On Certain Binary Functions in Operator Algebras

We show that any weakly closed algebra of bounded operators acting on a Banach space and different from the algebra of all bounded operators admits positive vector-functionals continuous in the essential operator norm. ᮊ 2000

## Operator-valued functions of the form compact-valued and holomorphic on certain domains ⍀ ; ‫ރ‬ are considered in separable Hilbert space. Assuming that the resolvent of A is compact, its eigenvalues are simple and the corresponding eigenvectors form a Riesz basis for H H of finite defect, it i

Several universal approximation and universal representation results are known for non-Boolean multivalued logics such as fuzzy logics. In this paper, we show that similar results can be proven for multivalued Boolean logics as well.

Kaplansky density theorem is extremely useful in dealing with \* -algebras of operators. This theorem says that if is a C \* -algebra of B(H) with a strong closure , then the unit ball 1 of is strongly dense in the unit ball 1 of . Many deep results for the operator algebra are deduced with this tec