Norm inequalities involving geometric means
Abstract
Let Ai and Bi be positive definite matrices for every i=1,·s,m. Let Z=[Zij] be the block matrix, where Zij=Bi^12(Σk=1mAk)Bj^12 for every i,j=~1,·s,m. It is shown that |||Σi=1m(Ais Bis)r|||≤||| Z^sr2 ||| ≤ |||((Σi=1mAi)srp4(Σi=1mBi)srp2(Σi=1mAi)srp4)1p|||, for all s≥2, for all p>0 and r≥1 such that rp≥1 and for all unitarily invariant norms. This result generalizes the results in ONIR and gives an affirmative answer to a conjecture in OACRT for all s≥2 and for all p>0 and r≥1 such that rp≥1 and t=12. This result also leads directly to Dinh, Ahsani, and Tam's conjecture in GAI and proves Audenaert's result in ANIFP.
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