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Constructing pairs of dual bandlimited frame wavelets in $L^2(\mathbb{R}^n)$

Given a real, expansive dilation matrix we prove that any bandlimited function $ψ\in L^2(\mathbb{R}^n)$, for which the dilations of its Fourier transform form a partition of unity, generates a wavelet frame for certain translation lattices. Moreover, there exists a dual wavelet frame generated by a finite linear combination of dilations of $ψ$ with explicitly given coefficients. The result allows a simple construction procedure for pairs of dual wavelet frames whose generators have compact support in the Fourier domain and desired time localization. The construction relies on a technical condition on $ψ$, and we exhibit a general class of function satisfying this condition.