Frames and Stable Bases for Shift-Invariant Subspaces of L₂(ℝ^d)

Roots of complex polynomials and Weyl-Heisenberg frame sets, The wavelet dimension function is the trace function of a shift-invariant system, One-Dimensional Dyadic Wavelets, Dual Gramian analysis: Duality principle and unitary extension principle, Gramian analysis of multivariate frame multiresolution analyses, Invariance of a shift-invariant space, On dual Gabor frame pairs generated by polynomials, Optimal shift invariant spaces and their Parseval frame generators, Maximum robustness and surgery of frames in finite dimensions, Generalized sampling in shift-invariant spaces with multiple stable generators, Partial Gabor frames and dual frames, A RANGE FUNCTION APPROACH TO SHIFT-INVARIANT SPACES ON LOCALLY COMPACT ABELIAN GROUPS, Characterization and perturbation of Gabor frame sequences with rational parameters, A pair of orthogonal frames, Extension of Shift-Invariant Systems inL²(ℝ) to Frames, Multidimensional periodic discrete wavelets, Convex potentials and optimal shift generated oblique duals in shift invariant spaces, Frames, modular functions for shift-invariant subspaces and FMRA wavelet frames, Spaces invariant under unitary representations of discrete groups, Dynamical sampling for shift-preserving operators, Univariate tight wavelet frames of minimal support, Frame multiresolution analysis on local fields of positive characteristic, Extra invariance of group actions, Pairwise orthogonal frames generated by regular representations of LCA groups, Frames generated by compact group actions, On Wilson Bases in $L^2(\mathbb{R}^d)$, On Various Levels of Linear Independence for Integer Translates of a Finite Number of Functions, On construction of periodic wavelet frames, Real-variable characterizations and their applications of matrix-weighted Besov spaces on spaces of homogeneous type, Characterizations of extra-invariant spaces under the left translations on a Lie group, Generalized frame operator, lower semiframes, and sequences of translates, The structure of shift-invariant subspaces of Sobolev spaces, Digital Gabor filters do generate MRA-based wavelet tight frames, Explicitly given pairs of dual frames with compactly supported generators and applications to irregular B-splines, Nonstationary frames of translates and frames from the Weyl–Heisenberg group and the extended affine group ^*, Discrete periodic multiresolution analysis, Stability of iterated dyadic filter banks, On sufficient frame conditions for periodic wavelet systems, Multiscaling frame multiresolution analysis and associated wavelet frames, Density in L2(Γ,μ) of Certain Families of Functions on LCA Groups Related to the Multi-Channel Sampling Problem, Operators commuting with a discrete subgroup of translations, SAMPLING EXPANSION IN SHIFT INVARIANT SPACES, New proof for Balian-Low theorem of nonlinear Gabor system, CHARACTERISATIONS OF PARTITION OF UNITIES GENERATED BY ENTIRE FUNCTIONS IN, Affine and quasi-affine frames for rational dilations, An approximation problem in multiplicatively invariant spaces, On characterizations of multiwavelets in $L^{2}(\mathbb {R}^n)$, Compactly supported tight affine spline frames in 𝐿₂(ℝ^{𝕕}), Digital Gabor filters with MRA structure, The structure of shift invariant spaces on a locally compact abelian group, Bases of translates and multiresolution analyses, Variation of Calderón–Zygmund operators with matrix weight, The Structure of Finitely Generated Shift-Invariant Subspaces in Super Hilbert Spaces, On frame wavelets associated with frame multiresolution analysis, Frames of periodic shift-invariant spaces, Weyl-Heisenberg frames, translation invariant systems and the Walnut representation, Riesz bases in \(L^{2}(0,1)\) related to sampling in shift-invariant spaces, Linear combinations of generators in multiplicatively invariant spaces, Wavelet frames and shift-invariant subspaces of periodic functions, Symmetric and antisymmetric tight wavelet frames, Dual frames in \(L^2(0,1)\) connected with generalized sampling in shift-invariant spaces, Characterization