Continuity of Operators Intertwining with Convolution Operators

We derive asymptotic formulas for convolution operators with spline kernels for differentiable functions. These formulas are analogous to Bernstein's extension of Voronovskaya's results on Bernstein polynomials for functions with higher order derivatives. Two classes of operators are considered, viz

A theorem of Calderh-Vaillancourt type is obtained for a class of pseudodifferential IpLrbtors with operator -valued symbols, and strongly continuous (in general nonsmooth) groups # lrornorphisms involved in the symbol estimates. The theory of pseudodifferential operators on singular manifolds, i.

## Abstract We consider convolution type operators that carry a certain symmetry in their structure. The study is motivated by several applications in mathematical physics where this kind of operators appears. They can be regarded as a class of Wiener‐Hopf plus Hankel operators acting in spaces of

## Abstract The most natural and important topologies connected with hysteresis operators are those induced by uniform convergence, __W__^1, 1^‐convergence, and strict convergence. Indeed the supremum norm and the variation are invariant under reparameterization. We prove a general result that impl