Majorization and some operator monotone functions

Let h(t) be a non-decreasing function on I and k(t) an increasing function on J. Then h is said to be majorized by k if k(A)≦k(B) implies h(A)≦h(B). f(t) is operator monotone, by definition, if f(t) is majorized by t. By making use of this majorization we will show that is operator monotone on [0,∞) for 0≦a,b<∞ and for 0≦r≦1; the special case of a=b=1 is the theorem due to Petz–Hasegawa.