of the closedness of the sum of two shift-invariant spaces, Characterizations of biorthogonal wavelets which are associated with biorthogonal multiresolution analyses, Box spline prewavelets of small support, A class of bidimensional FMRA wavelet frames, Riesz sequences of translates and generalized duals with support on \([0,1\)], Co-compact Gabor systems on locally compact abelian groups, Duality for frames, Characterization of wavelets and MRA wavelets on local fields of positive characteristic, Local analysis of frame multiresolution analysis with a general dilation matrix, Linear independence of pseudo-splines, Poincare Inequalities and Neumann Problems for the p-Laplacian, PERTURBATION TECHNIQUES IN IRREGULAR SPLINE-TYPE SPACES, PERTURBATION TECHNIQUES IN IRREGULAR SPLINE-TYPE SPACES, Some equations relating multiwavelets and multiscaling functions, The infimum cosine angle between two finitely generated shift-invariant spaces and its applica\-tions, Perturbation of frame sequences in shift-invariant spaces, Minimal generator sets for finitely generated shift-invariant subspaces of \(L^{2}(\mathbb R^{n})\), A Characterization of Orthonormal Multilevel Wavelet Families in Sobolev Space over Local Fields of Positive Characteristic, \(\phi (L)\)-factorable operators on \(L^p(G)\) for a locally compact abelian group, Frame expansions for Gabor multipliers, Framelets: MRA-based constructions of wavelet frames, A frame theory of Hardy spaces with the quaternionic and the Clifford algebra settings, Tight frame approximation for multi-frames and super-frames, Pansharpening image fusion using cross-channel correlation: a framelet-based approach, The closedness of shift invariant subspaces in \(L^{p,q}(\mathbb{R}^{d+1})\), Analytic functions in local shift-invariant spaces and analytic limits of level dependent subdivision, System bandwidth and the existence of generalized shift-invariant frames, Extension principles for dual multiwavelet frames of \(L_2(\mathbb R^s)\) constructed from multirefinable generators, Frames of translates with prescribed fine structure in shift invariant spaces, Explicit construction of wavelet frames on locally compact abelian groups, Perturbation of frame sequences and its applications to shift-invariant spaces, Matrix \(\mathcal A_p\) weights, degenerate Sobolev spaces, and mappings of finite distortion, Gabor systems and almost periodic functions, Weyl-Heisenberg frames and Riesz bases in \(L_2(\mathbb{R}^d)\), Affine systems in \(L_ 2(\mathbb{R}^d)\): The analysis of the analysis operator, Poincaré inequalities and Neumann problems for the variable exponent setting, Affine systems in \(L_2(\mathbb{R}^d)\). II: Dual systems, Invariance of a shift-invariant space in several variables, Frame scaling function sets and frame wavelet sets in \(\mathbb{R}^d\), Discrete convolution operators and Riesz systems generated by actions of abelian groups, The structure of shift-modulation invariant spaces: the rational case, Dimension invariance of finite frames of translates and Gabor frames, On frame properties for Fourier-like systems, Modulation preserving operators on locally compact abelian groups, Riesz and frame systems generated by unitary actions of discrete groups, On Gabor frames generated by sign-changing windows and B-splines, On stability of finitely generated shift-invariant systems, The structure of translation-invariant spaces on locally compact abelian groups, Riesz wavelets and generalized multiresolution analyses., Orthogonal multiwavelet frames in \(L^2(\mathbb{R}^d)\), Surgery of spline-type and molecular frames, Topological and geometric properties of refinable functions and MRA affine frames, Generalized sampling in shift invariant spaces with frames, A unified characterization of reproducing systems generated by a finite family. II, The spectral function of shift-invariant spaces, Refinable functions for dilation families, Sufficient conditions for a multidimensional system of periodic wavelets to be a frame, Characterizations of irregular multigenerator Gabor frame on periodic subsets of \(\mathbb