On the stability of transformations between power and Bernstein polynomial forms

A scheme for constructing orthogonal systems of bivariate polynomials in the Bernstein-Bézier form over triangular domains is formulated. The orthogonal basis functions have a hierarchical ordering by degree, facilitating computation of least-squares approximations of increasing degree (with permane

In this paper, Schur stability for a linear combination of polynomials is studied. In order to investigate this stability, we first study some important properties of the transformation matrix derived by using the bilinear transformation. And then, under certain assumptions, necessary and sufficient

## Abstract Let __Z__~α~ be a positive α‐stable random variable and \documentclass{article}\usepackage{amssymb}\begin{document}\pagestyle{empty}$r\in {\mathbb {R}}.$\end{document} We show the existence of an unbounded open domain __D__ in [1/2, 1] × ( − ∞, −1/2] with a cusp at (1/2, −1/2), characte