Nuclear operators between Banach spaces: Difference between revisions

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Line 1: In [[mathematics]], a '''nuclear ~~operator~~operators between Banach spaces''' isare a [[linear operator]]s between [[Banach space]]s in infinite dimensions that share some of the properties of their counter-part in finite dimension. In [[Hilbert space]]]s such operators are usually called [[trace class\|trace class operators]] and one can define such things as the [[trace (linear algebra)\|trace]]. In Banach spaces this is no longer possible for general nuclear operators, it is however possible for <math>\tfrac{2}{3}</math>-nuclear operator via the [[Grothendieck trace theorem]]. The general definition for [[Banach space]]s was given by [[Grothendieck]]. This article presents both cases but concentrates on the general case of nuclear operators on Banach spaces. Line 88: * {{Citation \|first1=Stephan \|last1=Stolz \|first2=Peter \|last2=Teichner \|title=Traces in monoidal categories \|journal=Transactions of the American Mathematical Society \|volume=364 \|year=2012 \|issue=8 \|pages=4425–4464 \|mr=2912459 \|doi=10.1090/S0002-9947-2012-05615-7 \|arxiv=1010.4527}} {{Functional ~~Analysis~~analysis}} {{Topological tensor products and nuclear spaces}} ~~{{TopologicalTensorProductsAndNuclearSpaces}}~~ [[Category:Operator theory]] [[Category:Topological tensor products]] [[Category:Linear operators]]