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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
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