Phase-isometries on real normed spaces

Abstract

We say that a mapping f: X → Y between two real normed spaces is a phase-isometry if it satisfies the functional equation eqnarray* \\|f(x)+f(y)\|, \|f(x)-f(y)\|\=\\|x+y\|, \|x-y\|\ (x,y∈ X).eqnarray* A generalized Mazur-Ulam question is whether every surjective phase-isometry is a multiplication of a linear isometry and a map with range \-1, 1\. This assertion is also an extension of a fundamental statement in the mathematical description of quantum mechanics, Wigner's theorem to real normed spaces. In this paper, we show that for every space Y the problem is solved in positive way if X is a smooth normed space, an L∞()-type space or an 1()-space with being an index set.