[/ Copyright (c) 2019 Nick Thompson Copyright (c) 2019 Paul A. Bristow Use, modification and distribution are subject to the Boost Software License, Version 1.0. (See accompanying file LICENSE_1_0.txt or copy at http://www.boost.org/LICENSE_1_0.txt) ] [section:wavelet_transforms Wavelet Transforms] [heading Synopsis] ``` #include namespace boost::math::quadrature { template class daubechies_wavelet_transform { public: daubechies_wavelet_transform(F f, int grid_refinements = -1, Real tol = 100*std::numeric_limits::epsilon(), int max_refinements = 12) {} daubechies_wavelet_transform(F f, boost::math::daubechies_wavelet wavelet, Real tol = 100*std::numeric_limits::epsilon(), int max_refinements = 12); auto operator()(Real s, Real t)->decltype(std::declval()(std::declval())) const; }; } ``` The wavelet transform of a function /f/ with respect to a wavelet \u03C8 is [$../graphs/wavelet_transform_definition.svg] For compactly supported Daubechies wavelets, the bounds can always be taken as finite, and we have [$../graphs/daubechies_wavelet_transform_definition.svg] which also defines the /s/=0 case. The code provided by Boost merely forwards a lambda to the trapezoidal quadrature routine, which converges quickly due to the Euler-Maclaurin summation formula. However, the convergence is not as rapid as for infinitely differentiable functions, so the default tolerances are modified. A basic usage is auto psi = daubechies_wavelet(); auto f = [](double x) { return sin(1/x); }; auto Wf = daubechies_wavelet_transform(f, psi); double w = Wf(0.8, 7.2); An image from this function is shown below. [$../graphs/scalogram_sin1t_light.png] [endsect] [/section:wavelet_transforms]