Zeros of a table of polynomials satisfying a four-term contiguous relation

Abstract

For any A(z),B(z),C(z)∈C[z], we study the zero distribution of a table of polynomials \ Pm,n(z)\ m,n∈N0 satisfying the recurrence relation \[ Pm,n(z)=A(z)Pm-1,n(z)+B(z)Pm,n-1(z)+C(z)Pm-1,n-1(z) \] with the initial condition P0,0(z)=1 and P-m,-n(z)=0 ∀ m,n∈N. We show that the zeros of Pm,n(z) lie on a curve whose equation is given explicitly in terms of A(z),B(z), and C(z). We also study the zero distribution of a case with a general initial condition.