Invariance in a class of operations related to weighted quasi-geometric means

Abstract

Let I⊂ (0,∞ ) be an interval that is closed with respect to the multiplication. The operations Cf,g I2→ I of the form equation* Cf,g( x,y) =( f g) -1( f( x) · g( y) ) , equation* where f,g are bijections of I are considered. Their connections with generalized weighted quasi-geometric means is presented. It is shown that invariance question within the class of this operations leads to means of iterative type and to a problem on a composite functional equation. An application of the invariance identity to determine effectively the limit of the sequence of iterates of some generalized quasi-geometric mean-type mapping, and the form of all continuous functions which are invariant with respect to this mapping are given. The equality of two considered operations is also discussed.