Computer aided solution of the invariance equation for two-variable Gini means

Abstract

Our aim is to solve the so-called invariance equation in the class of two-variable Gini means Gp,q:p,q∈, i.e., to find necessary and sufficient conditions on the 6 parameters a,b,c,d,p,q such that the identity [Gp,q(Ga,b(x,y),Gc,d(x,y))=Gp,q(x,y) (x,y ∈ +)] be valid. We recall that, for p≠ q, the Gini mean Gp,q is defined by [Gp,q(x,y):=(xp+ypxq+yq)1p-q (x,y ∈ +).] The proof uses the computer algebra system Maple V Release 9 to compute a Taylor expansion up to 12th order, which enables us to describe all the cases of the equality.