DWT-References
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** David A. Huffman. [http://compression.ru/download/articles/huff/huffman_1952_minimum-redundancy-codes.pdf ''A Method for the Construction of Minimum-Redundancy Codes.''] Proceedings of the I.R.E., September 1952, pp. 1098–1101. | ** David A. Huffman. [http://compression.ru/download/articles/huff/huffman_1952_minimum-redundancy-codes.pdf ''A Method for the Construction of Minimum-Redundancy Codes.''] Proceedings of the I.R.E., September 1952, pp. 1098–1101. | ||
** Paul Penfield & Lloyd Seth. 6.050J Information and Entropy, Spring 2008. (MIT OpenCourseWare: Massachusetts Institute of Technology), http://ocw.mit.edu/courses/electrical-engineering-and-computer-science/6-050j-information-and-entropy-spring-2008 (Accessed 19 Aug, 2014). License: Creative Commons BY-NC-SAPaul Penfield. | ** Paul Penfield & Lloyd Seth. 6.050J Information and Entropy, Spring 2008. (MIT OpenCourseWare: Massachusetts Institute of Technology), http://ocw.mit.edu/courses/electrical-engineering-and-computer-science/6-050j-information-and-entropy-spring-2008 (Accessed 19 Aug, 2014). License: Creative Commons BY-NC-SAPaul Penfield. | ||
| − | ** Claude E. Shannon. [http:// | + | ** Claude E. Shannon. [http://www.math.harvard.edu/~ctm/home/text/others/shannon/entropy/entropy.pdf ''A Mathematical Theory of Communication.''] Bell System Technical Journal 27 (1948), pp. 379-423, pp. 623-656. |
** Warren Weaver. [http://helmut.knaust.info/class/201510_5311/Weaver.pdf Recent Contributions to the Mathematical Theory of Communication] (1948). | ** Warren Weaver. [http://helmut.knaust.info/class/201510_5311/Weaver.pdf Recent Contributions to the Mathematical Theory of Communication] (1948). | ||
Revision as of 19:36, 12 September 2019
- Discrete Wavelet Transforms
- Albert Boggess & Francis J. Narcowich. A First Course in Wavelets with Fourier Analysis. Prentice-Hall (2001).
- Ingrid Daubechies. Ten Lectures on Wavelets. Society for Industrial and Applied Mathematics (1992).
- Michael W. Frazier. An Introduction to Wavelets Through Linear Algebra. Springer-Verlag (2001).
- Barbara Burke Hubbard. The World According to Wavelets. AK Peters, 2nd ed. (1998)
- Arne Jensen & Anders la Cour-Harbo. Ripples in Mathematics: The Discrete Wavelet Transform. Springer-Verlag (2001).
- Stéphane Mallat. A Wavelet Tour of Signal Processing, Third Edition: The Sparse Way. Academic Press (2008).
- Yves Meyer. Ondelettes et opérateurs. Hermann (1990).
- Martin J. Mohlenkamp & María Cristina Pereyra. Wavelets, Their Friends, and What They Can Do for You. European Mathematical Society (2000).
- David K. Ruch & Patrick J. Van Fleet. Wavelet Theory: An Elementary Approach with Applications. Wiley (2010).
- Gilbert Strang. Wavelets and Dilation Equations: A Brief Introduction. SIAM Review, Vol. 31, No. 4. (1989), pp. 614-627.
- Gilbert Strang & Truong Nguyen. Wavelets and Filter Banks. Wellesley College, 2nd ed. (1996).
- Patrick Van Fleet. Discrete Wavelet Transformations: An Elementary Approach with Applications. Wiley (2008).
- David F. Walnut. An Introduction to Wavelet Analysis. Birkhäuser (2004).
- Filip Wasilewski. Wavelet Properties Browser.
- Fourier Analysis
- M.A. Al-Gwaiz. Sturm-Liouville Theory and its Applications. Springer-Verlag (2008).
- Rajendra Bhatia. Fourier Series. Mathematical Association of America (2004).
- Anton Deitmar. A First Course in Harmonic Analysis. Springer-Verlag, 2nd ed. (2005).
- Thomas W. Körner. Fourier Analysis. Cambridge University Press (1988).
- Kenneth A. Ross. A Trip from Classical to Abstract Fourier Analysis. Notices of the AMS 61 (2014), pp. 1032-1038.
- Digital Image Processing
- Rafael C. Gonzalez & Richard E. Woods. Digital Image Processing. Pearson, 3rd ed. (2008).
- Information Theory
- David A. Huffman. A Method for the Construction of Minimum-Redundancy Codes. Proceedings of the I.R.E., September 1952, pp. 1098–1101.
- Paul Penfield & Lloyd Seth. 6.050J Information and Entropy, Spring 2008. (MIT OpenCourseWare: Massachusetts Institute of Technology), http://ocw.mit.edu/courses/electrical-engineering-and-computer-science/6-050j-information-and-entropy-spring-2008 (Accessed 19 Aug, 2014). License: Creative Commons BY-NC-SAPaul Penfield.
- Claude E. Shannon. A Mathematical Theory of Communication. Bell System Technical Journal 27 (1948), pp. 379-423, pp. 623-656.
- Warren Weaver. Recent Contributions to the Mathematical Theory of Communication (1948).
- Mathematica
- Paul R. Wellin. Programming with Mathematica: An Introduction. Springer-Verlag (2013).
- Roozbeh Hazrat. Mathematica: A Problem-Centered Approach, Springer-Verlag (2010).
- Roman Maeder. Programming in Mathematica, Addison-Wesley, 2nd ed. (1991).
- Linear Algebra and Geometry
- Thomas Banchoff & John Wermer. Linear Algebra Through Geometry. Springer-Verlag, 2nd ed. (1992).
