On orthogonal Laurent polynomials related to the partial sums of power series

Abstract

Let f(z) = Σk=0∞ dk zk, dk∈C\ 0 \, d0=1, be a power series with a non-zero radius of convergence : 0 < ≤ +∞. Denote by fn(z) the n-th partial sum of f, and R2n(z) = f2n(z) zn , R2n+1(z) = f2n+1(z) zn+1 , n=0,1,2,.... By the result of Hendriksen and Van Rossum there exists a linear functional L on Laurent polynomials, such that L(Rn Rm) = 0, when n= m, while L(Rn2)= 0. We present an explicit integral representation for L in the above case of the partial sums. We use methods from the theory of generating functions. The case of finite systems of such Laurent polynomials is studied as well.