Invariant Means, Complementary Averages of Means, and a Characterization of the Beta-Type Means

We prove that whenever the selfmapping ( M 1 , … , M p ) : I p → I p , ( p ∈ N and M i -s are p -variable means on the interval I ) is invariant with respect to some continuous and strictly monotone mean K : I p → I then for every nonempty subset S ⊆ { 1 , … , p } there exists a uniquely determined mean K S : I p → I such that the mean-type mapping ( N 1 , … , N p ) : I p → I p is K -invariant, where N i : = K S for i ∈ S and N i : = M i otherwise. Moreover min ( M i : i ∈ S ) ≤ K S ≤ max ( M i : i ∈ S ) . Later we use this result to: (1) construct a broad family of K -invariant mean-type mappings, (2) solve functional equations of invariant-type, and (3) characterize Beta-type means.