Hadamard product of bases of polynomials in clifford analysis

## Communicated by K. Gürlebeck Convergence properties of hypercomplex derivative bases of special monogenic polynomials are studied. These new results extend and improve a lot of known works from the complex case to Clifford setting.

## Communicated by K. Guerlebeck An explicit algorithmic construction is given for orthogonal bases for spaces of homogeneous polynomials, in the context of Hermitean Clifford analysis, which is a higher dimensional function theory centered around the simultaneous null solutions of two Hermitean c

A real polynomial is asymptotically stable when all of its zeros lie in the open Ž . left half of the complex plane. We show that the Hadamard coefficient-wise product of two stable polynomials is again stable, improving upon some known results. Via the associated Hurwitz matrices we find another ex

It is shown that the integral representation of the Hadamard product operation of coef;fieient-wise multiplication of two polynomials, recently proved to keep the Hurwitz property invariant, provides interesting links to results in linear time-invariant discrete-time system theory. It is also pointe