Multivariable generalizations of bivariate means via invariance

Abstract

For a given p-variable mean M Ip I (I is a subinterval of R), following (Horwitz, 2002) and (Lawson and Lim, 2008), we can define (under certain assumption) its (p+1)-variable β-invariant extension as the unique solution K Ip+1 I of the functional equation align* K(M(x2,…,xp+1)&,M(x1,x3,…,xp+1),…,M(x1,…,xp))\\ &=K(x1,…,xp+1), for all x1,…,xp+1 ∈ I align* in the family of means. Applying this procedure iteratively we can obtain a mean which is defined for vectors of arbitrary lengths starting from the bivariate one. The aim of this paper is to study the properties of such extensions.