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A two-scale difference equation is a functional equation of the form f (x) = ₍ = ₀N cₙ f (x - ₙ), where > 1 and ₀ < ₁ < < ₙ, are real constants, and cₙ are complex constants. Solutions of such equations arise in spline theory, in interpolation schemes for constructing curves, in constructing wavelets of compact support, in constructing fractals, and in probability theory. This paper studies the existence and uniqueness of L¹ -solutions to such equations. In particular, it characterizes L¹ -solutions having compact support. A time-domain method is introduced for studying the special case of such equations where \ {, ₀, , ₙ \} are integers, which are called lattice two-scale difference equations. It is shown that if a lattice two-scale difference equation has a compactly supported solution in Cᵐ (R), then m < { (ₙ - ₀) / (- 1) } - 1.
Daubechies et al. (Sun,) studied this question.
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