Inverse diffusion from knowledge of power densities G Bal, E Bonnetier, F Monard, F Triki arXiv preprint arXiv:1110.4577, 2011 | 94 | 2011 |
Consistent Inversion of Noisy Non‐Abelian X‐Ray Transforms F Monard, R Nickl, GP Paternain Communications on Pure and Applied Mathematics 74 (5), 1045-1099, 2021 | 64 | 2021 |
Efficient nonparametric Bayesian inference for X-ray transforms F Monard, R Nickl, GP Paternain The Annals of Statistics 47 (2), 1113-1147, 2019 | 63 | 2019 |
Integral geometry on manifolds with boundary and applications J Ilmavirta, F Monard The Radon Transform: The First 100, 43-114, 2019 | 59 | 2019 |
Inverse transport with isotropic sources and angularly averaged measurements G Bal, I Langmore, F Monard Inverse Probl. Imaging 2 (1), 23-42, 2008 | 52 | 2008 |
Inverse diffusion problems with redundant internal information F Monard, G Bal arXiv preprint arXiv:1106.4277, 2011 | 49 | 2011 |
Inverse anisotropic diffusion from power density measurements in two dimensions F Monard, G Bal Inverse Problems 28 (8), 084001, 2012 | 48 | 2012 |
Numerical implementation of geodesic X-ray transforms and their inversion F Monard SIAM Journal on Imaging Sciences 7 (2), 1335-1357, 2014 | 47 | 2014 |
The geodesic ray transform on Riemannian surfaces with conjugate points F Monard, P Stefanov, G Uhlmann Communications in Mathematical Physics 337 (3), 1491-1513, 2015 | 44 | 2015 |
Statistical guarantees for Bayesian uncertainty quantification in nonlinear inverse problems with Gaussian process priors F Monard, R Nickl, GP Paternain The Annals of Statistics 49 (6), 3255-3298, 2021 | 43 | 2021 |
Efficient tensor tomography in fan-beam coordinates F Monard arXiv preprint arXiv:1510.05132, 2015 | 40 | 2015 |
Reconstruction of constitutive parameters in isotropic linear elasticity from noisy full-field measurements G Bal, C Bellis, S Imperiale, F Monard Inverse problems 30 (12), 125004, 2014 | 39 | 2014 |
Inverse anisotropic conductivity from power densities in dimension n≥ 3 F Monard, G Bal Communications in Partial Differential Equations 38 (7), 1183-1207, 2013 | 38 | 2013 |
Inverse anisotropic conductivity from internal current densities G Bal, C Guo, F Monard Inverse Problems 30 (2), 025001, 2014 | 36 | 2014 |
Inversion of the attenuated geodesic X-ray transform over functions and vector fields on simple surfaces F Monard SIAM Journal on Mathematical Analysis 48 (2), 1155-1177, 2016 | 32 | 2016 |
Reconstruction of a fully anisotropic elasticity tensor from knowledge of displacement fields G Bal, F Monard, G Uhlmann SIAM Journal on Applied Mathematics 75 (5), 2214-2231, 2015 | 29 | 2015 |
The attenuated geodesic x-ray transform S Holman, F Monard, P Stefanov Inverse Problems 34 (6), 064003, 2018 | 23 | 2018 |
Efficient tensor tomography in fan-beam coordinates. II: Attenuated transforms F Monard arXiv preprint arXiv:1704.08294, 2017 | 21 | 2017 |
Simultaneous source and attenuation reconstruction in SPECT using ballistic and single scattering data M Courdurier, F Monard, A Osses, F Romero Inverse Problems 31 (9), 095002, 2015 | 21 | 2015 |
Imaging of anisotropic conductivities from current densities in two dimensions G Bal, C Guo, F Monard SIAM Journal on Imaging Sciences 7 (4), 2538-2557, 2014 | 21 | 2014 |