This volume contains the proceedings of the AMS Special Sessions on Frames, Wavelets and Gabor Systems and Frames, Harmonic Analysis, and Operator Theory, held from April 16-17, 2016, at North Dakota State University in Fargo, North Dakota.
The papers appearing in this volume cover frame theory and applications in three specific contexts: frame constructions and applications, Fourier and harmonic analysis, and wavelet theory.
P. G. Casazza, J. Cahill, J. I. Haas, and J. C. Tremain, Constructions of biangular tight frames and their relationships with equiangular tight frames S. Botelho-Andrade, P. G. Casazza, D. Cheng, J. Haas, T. T. Tran, J. C. Tremain, and Z. Xu, Phase retrieval by hyperplanes D. Ellis, E. Hayashi, and S. Li, Tight and full spark Chebyshev frames with real entries and worst-case coherence analysis R. Aceska, J.-L. Bouchot, and S. Li, Fusion frames and distributed sparsity M. Bownik, The Kadison-Singer problem A. G. Baskakov and I. A. Krishtal, Spectral properties of an operator polynomial with coefficients in a Banach algebra X. Chen, Kaczmarz algorithm, row action methods, and statistical learning algorithms R. Balan, M. Singh, and D. Zou, Lipschitz properties for deep convolutional networks M. Begue and K. A. Okoudjou, Invertibility of graph translation and support of Laplacian Fiedler vectors J.-P. Gabardo, Weighted convolution inequalities and Beurling density L. De Carli and P. Vellucci, $p$-Riesz bases in quasi shift invariant spaces D. E. Dutkay and I. Kraus, On spectral sets of integers I. Long, Spectral fractal measures associated to IFS's consisting of three contraction mappings J. E. Herr, P. E. T. Jorgensen, and E. S. Weber, A matrix characterization of boundary representations of positive matrices in the Hardy space M. Mohammad and E.-B. Lin, Gibbs effects using Daubechies and Coiflet tight framelet systems Y. H. Kim, Conditions on shape preserving of stationary polynomial reproducing subdivision schemes D. Alpay, P. E. T. Jorgensen, and I. Lewkowicz, $W$-Markov measures, transfer operators, wavelets and multiresolutions.