Autor:	Frank, Michael, Mishchenko, Alexander S., Pavlov, Alexander A.
Rok vydání:	2009
Předmět:	Mathematics - Operator Algebras Mathematics - Functional Analysis 46L08 42C15 42C40
Druh dokumentu:	Working Paper
Popis:	We investigate orthonormality-preserving, C-conformal and conformal module mappings on Hilbert C-modules to obtain their general structure. Orthogonality-preserving bounded module maps T act as a multiplication by an element \lambda of the center of the multiplier algebra of the C-algebra of coefficients combined with an isometric module operator as long as some polar decomposition conditions for the specific element \lambda are fulfilled inside that multiplier algebra. Generally, T always fulfils the equality $ = \| \lambda \|^2 < x,y>$ for any elements x,y of the Hilbert C-module. At the contrary, C-conformal and conformal bounded C-linear mappings are shown to be only the positive real multiples of isometric module operators. Comment: 13 pages / Thm. 1.3, second paragraph of proof - corrected, minor changes of formulations in the text, references updated
Databáze:	arXiv
Externí odkaz:	http://arxiv.org/abs/0907.2983 Zobrazit plný text záznamu View this record from Arxiv