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{{Short description|Mathematical concept}}
<!-- (redirect weak L1 ideal) -->
In mathematics, a '''weak trace class''' operator is a [[compact operator]] on a [[separable space|separable]] [[Hilbert space]] ''H'' with [[singular value]]s the same order as the [[harmonic series (mathematics)|harmonic sequence]].
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A [[compact operator]] ''A'' on an infinite dimensional [[separable space|separable]] [[Hilbert space]] ''H'' is ''weak trace class'' if μ(''n'',''A'') {{=}} O(''n''<sup>−1</sup>), where μ(''A'') is the sequence of [[singular value]]s. In mathematical notation the two-sided [[ideal (ring theory)|ideal]] of all weak trace-class operators is denoted,
::::<math> L_{1,\infty} = \{ A \in K(H) : \mu(n,A) = O(n^{-1}) \}. </math>
where <math>K(H) </math> are the compact operators.{{what|reason= This definition disagrees with the definition in the article
== Properties ==
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| author=A. Connes
| title=Noncommutative geometry
| url=
| publisher=Academic Press
| ___location=Boston, MA
| isbn=978-0-12-185860-5
| year=1994
| url-access=registration
}}
* {{cite book
| isbn=978-3-11-026255-1
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[[Category:Operator algebras]]
[[Category:Hilbert
[[Category:Von Neumann algebras]]
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