Bounded approximate identities, factorization, and a convolution algebra

We show that every closed ideal of a Segal algebra on a compact group admits a central approximate identity which has the property, called condition (U), that the induced multiplication operators converge to the identity operator uniformly on compact sets of the ideal. This result extends a known on

Using the trivial observation that one can get polynomial identities on \(R\) from the ones of \(M_{k}(R)\) we derive from the Amitsur-Levitzki theorem a subset of the identities on \(n \times n\) matrices, obtained recently by Szigeti, Tuza, and Révész starting from directed Eulerian graphs, which

The Gelfand transform is used to reduce the Wiener-Hopf factorization of a class of n x n matrix-valued functions to that of a scalar function. The complete factorization is obtained, including the partial indices.

## Abstract We give conditions for the convergence of approximate identities, both pointwise and in norm, in variable __L__ ^__p__^ spaces. We unify and extend results due to Diening [8], Samko [18] and Sharapudinov [19]. As applications, we give criteria for smooth functions to be dense in the va

The purpose of this paper is to obtain necessary and sufficient conditions for maximum defect spline approximation methods with uniform meshes to be stable. The methods are applied to operators belonging to the closed subalgebra of L(L 2 (IR)) generated by operators of multiplication by piecewise co