra with a left approximate unit , then an element of can be factorized as a product (for some and ) whenever . The theorem was introduced by Paul Cohen and Edwin Hewitt. (en) Inom matematiken är Cohen–Hewitts faktoriseringssats ett resultat som säger att om V är en vänstermodul över en Banachalgebra B med approximativ vänsterenhet {ui}, då kan ett element v i V faktoriseras som v = bw (med b i B, w i V) om lim uiv = v. Satsen introducerades av och. (sv)
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dbo:wikiPageWikiLink	dbc:Banach_algebras dbr:Duke_Mathematical_Journal dbc:Theorems_in_functional_analysis dbr:Mathematics dbr:Left_module dbr:Banach_algebra
dbp:authorlink	Paul Cohen (en) Edwin Hewitt (en)
dbp:first	Edwin (en) Paul (en)
dbp:last	Hewitt (en) Cohen (en)
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dbp:year	1959 (xsd:integer) 1964 (xsd:integer)
dcterms:subject	dbc:Banach_algebras dbc:Theorems_in_functional_analysis
gold:hypernym	dbr:Module
rdf:type	dbo:Software
rdfs:comment	In mathematics, the Cohen–Hewitt factorization theorem states that if is a left module over a Banach algebra with a left approximate unit , then an element of can be factorized as a product (for some and ) whenever . The theorem was introduced by Paul Cohen and Edwin Hewitt. (en) Inom matematiken är Cohen–Hewitts faktoriseringssats ett resultat som säger att om V är en vänstermodul över en Banachalgebra B med approximativ vänsterenhet {ui}, då kan ett element v i V faktoriseras som v = bw (med b i B, w i V) om lim uiv = v. Satsen introducerades av och. (sv)
rdfs:label	Cohen–Hewitt factorization theorem (en) Cohen–Hewitts faktoriseringssats (sv)
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prov:wasDerivedFrom	wikipedia-en:Cohen–Hewitt_factorization_theorem?oldid=986760971&ns=0
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