Can anyone recommend a good reference for second kind Chebyshev wavelets?

I want to know how can generate them by a mother wavelet and that how they can form a (orthonormal) basis for the space $L^2 (\mathbb{R})$.

Thanks in advance.

  • $\begingroup$ Have you taken a first course in Fourier Analysis and then maybe one in Discrete Wavelet Transforms? Otherwise course literature for such courses could be useful. $\endgroup$ – mathreadler May 6 '19 at 12:47
  • $\begingroup$ @mathreadler Unfortunately no. Thanks for your help. $\endgroup$ – M.Ramana May 6 '19 at 17:12
  • $\begingroup$ You can take a look here hindawi.com/journals/amp/2013/482083 it is free to read. You probably won't get everything without some Transform Theory course, but they at least explain how to achually build the transform matrices. $\endgroup$ – mathreadler May 7 '19 at 8:27
  • $\begingroup$ @mathreadler You are right.Thank you very much for the comment and the paper. $\endgroup$ – M.Ramana May 7 '19 at 16:17

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