On Commutants of Symmetric Operators and O*-Algebras

## Abstract This relationship between the weak and strong bounded commutants of a symmetric operator __S__ and the commutant of a generalized spectral family (in Naimark's sense) of __S__ is studied. A characterization of the existence of self‐adjoint extensions of __S__ via von Neumann subalgebras

Extensive development of noncommutative geometry requires elaboration of the theory of differential Banach \*-algebras, that is, dense \*-subalgebras of C\*-algebras whose properties are analogous to the properties of algebras of differentiable functions. We consider a specific class of such algebra

We define a new action of the symmetric group and its Hecke algebra on polynomial rings whose invariants are exactly the quasi-symmetric polynomials. We interpret this construction in terms of a Demazure character formula for the irreducible polynomial modules of a degenerate quantum group. We use t

## Dedicated to A. Uhhnann i n h o r a o e c r of his eixtkth birthday and a. La8m.e~ in hollour of hi8 fiftieth birthday By E. SOHOLZ and W. TIMMEBMANN of Dresden