The generalized Schwarz inequality for semi-Hilbertian space operators and Some A-numerical radius inequalities

Abstract

In this work, the mixed Schwarz inequality for semi-Hilbertian space operators is proved. Namely, for every positive Hilbert space operator A. If f and g are nonnegative continuous functions on [0,∞) satisfying f(t)g(t) =t (t0), then align* | T x,y A | \| f( | T |A x ) \|A \| g( | TA |A y ) \|A align* for every Hilbert space operator T such that the range of T* A is a subset in the range of A, such that A commutes with T, and for all vectors x,y∈ H, where | T |A = (ATAT)1/2 such that TA=A T*A, where A is the Moore-Penrose inverse of A. Based on that, some inequalities for the A-numerical radius are introduced.