A mapping defined by the Schur-Szego composition

Abstract

Each degree n+k polynomial of the form (x+1)k(xn+c1xn-1+·s +cn), k∈ N, is representable as Schur-Szego composition of n polynomials of the form (x+1)n+k-1(x+aj). We study properties of the affine mapping n,k~:~(c1,… ,cn) (σ 1, … ,σ n), where σ i are the elementary symmetric polynomials of the numbers aj. We study also properties of a similar mapping for functions of the form exP, where P is a polynomial, P(0)=1, and we extend the Descartes rule to them.