Maximal sections and centrally symmetric bodies E Makai, H Martini, T Ódor Mathematika 47 (1-2), 19-30, 2000 | 24 | 2000 |
Ellipsoids are the most symmetric convex bodies. T Ódor, PM Gruber Archiv der Mathematik 73 (5), 1999 | 16 | 1999 |
Isoptic characterization of spheres Á Kurusa, T Ódor Journal of Geometry 106, 63-73, 2015 | 11 | 2015 |
Characterizations of balls by sections and caps Á Kurusa, T Ódor Beiträge zur Algebra und Geometrie/Contributions to Algebra and Geometry 56 …, 2015 | 5 | 2015 |
On an integro-differential trans-form on the sphere E Makai, H Martini, T Ódor Studia Scientiarum Mathematicarum Hungarica 38 (1-4), 299-312, 2001 | 5 | 2001 |
Spherical floating bodies Á Kurusa, T Ódor Acta Scientiarum Mathematicarum 81 (3), 699-714, 2015 | 3 | 2015 |
Boundary-rigidity of projective metrics and the geodesic X-ray transform Á Kurusa, T Ódor The Journal of Geometric Analysis 32 (8), 216, 2022 | 2 | 2022 |
On a theorem of D. Ryabogin and V. Yaskin about detecting symmetry E Makai Jr, H Martini, T Ódor arXiv preprint arXiv:1411.4480, 2014 | 1 | 2014 |
Plancherel formula for the attenuated Radon transform E Dinnyés, T Ódor arXiv preprint arXiv:2309.00950, 2023 | | 2023 |
Local support theorem for the exponential Radon transform E Dinnyés, T Ódor arXiv preprint arXiv:2309.00998, 2023 | | 2023 |
Separation of points by congruent domains T Odor Studia Scientiarum Mathematicarum Hungarica 32 (3), 439-444, 1996 | | 1996 |
On the surface area of convex polytopes A Bezdek, T Odor Studia Scientiarum Mathematicarum Hungarica 30 (3), 275-282, 1995 | | 1995 |