Cohen–Hewitt factorization theorem

In mathematics, the Cohen–Hewitt factorization theorem states that ifis a left module over a Banach algebrawith a left approximate unitThe theorem was introduced by Paul Cohen (1959) and Edwin Hewitt (1964).This mathematical analysis–related article is a stub.

mathematicsleft moduleBanach algebraPaul CohenEdwin HewittCohen, Paul J.Duke Mathematical JournalHewitt, EdwinFunctional analysistopicsglossaryBanachFréchetHilbertHölderNuclearOrliczSchwartzSobolevTopological vectorBarrelledCompleteLocally convexReflexiveSeparableHahn–BanachRiesz representationClosed graphUniform boundedness principleKrein–MilmanMin–maxGelfand–NaimarkBanach–AlaogluAdjointBoundedCompactHilbert–SchmidtNormalTrace classTransposeUnboundedUnitaryC*-algebraSpectrum of a C*-algebraOperator algebraGroup algebra of a locally compact groupVon Neumann algebraInvariant subspace problemMahler's conjectureHardy spaceSpectral theory of ordinary differential equationsHeat kernelIndex theoremCalculus of variationsFunctional calculusIntegral linear operatorJones polynomialTopological quantum field theoryNoncommutative geometryRiemann hypothesisDistributionGeneralized functionsApproximation propertyBalanced setChoquet theoryWeak topologyBanach–Mazur distanceTomita–Takesaki theorymathematical analysis