| The fractional Calderón problem: low regularity and stability A Rüland, M Salo Nonlinear Analysis 193, 111529, 2020 | 103 | 2020 |
| Uniqueness and reconstruction for the fractional Calderón problem with a single measurement T Ghosh, A Rüland, M Salo, G Uhlmann Journal of Functional Analysis 279 (1), 108505, 2020 | 98 | 2020 |
| Unique continuation for fractional Schrödinger equations with rough potentials A Rüland Communications in Partial Differential Equations 40 (1), 77-114, 2015 | 95 | 2015 |
| The Calderón problem for the fractional Schrödinger equation with drift M Cekić, YH Lin, A Rüland Calculus of Variations and Partial Differential Equations 59 (3), 91, 2020 | 60 | 2020 |
| Exponential instability in the fractional Calderón problem A Rüland, M Salo Inverse Problems 34 (4), 045003, 2018 | 56 | 2018 |
| The Calderón problem for a space-time fractional parabolic equation RY Lai, YH Lin, A Rüland SIAM Journal on Mathematical Analysis 52 (3), 2655-2688, 2020 | 50 | 2020 |
| Quantitative Runge approximation and inverse problems A Rüland, M Salo International Mathematics Research Notices 2019 (20), 6216-6234, 2019 | 41 | 2019 |
| Quantitative approximation properties for the fractional heat equation A Rüland, M Salo arXiv preprint arXiv:1708.06300, 2017 | 41 | 2017 |
| On quantitative unique continuation properties of fractional Schrödinger equations: Doubling, vanishing order and nodal domain estimates A Rüland Transactions of the American Mathematical Society 369 (4), 2311-2362, 2017 | 34 | 2017 |
| Higher regularity for the fractional thin obstacle problem H Koch, A Rüland, W Shi arXiv preprint arXiv:1605.06662, 2016 | 33 | 2016 |
| Strong unique continuation for the higher order fractional Laplacian MÁ García-Ferrero, A Rüland arXiv preprint arXiv:1902.09851, 2019 | 30 | 2019 |
| Lipschitz stability for the Finite Dimensional Fractional Calder\'on Problem with Finite Cauchy Data A Rüland, E Sincich arXiv preprint arXiv:1805.00866, 2018 | 29 | 2018 |
| The cubic-to-orthorhombic phase transition: rigidity and non-rigidity properties in the linear theory of elasticity A Rüland Archive for Rational Mechanics and Analysis 221, 23-106, 2016 | 29 | 2016 |
| On instability mechanisms for inverse problems H Koch, A Rüland, M Salo arXiv preprint arXiv:2012.01855, 2020 | 24 | 2020 |
| The variable coefficient thin obstacle problem: Carleman inequalities H Koch, A Rüland, W Shi Advances in Mathematics 301, 820-866, 2016 | 24 | 2016 |
| A rigidity result for a reduced model of a cubic-to-orthorhombic phase transition in the geometrically linear theory of elasticity A Rüland Journal of Elasticity 123, 137-177, 2016 | 23 | 2016 |
| Convex integration arising in the modelling of shape-memory alloys: some remarks on rigidity, flexibility and some numerical implementations A Rüland, JM Taylor, C Zillinger Journal of Nonlinear Science 29, 2137-2184, 2019 | 20 | 2019 |
| Exact constructions in the (non-linear) planar theory of elasticity: from elastic crystals to nematic elastomers P Cesana, F Della Porta, A Rüland, C Zillinger, B Zwicknagl Archive for Rational Mechanics and Analysis 237 (1), 383-445, 2020 | 19 | 2020 |
| Quantitative invertibility and approximation for the truncated Hilbert and Riesz transforms A Rüland Revista Matemática Iberoamericana 35 (7), 1997-2024, 2019 | 19 | 2019 |
| The variable coefficient thin obstacle problem: optimal regularity and regularity of the regular free boundary H Koch, A Rüland, W Shi Annales de l'Institut Henri Poincaré C, Analyse non linéaire 34 (4), 845-897, 2017 | 18 | 2017 |
Mikko SaloProfessor of Mathematics, University of JyväskyläVerified email at jyu.fi
