Support theorems for totally geodesic Radon transforms on constant curvature spaces Á Kurusa Proceedings of the American Mathematical Society 122 (2), 429-435, 1994 | 36 | 1994 |
Radon transform on spaces of constant curvature C Berenstein, E Tarabusi, Á Kurusa Proceedings of the American Mathematical Society 125 (2), 455-461, 1997 | 19 | 1997 |
The invertibility of the Radon transform on abstract rotational manifolds of real type A Kurusa Mathematica Scandinavica 70 (1), 112-126, 1992 | 19 | 1992 |
A convex combinatorial property of compact sets in the plane and its roots in lattice theory G Czédli, Á Kurusa arXiv preprint arXiv:1807.03443, 2018 | 18 | 2018 |
Inequalities for hyperconvex sets F Fodor, Á Kurusa, V Vígh Advances in Geometry 16 (3), 337-348, 2016 | 18 | 2016 |
Can you recognize the shape of a figure from its shadows? J Kincses, Á Kurusa Beitrage zur Algebra und Geometrie 36 (1), 25-35, 1995 | 18 | 1995 |
The Radon transform on hyperbolic space Á Kurusa Geometriae Dedicata 40, 325-339, 1991 | 17 | 1991 |
Is a convex plane body determined by an isoptic? Á Kurusa Beiträge zur Algebra und Geometrie/Contributions to Algebra and Geometry 53 …, 2012 | 16 | 2012 |
You can recognize the shape of a figure from its shadows! Á Kurusa Geometriae Dedicata 59 (2), 113-125, 1996 | 16 | 1996 |
A Characterization of the Radon Transform's Range by a System of PDEs Á Kurusa Journal of Mathematical Analysis and Applications 161 (1), 218-226, 1991 | 15 | 1991 |
The Radon transform on half sphere Á Kurusa ACTA SCIENTIARUM MATHEMATICARUM-SZEGED 58 (1-4), 143-158, 1993 | 14 | 1993 |
Conics in Minkowski geometries Á Kurusa Aequationes mathematicae 92 (5), 949-961, 2018 | 11 | 2018 |
Isoptic characterization of spheres Á Kurusa, T Ódor Journal of Geometry 106, 63-73, 2015 | 11 | 2015 |
The shadow picture problem for nonintersecting curves Á Kurusa Geometriae Dedicata 59 (1), 103-112, 1996 | 10 | 1996 |
Support curves of invertible Radon transforms Á Kurusa Archiv der Mathematik 61 (5), 448-458, 1993 | 8 | 1993 |
Ceva’s and Menelaus’ Theorems characterize hyperbolic geometry among Hilbert geometries J Kozma, Á Kurusa J. Geom 106 (3), 465-470, 2015 | 7 | 2015 |
Ceva’s and Menelaus’ theorems in projective-metric spaces Á Kurusa Journal of Geometry 110 (2), 39, 2019 | 6 | 2019 |
A characterization of the Radon transform and its dual on Euclidean space Á Kurusa ACTA SCIENTIARUM MATHEMATICARUM-SZEGED 54 (1-2), 273-276, 1990 | 6 | 1990 |
Can you see the bubbles in a foam? Á Kurusa Acta Scientiarum Mathematicarum (Szeged) 82 (3-4), 663--694, 2016 | 5 | 2016 |
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 |