Zeros of linear combinations of Laguerre polynomials

Abstract

We study the number of real zeros of finite combinations of K+1 consecutive normalized Laguerre polynomials of the form qn(x)=Σj=0Kγj Lαn-j(x), n K, where γj, j=0,·s ,K, are real numbers with γ0=1, γK =0. We consider four different normalizations of Laguerre polynomials: the monic Laguerre polynomials Lnα, the polynomials Lnα=n!Lnα/(1+α)n (so that Lnα(0)=1), the standard Laguerre polynomials (Lnα)n and the Brenke normalization Lnα/(1+α)n. We show the key role played by the polynomials Q(x)=Σj=0K(-1)jγj(x)K-j and P(x)=Σj=0KγjxK-j to solve this problem: Q in the first case and P in the second, third and forth cases. In particular, in the first case, if all the zeros of the polynomial Q are real and less than α+1, then all the zeros of qn, n K, are positive. In the other cases, if all the zeros of P are real then all the zeros of qn, n K, are also real. If P has m>1 non-real zeros, there are important differences between the four cases. For instance in the first case, qn has still only real zeros for n big enough, but in the fourth case qn has exactly m non-real zeros for n big enough.