Estimates of operator moduli of continuity

Abstract

In AP2 we obtained general estimates of the operator moduli of continuity of functions on the real line. In this paper we improve the estimates obtained in AP2 for certain special classes of functions. In particular, we improve estimates of Kato Ka and show that \|\,|S|-|T|\,\| C\|S-T\|(2+\|S\|+\|T\|\|S-T\|) for every bounded operators S and T on Hilbert space. Here |S|(S*S)1/2. Moreover, we show that this inequality is sharp. We prove in this paper that if f is a nondecreasing continuous function on that vanishes on (-,0] and is concave on [0,), then its operator modulus of continuity f admits the estimate f()∫ef( t)\,dtt2 t,>0. We also study the problem of sharpness of estimates obtained in AP2 and AP4. We construct a C function f on such that \|f\|L1, \|f\|1, and f()\,2,∈(0,1]. In the last section of the paper we obtain sharp estimates of \|f(A)-f(B)\| in the case when the spectrum of A has n points. Moreover, we obtain a more general result in terms of the -entropy of the spectrum that also improves the estimate of the operator moduli of continuity of Lipschitz functions on finite intervals, which was obtained in AP2.