References
- Abramovich, F., and Silverman, B.W. (1998), ‘Wavelet Decomposition Approaches to Statistical Inverse Problems’, Biometrika, 85, 115–129.
- Adu, N., and Richardson, G. (2018), ‘Unit Root Test: Spatial Model with Long Memory Errors’, Statistics and Probability Letters, 140, 126–131.
- Antoniadis, A., Pensky, M., and Sapatinas, T. (2014), ‘Nonparametric Regression Estimation Based on Spatially Inhomogeneous Data: Minimax Global Convergence Rates and Adaptivity’, ESAIM: Probability and Statistics, 18, 1–41.
- Ayache, A., and Taqqu, M.S. (2002), ‘Rate Optimality of Wavelet Series Approximations of Fractional Brownian Motion’, Journal of Fourier Analysis and Applications, 9, 451–471.
- Benhaddou, R. (2017), ‘On Minimax Convergence Rates Under Lp-risk for the Anisotropic Functional Deconvolution Model’, Statistics and Probability Letters, 130, 120–125.
- Benhaddou, R. (2018), ‘Laplace Deconvolution with Dependent Errors: A Minimax Study’, Journal of Nonparametric Statistics, 30(4), 1032–1048.
- Benhaddou, R., Kulik, R., Pensky, M., and Sapatinas, T. (2014), ‘Multichannel Deconvolution with Long-range Dependence: A Minimax Study’, Journal of Statistical Planning and Inference, 148, 1–19.
- Benhaddou, R., Pensky, M., and Picard, D. (2013), ‘Anisotropic Denoising in Functional Deconvolution Model with Dimension-free Convergence Rates’, Electronic Journal of Statistics, 7, 1686–1715.
- Brown, L.D., and Low, M.G. (1996), ‘Asymptotic Equivalence of Nonparametric Regression and White Noise’, Annals of Statistics, 24(6), 2384–2398.
- Bunea, F., Tsybakov, A., and Wegkamp, M.H. (2007), ‘Aggregation for Gaussian Regression’, The Annals of Statistics, 35, 1674–1697.
- Cai, T.T., and Brown, L.D. (1998), ‘Wavelet Shrinkage for Nonequispaced Samples’, The Annals of Statistics, 26(5), 1783–1799.
- Comte, F., Dedecker, J., and Taupin, M.L. (2008), ‘Adaptive Density Deconvolution with Dependent Inputs’, Mathematical Methods of Statistics, 17, 87–112.
- Donoho, D.L. (1995), ‘Nonlinear Solution of Linear Inverse Problems by Wavelet-vaguelette Decomposition’, Applied and Computational Harmonic Analysis, 2, 101–126.
- Donoho, D.L., and Johnstone, I.M. (1994), ‘Ideal Spatial Adaptation by Wavelet Shrinkage’, Biometrika, 81, 425–456.
- Donoho, D.L., and Raimondo, M. (2004), ‘Translation Invariant Deconvolution in a Periodic Setting’, International Journal of Wavelets, Multiresolution and Information Processing, 2, 415–431.
- Dozzi, M. (1989), Stochastic Processes with a Multidimensional Parameter, New York: Longman Scientific & Technical.
- Fischer, R., and Akay, M. (1996), ‘A Comparison of Analytical Methods for the Study of Fractional Brownian Motion’, Annals of Biomedical Engineering, 24(4), 537–543.
- Hoffmann, M., and Reiss, M. (2008), ‘Nonlinear Estimation for Inverse Problems with Error in the Operator’, The Annals of Statistics, 36, 310–336.
- Huang, Z.Y., Li, C.J., Wan, J.P., and Wu, Y. (2006), ‘Fractional Brownian Motion and Sheet As White Noise Functionals’, Acta Mathematica Sinica, English Series, 22, 1183–1188.
- Johnstone, I.M., Kerkyacharian, G., Picard, D., and Raimondo, M. (2004), ‘Wavelet Deconvolution in a Periodic Setting’, Journal of the Royal Statistical Society, Series B, 66, 547–573. (with discussion, 627–657).
- Kamont, A. (1996), ‘On the Fractional Anisotropic Wiener Field’, Probability and Mathematical Statistics-PWN, 16, 85–98.
- Kulik, R., Sapatinas, T., and Wishart, J.R. (2015), ‘Multichannel Deconvolution with Long-range Dependence: Upper Bounds on the Lp-risk’, Applied and Computational Harmonic Analysis, 38, 357–384.
