Functional analytic approach to Ces\`aro mean

Abstract

We study a certain class P of positive linear functionals on L∞([1,∞)) for which (f) = α if x ∞ 1x ∫1x f(t)dt = α. It turns out that translations f(x) f(rx) on L∞([1, ∞)), where r ∈ [1, ∞), which are induced by the action of the multiplicative semigroup [1, ∞) on itself, plays an intrinsic role in the study of P. We also deal with an analogue K of P of positive linear functionals on L∞([0, ∞)) partaining to the action of the additive semigroup [0, ∞) on itself. In particular, we give some expressions of maximal possible values of P and K for a given function respectively.