Wavelet frames on Vilenkin groups and their approximation properties Y Farkov, E Lebedeva, M Skopina International Journal of Wavelets, Multiresolution and Information …, 2015 | 49 | 2015 |

Computational implementation of the inverse continuous wavelet transform without a requirement of the admissibility condition EB Postnikov, EA Lebedeva, AI Lavrova Applied Mathematics and Computation 282, 128-136, 2016 | 35 | 2016 |

On alternative wavelet reconstruction formula: a case study of approximate wavelets EA Lebedeva, EB Postnikov Royal Society Open Science 1 (2), 140124, 2014 | 23 | 2014 |

Periodic wavelet frames and time–frequency localization EA Lebedeva, J Prestin Applied and Computational Harmonic Analysis 37 (2), 347-359, 2014 | 15 | 2014 |

Uncertainty principle for the Cantor dyadic group AV Krivoshein, EA Lebedeva Journal of Mathematical Analysis and Applications 423 (2), 1231-1242, 2015 | 14 | 2015 |

Decomposition of strong nonlinear oscillations via modified continuous wavelet transform EB Postnikov, EA Lebedeva Physical Review E 82 (5), 057201, 2010 | 13 | 2010 |

Meyer wavelets with least uncertainty constant. E Lebedeva, V Protasov Mathematical Notes 84, 2008 | 12 | 2008 |

On a connection between nonstationary and periodic wavelets EA Lebedeva Journal of Mathematical Analysis and Applications 451 (1), 434-447, 2017 | 11 | 2017 |

Minimization of the uncertainty constant of the family of Meyer wavelets EA Lebedeva Mathematical Notes 81, 489-495, 2007 | 6 | 2007 |

The Cascade Hilbert-Zero Decomposition: A Novel Method for Peaks Resolution and Its Application to Raman Spectra EB Postnikov, EA Lebedeva, AY Zyubin, AI Lavrova Mathematics 9 (21), 2802, 2021 | 5 | 2021 |

Walsh and wavelet methods for differential equations on the Cantor group E Lebedeva, M Skopina Journal of Mathematical Analysis and Applications 430 (2), 593-613, 2015 | 5 | 2015 |

Uncertainty constants and quasispline wavelets EA Lebedeva Applied and Computational Harmonic Analysis 30 (2), 214-230, 2011 | 5 | 2011 |

Exponentially decaying wavelets with uncertainty constants uniformly bounded with respect to the smoothness parameter EA Lebedeva Siberian Mathematical Journal 49 (3), 457-473, 2008 | 5 | 2008 |

On the uncertainty principle for Meyer wavelet functions EA Lebedeva Journal of Mathematical Sciences 182 (5), 656-663, 2012 | 4 | 2012 |

An inequality for a periodic uncertainty constant EA Lebedeva Applied and Computational Harmonic Analysis 42 (3), 536-549, 2017 | 2 | 2017 |

A directional uncertainty principle for periodic functions A Krivoshein, E Lebedeva, J Prestin Multidimensional Systems and Signal Processing, 1-27, 2017 | 2 | 2017 |

Localization of functions defined on cantor group AV Krivoshein, EA Lebedeva AIP Conference Proceedings 1558 (1), 711-714, 2013 | 2 | 2013 |

Wavelet frames with matched masks EA Lebedeva Journal of Mathematical Sciences 266 (6), 886-891, 2022 | 1 | 2022 |

Approximation Properties of Systems of Periodic Wavelets on the Cantor Group. EA Lebedeva Journal of Mathematical Sciences 244 (4), 2020 | 1 | 2020 |

Minimization of a constant of uncertainty for the Meyer wavelet basis EA Lebedeva, EB Postnikov Sampling Theory in Signal and Image Processing 5, 341-348, 2006 | 1 | 2006 |