Some extensions of Berezin number inequalities on operators

Abstract

In this paper, we establish some upper bounds for Berezin number inequalities including of 2× 2 operator matrices and their off-diagonal parts. Among other inequalities, it is shown that if T=[arraycc 0&X, Y&0 array], then align* berr(T)≤ 2r-2(ber(f2r(|X|)+g2r(|Y*|))+ber(f2r(|Y|)+g2r(|X*|)))\\ -2r-2 ∈f\|(kλ1,kλ2)\|=1 η(kλ1,kλ2), align* where η (kλ1, kλ2) = ((f2r(|X|)+g2r(|Y*|))kλ2,kλ212- (f2r(|Y|)+g2r(|X*|))kλ1,kλ112)2, X, Y are bounded linear operators on a Hilbert space H= H(), r≥ 1 and f, g are nonnegative continuous functions on [0, ∞) satisfying the relation f(t)g(t)=t\,(t∈[0, ∞)).