| A two-step Hilbert transform method for 2D image reconstruction F Noo, R Clackdoyle, JD Pack Physics in Medicine & Biology 49 (17), 3903, 2004 | 472 | 2004 |
| Image reconstruction from fan-beam projections on less than a short scan F Noo, M Defrise, R Clackdoyle, H Kudo Physics in medicine & biology 47 (14), 2525, 2002 | 364 | 2002 |
| Analytic method based on identification of ellipse parameters for scanner calibration in cone-beam tomography F Noo, R Clackdoyle, C Mennessier, TA White, TJ Roney Physics in Medicine & Biology 45 (11), 3489, 2000 | 322 | 2000 |
| Tiny a priori knowledge solves the interior problem in computed tomography H Kudo, M Courdurier, F Noo, M Defrise Physics in medicine & biology 53 (9), 2207, 2008 | 279 | 2008 |
| Truncated Hilbert transform and image reconstruction from limited tomographic data M Defrise, F Noo, R Clackdoyle, H Kudo Inverse problems 22 (3), 1037, 2006 | 272 | 2006 |
| Cone-beam reconstruction using the backprojection of locally filtered projections JD Pack, F Noo, R Clackdoyle IEEE Transactions on Medical Imaging 24 (1), 70-85, 2005 | 263 | 2005 |
| A solution to the long-object problem in helical cone-beam tomography M Defrise, F Noo, H Kudo Physics in Medicine & Biology 45 (3), 623, 2000 | 242 | 2000 |
| Exact helical reconstruction using native cone-beam geometries F Noo, J Pack, D Heuscher Physics in Medicine & Biology 48 (23), 3787, 2003 | 234 | 2003 |
| Cone-beam filtered-backprojection algorithm for truncated helical data H Kudo, F Noo, M Defrise Physics in Medicine & Biology 43 (10), 2885, 1998 | 209 | 1998 |
| Solving the interior problem of computed tomography using a priori knowledge M Courdurier, F Noo, M Defrise, H Kudo Inverse problems 24 (6), 065001, 2008 | 176 | 2008 |
| Single-slice rebinning method for helical cone-beam CT F Noo, M Defrise, R Clackdoyle Physics in Medicine & Biology 44 (2), 561, 1999 | 167 | 1999 |
| Image covariance and lesion detectability in direct fan-beam x-ray computed tomography A Wunderlich, F Noo Physics in Medicine & Biology 53 (10), 2471, 2008 | 161 | 2008 |
| Cone-beam reconstruction using 1D filtering along the projection of M-lines JD Pack, F Noo Inverse Problems 21 (3), 1105, 2005 | 132 | 2005 |
| Investigation of saddle trajectories for cardiac CT imaging in cone-beam geometry JD Pack, F Noo, H Kudo Physics in Medicine & Biology 49 (11), 2317, 2004 | 132 | 2004 |
| Exact Radon rebinning algorithm for the long object problem in helical cone-beam CT S Schaller, F Noo, F Sauer, KC Tam, G Lauritsch, T Flohr IEEE transactions on medical imaging 19 (5), 361-375, 2000 | 125 | 2000 |
| Quantitative reconstruction from truncated projections in classical tomography R Clackdoyle, F Noo, J Guo, JA Roberts IEEE Transactions on Nuclear Science 51 (5), 2570-2578, 2004 | 114 | 2004 |
| Quasi-exact filtered backprojection algorithm for long-object problem in helical cone-beam tomography H Kudo, F Noo, M Defrise IEEE transactions on medical imaging 19 (9), 902-921, 2000 | 103 | 2000 |
| Simulation tools for two-dimensional experiments in x-ray computed tomography using the FORBILD head phantom Z Yu, F Noo, F Dennerlein, A Wunderlich, G Lauritsch, J Hornegger Physics in Medicine & Biology 57 (13), N237, 2012 | 97 | 2012 |
| Direct determination of geometric alignment parameters for cone-beam scanners C Mennessier, R Clackdoyle, F Noo Physics in Medicine & Biology 54 (6), 1633, 2009 | 94 | 2009 |
| The cone‐beam algorithm of Feldkamp, Davis, and Kress preserves oblique line integrals T Rodet, F Noo, M Defrise Medical physics 31 (7), 1972-1975, 2004 | 83 | 2004 |
Rolf Clackdoyle在 univ-grenoble-alpes.fr 的电子邮件经过验证
