Linear orthogonality preservers of Hilbert $C^*$-modules over $C^*$-algebras with real rank zero

TL;DR

This paper characterizes linear orthogonality-preserving maps between Hilbert modules over $C^*$-algebras with real rank zero, showing they are scalar multiples of isometries under certain conditions.

Contribution

It proves that such maps are scalar multiples of isometries with a central positive multiplier, extending previous results to unbounded and local maps over specific $C^*$-algebras.

Findings

Existence of a central positive multiplier $u$ such that $< heta(x), heta(y)> = u < x, y>$

Results hold for unbounded $A$-module maps and local maps in specific algebra classes

Generalizes orthogonality-preserving map characterization to broader algebraic contexts

Abstract

Let $A$ be a $C^*$-algebra. Let $E$ and $F$ be Hilbert $A$-modules with $E$ being full. Suppose that $\theta : E\to F$ is a linear map preserving orthogonality, i.e., $<\theta(x), \theta(y) > = 0$ whenever $<x, y > = 0$. We show in this article that if, in addition, $A$ has real rank zero, and $\theta$ is an $A$-module map (not assumed to be bounded), then there exists a central positive multiplier $u\in M(A)$ such that $<\theta(x), \theta(y) > = u < x, y>$ ($x,y\in E$). In the case when $A$ is a standard $C^*$-algebra, or when $A$ is a $W^*$-algebra containing no finite type II direct summand, we also obtain the same conclusion with the assumption of $\theta$ being an $A$-module map weakened to being a local map.