Double piling structure of matrix monotone functions and of matrix convex functions II

Abstract

We continue the analysis in [H. Osaka and J. Tomiyama, Double piling structure of matrix monotone functions and of matrix convex functions, Linear and its Applications 431(2009), 1825 - 1832] in which the followings three assertions at each label n are discussed: (1)f(0) ≤ 0 and f is n-convex in [0, α). (2)For each matrix a with its spectrum in [0, α) and a contraction c in the matrix algebra Mn, f(c*ac) ≤ c*f(a)c. (3)The function f(t)/t (= g(t)) is n-monotone in (0, α). We know that two conditions (2) and (3) are equivalent and if f with f(0) ≤ 0 is n-convex, then g is (n -1)-monotone. In this note we consider several extra conditions on g to conclude that the implication from (3) to (1) is true. In particular, we study a class Qn([0, α)) of functions with conditional positive Lowner matrix which contains the class of matrix n-monotone functions and show that if f ∈ Qn+1([0, α)) with f(0) = 0 and g is n-monotone, then f is n-convex. We also discuss about the local property of n-convexity.