Operator mean inequalities for sector matrices
Abstract
In this note, some inequalities involving operator means of sectorial matrices are proved which are generalizations and refinements of previous known results. Among them, let A and B be two accretive matrices with A,B∈Sθ, 0 < mI ≤slant A, B ≤slant MI for positive real numbers M, m, \, σ be an operator mean and σ* be the adjoint mean of σ. If σ*≤slant σ1,σ2≤slant σ and is a positive unital linear map, then p(A σ1 B) ≤slant 2pθαp p(A σ2 B), where α= K, 41-2pK , and K= (M+m)24mM is the Kantorovich constant.
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