Bandt, Christoph (ed.); Barnsley, Michael (ed.); Devaney, Robert (ed.); Falconer, Kenneth J. (ed.); Kannan, V. (ed.); Vinod Kumar, P. B. (ed.) Fractals, wavelets, and their applications. Contributions from the international conference and workshop on fractals and wavelets, Kerala, India, November 9–12, 2013. (English) Zbl 1300.28001 Springer Proceedings in Mathematics & Statistics 92. Cham: Springer (ISBN 978-3-319-08104-5/hbk; 978-3-319-08105-2/ebook). xii, 508 p. (2014). Show indexed articles as search result. The articles of this volume will be reviewed individually.Indexed articles:Bandt, Christoph, Introduction to fractals, 3-19 [Zbl 1317.28007]Bandt, Christoph, Geometry of self-similar sets, 21-36 [Zbl 1317.28008]Sutherland, Scott, An introduction to Julia and Fatou sets, 37-60 [Zbl 1346.37002]Devaney, Robert L., Parameter planes for complex analytic maps, 61-77 [Zbl 1346.37001]Barnsley, Michael F.; Harding, Brendan; Rypka, Miroslav, Measure preserving fractal homeomorphisms, 79-102 [Zbl 1317.28009]Simon, Károly, The dimension theory of almost self-affine sets and measures, 103-127 [Zbl 1379.37058]Urbański, Mariusz, Countable alphabet non-autonomous self-affine sets, 129-145 [Zbl 1317.28022]Tetenov, Andrey, On transverse hyperplanes to self-similar Jordan arcs, 147-156 [Zbl 1317.28021]Uthayakumar, R.; Gowrisankar, A., Fractals in product fuzzy metric space, 157-164 [Zbl 1317.26024]Uthayakumar, R.; Devi, A. Nalayini, Some properties on Koch curve, 165-173 [Zbl 1317.28023]Simon, Károly; Vágó, Lajos, Projections of Mandelbrot percolation in higher dimensions, 175-190 [Zbl 1317.28006]Duy, Mai The, Some examples of finite type fractals in three-dimensional space, 191-201 [Zbl 1317.28012]Minirani, S.; Mathew, Sunil, Fractals in partial metric spaces, 203-215 [Zbl 1317.28017]Christensen, Ole, Frames and extension problems. I, 219-234 [Zbl 1334.42063]Christensen, Ole; Kim, Hong Oh; Kim, Rae Young, Frames and extension problems. II, 235-243 [Zbl 1334.42064]Massopust, Peter R., Local fractal functions and function spaces, 245-270 [Zbl 1317.28016]Navascués, M. A.; Sebastián, M. V., Some historical precedents of the fractal functions, 271-282 [Zbl 1317.28018]Chand, A. K. B.; Viswanathan, P.; Navascués, M. A., A new class of rational quadratic fractal functions with positive shape preservation, 283-301 [Zbl 1317.28010]Singh, Divya, Interval wavelet sets determined by points on the circle, 303-317 [Zbl 1322.42048]Mubeen, M.; Narayanan, V., Inverse representation theorem for matrix polynomials and multiscaling functions, 319-339 [Zbl 1316.42044]Devaraj, P.; Yugesh, S., A remark on reconstruction of splines from their local weighted average samples, 341-348 [Zbl 1317.42025]Chand, A. K. B.; Vijender, N., \(\mathcal{C}^{1}\)-rational cubic fractal interpolation surface using functional values, 349-367 [Zbl 1317.65051]Viswanathan, P.; Chand, A. K. B., On fractal rational functions, 369-382 [Zbl 1317.28024] MSC: 28-06 Proceedings, conferences, collections, etc. pertaining to measure and integration 42-06 Proceedings, conferences, collections, etc. pertaining to harmonic analysis on Euclidean spaces 28A80 Fractals 42C40 Nontrigonometric harmonic analysis involving wavelets and other special systems 65T60 Numerical methods for wavelets 81Q35 Quantum mechanics on special spaces: manifolds, fractals, graphs, lattices 00B25 Proceedings of conferences of miscellaneous specific interest PDFBibTeX XMLCite \textit{C. Bandt} (ed.) et al., Fractals, wavelets, and their applications. Contributions from the international conference and workshop on fractals and wavelets, Kerala, India, November 9--12, 2013. Cham: Springer (2014; Zbl 1300.28001) Full Text: DOI