English

Resolution of the Wavefront Set using Continuous Shearlets

Functional Analysis 2007-05-23 v1 Analysis of PDEs

Abstract

It is known that the continuous wavelet transform of a function ff decays very rapidly near the points where ff is smooth, while it decays slowly near the irregular points. This property allows one to precisely identify the singular support of ff. However, the continuous wavelet transform is unable to provide additional information about the geometry of the singular points. In this paper, we introduce a new transform for functions and distributions on R2\R^2, called the Continuous Shearlet Transform. This is defined by SHf(a,s,t)=\ipfψast\mathcal{S}\mathcal{H}_f(a,s,t) = \ip{f}{\psi_{ast}}, where the analyzing elements ψast\psi_{ast} are dilated and translated copies of a single generating function ψ\psi and, thus, they form an affine system. The resulting continuous shearlets ψast\psi_{ast} are smooth functions at continuous scales a>0a >0, locations tR2t \in \R^2 and oriented along lines of slope sRs \in \R in the frequency domain. The Continuous Shearlet Transform transform is able to identify not only the location of the singular points of a distribution ff, but also the orientation of their distributed singularities. As a result, we can use this transform to exactly characterize the wavefront set of ff.

Keywords

Cite

@article{arxiv.math/0605375,
  title  = {Resolution of the Wavefront Set using Continuous Shearlets},
  author = {Gitta Kutyniok and Demetrio Labate},
  journal= {arXiv preprint arXiv:math/0605375},
  year   = {2007}
}

Comments

31 pages, 1 figure