Estimations of Euclidean operator radius

Abstract

We develop several Euclidean operator radius bounds for the product of two d-tuple operators using positivity criteria of a 2× 2 block matrix whose entries are d-tuple operators. From these bounds, by using the polar decomposition of operators, we obtain Euclidean operator radius bounds for d-tuple operators. Among many other interesting bounds, it is shown that eqnarray* we(A) &≤&12 A\|1/2\|Σk=1d (|Ak|+|Ak*|)\|, eqnarray* where we(A) and \|A\| are the Euclidean operator radius and the Euclidean operator norm, respectively, of a d-tuple operator A=(A1,A2, …,Ad). Further, we develop an upper bound for the Euclidean operator radius of n× n operator matrix whose entries are d-tuple operators. In particular, it is proved that if bmatrix Aij bmatrixn× n is an n× n operator matrix then we( bmatrix Aij bmatrixn× n)≤ w (bmatrix aij bmatrixn× n), where each Aij is a d-tuple operator, 1≤ i,j≤ n, aij=we(Aij)\, if i=j, aij= we(|Aji|+|Aij*|)we(|Aij|+|Aji*|)\, if i<j, and aij= 0\, if i>j. Other related applications are also discussed.