On the generalized quadratic mappings in quasi-Banach modules over a C*--algebra

Abstract

Let n>2 be a positive integer. In this paper, we obtain the general solution of the following functional equation n Σ1 i<j n Q(xi-xj)=Σi=1nQ(Σj =1n xj -n xi) which is derived from the centroid of the n distinct vectors x1, ..., xn in an inner product space. Furthermore, we prove that a mapping f between quasi-Banach modules over a C*-algebra satisfying approximately the equation can be approximated by a quadratic mapping Q satisfying exactly the equation such that |f(x)-Q(x)| is bounded.