Some inequalities for interpolational operator means

Abstract

Using the properties of geometric mean, we shall show for any 0 α ,β 1, \[f( A∇ α B ) f( ( A∇ α B )∇ β A )α f( ( A∇ α B )∇ β B ) f( A )α f( B )\] whenever f is a non-negative operator log-convex function, A,B∈ B( H ) are positive operators, and 0 α ,β 1. As an application of this operator mean inequality, we present several refinements of the Aujla subadditive inequality for operator monotone decreasing functions. Also, in a similar way, we consider some inequalities of Ando's type. Among other things, it is shown that if is a positive linear map, then \[ ( Aα B ) ( ( Aα B )β A )α ( ( Aα B )β B ) ( A )α ( B ).\]