Extended Cauchy-Schwarz inequalities for σ-elementary transformers in Schatten-von Neumann norm ideals

Abstract

Let q, r, s ≥slant 1 satisfy 12q + 12r = 1s and X ∈ Cs(H). If (λn)n=1∞, (wn)n=1∞ are sequences in (0,+∞) and (λn(1-q)/(2q) An)n=1∞, (λn1/(2q) An*)n=1∞, (wn-1/(2r) Bn)n=1∞ and (wn(r-1)/(2r) Bn*)n=1∞ are strongly square summable, then there exists \,C s\!\!Σn=1+∞AnXBn and equation* split &\|\!\!\,\!s\!\! Σ\,\,\,n=1\,\,\,∞AnXBn\|s \\ &≤slant\|\!\!\,s\!Σ\,\,n=1\,\,∞ λn1q An An* \|\!12 - 12q\! \|\!\!\,s\!Σ\,\,n=1\,\,∞wn\!-1r\! Bn* Bn \|\!12 - 12r\! \|\!(\!\!\!\,s\!Σ\,\,n=1\,\,∞ λn\!1q-1\! An* An\! )\!\!12q\! X(\!\!\!\,s\!Σ\,\,n=1\,\,∞ wn1-1r\! Bn Bn*\! )\!\!12r\! \|s\!. split equation* Equivalent inequalities are also given, together with some applications to families (An)n=1∞ and (Bn)n=1∞ in B(H) which are not double square summable. The results presented in this article significantly extends the previous results of authors related to σ-elementary transformers in Schatten-von Neumann ideals.

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