6533b7dbfe1ef96bd126ff4b

RESEARCH PRODUCT

Partial {$*$}-algebras of closable operators. I. The basic theory and the abelian case

Jean Pierre AntoineAtshushi InoueCamillo Trapani

subject

Semi-elliptic operatorAlgebraPure mathematicssymbols.namesakeGeneral MathematicsBounded functionClosure (topology)Hilbert spacesymbolsAbelian groupCentralizer and normalizerMathematicsSymmetric operator

description

This paper, the first of two, is devoted to a systematic study of partial *-algebras of closable operators in a Hilbert space (partial Op*-algebras). After setting up the basic definitions, we describe canonical extensions of partial Op*-algebras by closure and introduce a new bounded commutant, called quasi-weak. We initiate a theory of abelian partial *-algebras. As an application, we analyze thoroughly the partial Op*-algebras generated by a single closed symmetric operator.

yearjournalcountryeditionlanguage
1990-01-01Publications of the Research Institute for Mathematical Sciences
https://doi.org/10.2977/prims/1195171084