R\), Frames and oversampling formulas for band limited functions, Gabor windows supported on \([ - 1, 1\) and dual windows with small support], Linear independence of Parseval wavelets, Multiplication-invariant operators and the classification of LCA group frames, The structure of finitely generated shift-invariant subspaces on locally compact abelian groups, Oversampling, quasi-affine frames, and wave packets, Exponential bases, Paley-Wiener spaces and applications, Rates of convergence for the approximation of dual shift-invariant systems in \(\ell^2 (\mathbb{Z})\), Band-limited wavelets and framelets in low dimensions, Representations of almost-periodic functions using generalized shift-invariant systems in \(\mathbb{R}^{d}\), Operator-like wavelet bases of \(L_{2}(\mathbb{R}^{d})\), Local sampling and approximation of operators with bandlimited Kohn-Nirenberg symbols, Frame properties of wave packet systems in \(L^2({\mathbb R}^d)\), Approximation by partial isometries and symmetric approximation of finite frames, Sampling in unitary invariant subspaces associated to LCA groups, A note on constructing affine systems for \(L^2\), Affine dual frames and extension principles, From dual pairs of Gabor frames to dual pairs of wavelet frames and vice versa, Spectral models for orthonormal wavelets and multiresolution analysis of \(L^{2}(\mathbb R)\), Weyl-Heisenberg Riesz bases generated by two intervals, Exponential B-splines and the partition of unity property, Approximation orders of shift-invariant subspaces of \(W_{2}^{s}(\mathbb R^d)\), Translation preserving operators on locally compact abelian groups, Uncertainty principles for Fourier multipliers, Gabor windows supported on \([- 1, 1\) and construction of compactly supported dual windows with optimal smoothness], Uncertainty principles in finitely generated shift-invariant spaces with additional invariance, Kernels of Gramian operators for frames in shift-invariant subspaces, Shift-invariant spaces on LCA groups, On the spectrums of frame multiresolution analyses, Dimension functions of rationally dilated GMRAs and wavelets, Semiorthogonal multiresolution analysis frames in higher dimensions, Properties of dual pseudo-splines, Extra invariance of shift-invariant spaces on LCA groups, On stable refinable function vectors with arbitrary support, Internal structure of the multiresolution analyses defined by the unitary extension principle, Quasi-greedy systems of integer translates, The structure of finitely generated shift-invariant spaces in mixed Lebesgue spaces \(L^{p,q}\left( {\mathbb{R}}^{d+1}\right)\), Weighted irregular Gabor tight frames and dual systems using windows in the Schwartz class, Subspaces with extra invariance nearest to observed data, Structure of nonstationary Gabor frames and their dual systems, Diagonalization of shift-preserving operators, Spaces generated by orbits of unitary representations: a tribute to Guido Weiss, A necessary and sufficient condition for dual Weyl-Heisenberg frames to be compactly supported, Time frequency representations of almost periodic functions, Sum of disjoint frame sequences, Properties of oblique dual frames in shift-invariant systems, Frames associated with shift invariant spaces on positive half line, Frames of translates for model sets, Duals of frame sequences, Finite shift-invariant subspaces of periodic functions: characterization, approximation, and applications, Weak frames in Hilbert \(C^*\)-modules with application in Gabor analysis, Gabor windows supported on \([-1, 1\) and compactly supported dual windows], Sequence dominance in shift-invariant spaces, The Sobolev regularity of refinable functions, Linear combinations of frame generators in systems of translates, The structure of shift-invariant subspaces of \(L^2(\mathbb{R}^n)\), Wavelet decompositions of nonrefinable shift invariant spaces, Frame properties of shifts of prolate spheroidal wave functions, A unified characterization of reproducing systems generated by a finite family, The Zak transform and the structure of spaces invariant by the action of an LCA group