Construction of irregular complete interpolation sets for shift-invariant spaces

Abstract

For several shift-invariant spaces, there exists a real number a∈R such that the set a+Z is a complete interpolation set. In this paper, we characterize the complete interpolation property of the set (a+N0)(α+a+N-) for shift-invariant spaces using Toeplitz operators. Using this characterization, we determine all α for which the sample set N0α+N- forms a complete interpolation set for transversal-invariant spaces. We introduce a new recurrence relation for exponential splines, examines the zeros of these splines, and explores the zero-free region of the doubly infinite Lerch zeta function. Consequently, we demonstrate that m2+N0α+m2+N- is a complete interpolation set for a shift-invariant spline space of order m≥ 2 if and only if |α|<1/2.