Continuous Shearlet Frames and Resolution of the Wavefront Set

Abstract

In recent years directional multiscale transformations like the curvelet- or shearlet transformation have gained considerable attention. The reason for this is that these transforms are - unlike more traditional transforms like wavelets - able to efficiently handle data with features along edges. The main result in [G. Kutyniok, D. Labate. Resolution of the Wavefront Set using continuous Shearlets, Trans. AMS 361 (2009), 2719-2754] confirming this property for shearlets is due to Kutyniok and Labate where it is shown that for very special functions with frequency support in a compact conical wegde the decay rate of the shearlet coefficients of a tempered distribution f with respect to the shearlet can resolve the Wavefront Set of f. We demonstrate that the same result can be verified under much weaker assumptions on , namely to possess sufficiently many anisotropic vanishing moments. We also show how to build frames for L2(R2) from any such function. To prove our statements we develop a new approach based on an adaption of the Radon transform to the shearlet structure.