Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/46270/1/209_2005_Article_BF01215477.pd
AbstractWe identify the linear span of commutators AB − BA, where A is a trace-class operator and B ...
AbstractWe establish finite- and infinite-dimensional versions of the following assertion. If M is a...
von Neumann's inequality in matrix theory refers to the fact that the Frobenius scalar product of tw...
AbstractWe present a novel approach to obtaining the basic facts (including Lidskii's theorem on the...
If a and b are trace-class operators, and if u is a partial isometry, then , where ∥⋅∥1 denotes the ...
AbstractLet Cp be the class of all compact operators A on the Hilbert space l2 for which ∑¦λi¦p < ∞,...
AbstractAn upper estimate for the norm of a matrix A as a Schur multiplier in the Schattern classes ...
AbstractIn this note, we generalize the inequality about the trace of positive semidefinite matrix t...
Let H be a separable infnite dimensional complex Hilbert space, and let L(H) denote the algebra of a...
AbstractThe paper contains a number of equivalent conditions which characterize the trace among the ...
AbstractWe show that there is a universal constant C > 1 such that any projection from Mn, n ⩾ 3, on...
We present a novel approach to obtaining the basic facts (including Lidskii's theorem on the equalit...
summary:Let $\Cal H$ be a separable infinite dimensional complex Hilbert space, and let $\Cal L(\Ca...
We present a novel approach to obtaining the basic facts (including Lidskii's theorem on the equalit...
summary:Let $\Cal H$ be a separable infinite dimensional complex Hilbert space, and let $\Cal L(\Ca...
AbstractWe identify the linear span of commutators AB − BA, where A is a trace-class operator and B ...
AbstractWe establish finite- and infinite-dimensional versions of the following assertion. If M is a...
von Neumann's inequality in matrix theory refers to the fact that the Frobenius scalar product of tw...
AbstractWe present a novel approach to obtaining the basic facts (including Lidskii's theorem on the...
If a and b are trace-class operators, and if u is a partial isometry, then , where ∥⋅∥1 denotes the ...
AbstractLet Cp be the class of all compact operators A on the Hilbert space l2 for which ∑¦λi¦p < ∞,...
AbstractAn upper estimate for the norm of a matrix A as a Schur multiplier in the Schattern classes ...
AbstractIn this note, we generalize the inequality about the trace of positive semidefinite matrix t...
Let H be a separable infnite dimensional complex Hilbert space, and let L(H) denote the algebra of a...
AbstractThe paper contains a number of equivalent conditions which characterize the trace among the ...
AbstractWe show that there is a universal constant C > 1 such that any projection from Mn, n ⩾ 3, on...
We present a novel approach to obtaining the basic facts (including Lidskii's theorem on the equalit...
summary:Let $\Cal H$ be a separable infinite dimensional complex Hilbert space, and let $\Cal L(\Ca...
We present a novel approach to obtaining the basic facts (including Lidskii's theorem on the equalit...
summary:Let $\Cal H$ be a separable infinite dimensional complex Hilbert space, and let $\Cal L(\Ca...
AbstractWe identify the linear span of commutators AB − BA, where A is a trace-class operator and B ...
AbstractWe establish finite- and infinite-dimensional versions of the following assertion. If M is a...
von Neumann's inequality in matrix theory refers to the fact that the Frobenius scalar product of tw...
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