On n-norm preservers and the Aleksandrov conservative n-distance problem

Abstract

The goal of this paper is to point out that the results obtained in the recent papers [7,8,10,11] can be seriously strengthened in the sense that we can significantly relax the assumptions of the main results so that we still get the same conclusions. In order to do this first, we prove that for n ≥ 3 any transformation which preserves the n-norm of any n vectors is automatically plus-minus linear. This will give a re-proof of the well-known Mazur--Ulam-type result that every n-isometry is automatically affine (n ≥ 2) which was proven in several papers, e.g. in [9]. Second, following the work of Rassias and Semrl [23], we provide the solution of a natural Aleksandrov-type problem in n-normed spaces, namely, we show that every surjective transformation which preserves the unit n-distance in both directions (n≥ 2) is automatically an n-isometry.