Variational image restoration by means of wavelets: Simultaneous decomposition, deblurring, and denoising I Daubechies, G Teschke Applied and Computational Harmonic Analysis 19 (1), 1-16, 2005 | 209 | 2005 |

Generalized sampling and infinite-dimensional compressed sensing B Adcock, AC Hansen Foundations of Computational Mathematics 16 (5), 1263-1323, 2016 | 171 | 2016 |

Shearlet coorbit spaces and associated Banach frames S Dahlke, G Kutyniok, G Steidl, G Teschke Applied and Computational Harmonic Analysis 27 (2), 195-214, 2009 | 163 | 2009 |

The uncertainty principle associated with the continuous shearlet transform S Dahlke, G Kutyniok, P Maass, C Sagiv, HG Stark, G Teschke International Journal of Wavelets, Multiresolution and Information …, 2008 | 145 | 2008 |

Iteratively solving linear inverse problems under general convex constraints I Daubechies, G Teschke, L Vese Inverse Problems & Imaging 1 (1), 29, 2007 | 133 | 2007 |

A Tikhonov-based projection iteration for nonlinear ill-posed problems with sparsity constraints R Ramlau, G Teschke Numerische Mathematik 104 (2), 177-203, 2006 | 120 | 2006 |

Shearlet coorbit spaces: compactly supported analyzing shearlets, traces and embeddings S Dahlke, G Steidl, G Teschke Journal of Fourier Analysis and Applications 17 (6), 1232-1255, 2011 | 113 | 2011 |

The continuous shearlet transform in arbitrary space dimensions S Dahlke, G Steidl, G Teschke Journal of Fourier Analysis and Applications 16 (3), 340-364, 2010 | 113 | 2010 |

Accelerated projected steepest descent method for nonlinear inverse problems with sparsity constraints G Teschke, C Borries Inverse Problems 26 (2), 025007, 2010 | 66 | 2010 |

Coorbit spaces and Banach frames on homogeneous spaces with applications to the sphere S Dahlke, G Steidl, G Teschke Advances in Computational Mathematics 21 (1), 147-180, 2004 | 65 | 2004 |

Compressive sensing principles and iterative sparse recovery for inverse and ill-posed problems E Herrholz, G Teschke Inverse Problems 26 (12), 125012, 2010 | 64 | 2010 |

Tikhonov replacement functionals for iteratively solving nonlinear operator equations R Ramlau, G Teschke Inverse Problems 21 (5), 1571, 2005 | 63 | 2005 |

Multi-frame representations in linear inverse problems with mixed multi-constraints G Teschke Applied and Computational Harmonic Analysis 22 (1), 43-60, 2007 | 60 | 2007 |

Generalized coorbit theory, Banach frames, and the relation to α‐modulation spaces S Dahlke, M Fornasier, H Rauhut, G Steidl, G Teschke Proceedings of the London Mathematical Society 96 (2), 464-506, 2008 | 58 | 2008 |

Inversion of the noisy Radon transform on SO (3) by Gabor frames and sparse recovery principles P Cerejeiras, M Ferreira, U Kähler, G Teschke Applied and Computational Harmonic Analysis 31 (3), 325-345, 2011 | 53 | 2011 |

Wavelet based methods for improved wind profiler signal processing V Lehmann, G Teschke Annales Geophysicae 19 (8), 825-836, 2001 | 52 | 2001 |

An iterative algorithm for nonlinear inverse problems with joint sparsity constraints in vector-valued regimes and an application to color image inpainting G Teschke, R Ramlau Inverse Problems 23 (5), 1851, 2007 | 48 | 2007 |

Wavelet-based image decomposition by variational functionals I Daubechies, G Teschke Wavelet Applications in Industrial Processing 5266, 94-105, 2004 | 47 | 2004 |

Weighted coorbit spaces and Banach frames on homogeneous spaces S Dahlke, G Steidl, G Teschke Journal of Fourier Analysis and Applications 10 (5), 507-539, 2004 | 39 | 2004 |

Generalized sampling: stable reconstructions, inverse problems and compressed sensing over the continuum B Adcock, A Hansen, B Roman, G Teschke Advances in imaging and electron physics 182, 187-279, 2014 | 38 | 2014 |