q-Numerical radius of sectorial matrices and 2 × 2 operator matrices

Abstract

This article focuses on several significant bounds of q-numerical radius wq(A) for sectorial matrix A which refine and generalize previously established bounds. One of the significant bounds we have derived is as follows: \[|q|22α2 \|A*A+AA*\| wq2(A) ((1-|q|2)(1+2sin2(α))+ |q|)22 \|A*A+AA*\|,\] where A is a sectorial matrix. Also, upper bounds for commutator and anti-commutator matrices and relations between wq(At) and wqt(A) for non-integral power t∈ [0,1] are also obtained. Moreover, a few significant estimations of q-numerical radius of off-diagonal 2×2 operator matrices are developed.