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J. Inf. Process. Cybern., 1983
Summary: In this paper it is proved that adaption does not help for the inverse function problem. This is in a sharp contrast with the zero function problem recently studied by \textit{K. Sikorski} [Numer. Math. 40, 111-117 (1982; Zbl 0492.65027)] and by \textit{J. F. Traub} and \textit{H.
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Summary: In this paper it is proved that adaption does not help for the inverse function problem. This is in a sharp contrast with the zero function problem recently studied by \textit{K. Sikorski} [Numer. Math. 40, 111-117 (1982; Zbl 0492.65027)] and by \textit{J. F. Traub} and \textit{H.
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Inverse statistical problems: from the inverse Ising problem to data science
Advances in Physics, 2017Riccardo Zecchina, Johannes Berg
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Statistical inverse problems: Discretization, model reduction and inverse crimes
Journal of Computational and Applied Mathematics, 2007Jari P Kaipio, Erkki Somersalo
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Inverse nodal and inverse spectral problems for discontinuous boundary value problems
Journal of Mathematical Analysis and Applications, 2008Chung-Tsun Shieh, V A Yurko
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Inverse Problems for Nanostructures
In these lectures we review some recent results concerning inverse problems for thin elastic nanostructures. Nanostructures are assumed to be either one-dimensional (nanobeams) or two-dimensional (nanoplates), and are described within a simplified version of the strain gradient linear elasticity theory for isotropic materials.openaire +1 more source
Deep Convolutional Neural Network for Inverse Problems in Imaging
IEEE Transactions on Image Processing, 2017Kyong Hwan Jin +2 more
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Past and future of inverse problems
Journal of Mathematical Physics, 2000Pierre C Sabatier, Sabatier Pierre C
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