On subadditive quasi-arithmetic means

Abstract

Let f R+ be a continuous and strictly monotone function. In the main result of this paper, we show that, for a fixed n≥ 2, the n-variable mean Af R+n R+ defined by Af(x1,…,xn):=f-1 ( f(x1)+·s+f(xn)n ) is subadditive if and only if f is differentiable with a continuously semi-differentiable and nonvanishing first derivative, and there exists an α∈[0,∞] such that f''+:=(f')'+ is positive on (0,α) and f''+=0 on [α,∞), furthermore, f'f''+ is increasing and superadditive on (0,α).

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