Results on comparison and sub/super-stabilizability of some new means

Abstract

We present analysis of some new means recently introduced by M. Ra\"issouli and A. Rezgui. We establish comparison relations and results on (K,N)-sub/super-stabilizability where K and N belong to the class of power means, denoted by Bp, and M is one of the classical or recently studied new means. Assuming that means K, M and N have asymptotic expansions, we present the complete asymptotic expansion of the resultant mean-map. As an application of the obtained asymptotic expansions and the asymptotic inequality between M and R(Bp,M,Bq), we show how to find the optimal parameters p and q for which M is (Bp,Bq)-sub/super-stabilizable.

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