- Meyer, Y. (1990), Ondelettes et operateurs, Paris: Hermann.
- Meyer, Y., Sellan, F., and Taqqu, M.S. (1999), ‘Wavelets, Generalized White Noise and Fractional Integration: The Synthesis of Fractional Brownian Motion’, The Journal of Fourier Analysis and Applications, 5, 465–494.
- Painter, S., Paterson, L., and Beresford, G. (1995), ‘On the Distribution of the Reflection Coefficients and Seismic Amplitudes’, Geophysics, 60(4), 1187–1194.
- Pensky, M. (2013), ‘Spatially Inhomogeneous Linear Inverse Problems with Possible Singularities’, The Annals of Statistics, 41(5), 2668–2697.
- Pensky, M., and Sapatinas, T. (2009), ‘Functional Deconvolution in a Periodic Setting: Uniform Case’, The Annals of Statistics, 37, 73–104.
- Pensky, M., and Sapatinas, T. (2010), ‘On Convergence Rates Equivalency and Sampling Strategies in a Functional Deconvolution Model’, The Annals of Statistics, 38, 1793–1844.
- Pensky, M., and Sapatinas, T. (2011), ‘Multichannel Boxcar Deconvolution with Growing Number of Channels’, Electronic Journal of Statistics, 5, 53–82.
- Petsa, A., and Sapatinas, T. (2009), ‘Minimax Convergence Rates Under LP-risk in Functional Deconvolution Model’, Statistics and Probability Letters, 79, 1568–1576.
- Pilgram, B., and Kaplan, D.T. (1998), ‘A Comparison of Estimators for 1/f Noise’, Physica D. Nonlinear Phenomena, 114, 108–122.
- Pipiras, V., and Taqqu, M.S. (2002), ‘Deconvolution of Fractional Brownian Motion’, Journal of Time Series Analysis, 23, 487–501.
- Raimondo, M., and Stewart, T. (2007), ‘The WaveD Transform in R: Performs Fast Transaction-invariant Wavelet Deconvolution’, Journal of Statistical Software, 21, 1–27.
- Robinson, E.A. (1999), Seismic Inversion and Deconvolution: Part B: Dual-Sensor Technology, Oxford: Elsevier.
- Samko, S.G. (1998), ‘A New Approach to the Inversion of the Riesz Potential Operator’, Fractal Calculus and Applied Analysis, 1(3), 225–245.
- Samko, S.G., Kilbas, A.A., and Marichev, O.I. (1993), Fractional Integrals and Derivatives: Theory and Applications, London: Gordon and Breach Science Publishers.
- Stein, E.M. (1970), Singular Integrals and Differentiability Properties of Functions, Princeton Mathematical Series, No. 30, Princeton, NJ: Princeton University Press.
- Taqqu, M.S. (1975), ‘Weak Convergence to Fractional Brownian Motion and the Rosenblatt Process’, Probability Theory and Related Fields, 31(4), 287–302.
- Taqqu, M.S., Teverovsky, V., and Willinger, W. (1997), ‘Estimators for Long-range Dependence: An Empirical Study’, Fractals, 3(4), 785–798.
- Tsybakov, A.B. (2008), Introduction to Nonparametric Estimation, New York: Springer.
- Vivero, O., and Heath, P.W. (2012), ‘A Regularized Estimator for Long-range Dependent Processes’, Automatica, 48(2), 287–296.
- Walter, G., and Shen, X. (1999), ‘Deconvolution Using Meyer Wavelets’, Journal of Integral Equations and Applications, 11, 515–534.
- Wang, Y. (1996), ‘Functional Estimation Via Wavelets Shrinkage for Long-memory Data’, The Annals of Statistics, 24, 466–484.
- Wang, Y. (1997), ‘Minimax Estimation Via Wavelets for Indirect Long-memory Data’, Journal of Statistical Planning and Inference, 64, 45–55.
- Wishart, J.M. (2013), ‘Wavelet Deconvolution in a Periodic Setting with Long-range Dependent Errors’, Journal of Statistical Planning and Inference, 143, 867–881.
- Wu, D., and Xiao, Y. (2007), ‘Geometric Properties of Fractional Brownian Sheets’, Journal of Fourier Analysis and Applications, 13, 1–37.