Generation of invertible functions

In the field of data-based control system design, nonlinear parametric functions play a key role, in fitting sets of measured data. In many cases, one of the constraints one may wish to impose on the estimated function is the invertibility with respect to one input, a constraint typically hard to ha

As is well known, the finite distributions on Rn form an algebra t 5 ' with respect to the convolution-product ; DIRAC'S measure 6 is the unit of this algebra. We propose to determine the invertible elements in this algebra. The algebra &"(\*) is isomorphic to the algebra &(a') of the continuous l

A simple geometric method is outlined for the generation of real or complex reactance functions, in the frequency-plane, and in the unit-disk.

We will discuss invertibility of Toeplitz products T f T % g g ; for analytic f and g; on the Bergman space and the Hardy space. We will furthermore describe when these Toeplitz products are Fredholm.