Characterization of general tight wavelet frames with matrix dilations and tightness preserving oversampling (Q1601991)

Let \(A\) be a \(d\times d\) dilation matrix (i.e., a matrix for which all eigenvalues have absolute value greater than one) and \(B\) a nonsingular \(d\times d\) matrix. Given a finite collection of functions \(\psi_1,\dots, \psi_n\in L^2(R^d)\) the authors consider the wavelet system consisting of all functions \[ \psi_{l,j,k}(x)= |\text{det } A|^{j/2}\psi_l(A^jx-Bk), \;j\in Z, k\in Z^d, 1=1, \dots, L. \] The main results characterize dual wavelet frames of this type and tight frames. As an application the Second Oversampling Theorem by Chui and Shi is generalized.