Accession Number : AD0662707
Title : UNBOUNDED NORMAL OPERATORS ON BANACH SPACES.
Descriptive Note : Technical summary rept.,
Corporate Author : WISCONSIN UNIV MADISON MATHEMATICS RESEARCH CENTER
Personal Author(s) : Palmer,Theodore W.
Report Date : SEP 1967
Pagination or Media Count : 57
Abstract : The theory of unbounded maximal normal operators on Hilbert space, developed by von Neumann and Stone, is generalized to complex Banach spaces. Although defined by algebraic properties, the normal operators introduced here are closely related to the unbounded spectral operators of scalar type introduced by Bade and to a generalization of those operators defined here. (Author)
Descriptors : (*OPERATORS(MATHEMATICS), BANACH SPACE), (*FUNCTIONAL ANALYSIS, THEOREMS), HILBERT SPACE, THESES, SET THEORY, MAPPING(TRANSFORMATIONS), TOPOLOGY
Subject Categories : Theoretical Mathematics
Distribution Statement : APPROVED FOR PUBLIC RELEASE