Gruss inequality for some types of positive linear maps

Abstract

Assuming a unitarily invariant norm |||·||| is given on a two-sided ideal of bounded linear operators acting on a separable Hilbert space, it induces some unitarily invariant norms |||·||| on matrix algebras Mn for all finite values of n via |||A|||=|||A 0|||. We show that if A is a C*-algebra of finite dimension k and : A Mn is a unital completely positive map, then equation* |||(AB)-(A)(B)||| ≤ 14 |||In|||\,|||Ikn||| dA dB equation* for any A,B ∈ A, where dX denotes the diameter of the unitary orbit \UXU*: U is unitary\ of X and Im stands for the identity of Mm. Further we get an analogous inequality for certain n-positive maps in the setting of full matrix algebras by using some matrix tricks. We also give a Gr\"uss operator inequality in the setting of C*-algebras of arbitrary dimension and apply it to some inequalities involving continuous fields of operators.