Online premeans and their computation complexity

Abstract

We extend some approach to a family of symmetric means (i.e. symmetric functions M n=1∞ In I with M ; I is an interval). Namely, it is known that every symmetric mean can be written in a form M(x1,…,xn):=F(f(x1)+·s+f(xn)), where f I G and F G I (G is a commutative semigroup). For G=Rk or G=Rk × Z (k ∈ N) and continuous functions f and F we obtain two series of families (depending on k). It can be treated as a measure of complexity in a family of means (this idea is inspired by theory of regular languages and algorithmics). As a result we characterize celebrated families of quasi-arithmetic means (G=R× Z) and Bajraktarevi\'c means (G=R2 under some additional assumptions). Moreover, we establish certain estimations of complexity for several other classical families.