‪Krisztina Regős‬ - ‪Google Scholar‬

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Citations	32	31
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Gábor DomokosProfessor of Geometric Modeling, Budapest University of TechnologyVerified email at iit.bme.hu
Flórián KovácsAssociate professor, Budapest University of Technology and EconomicsVerified email at epito.bme.hu
Sándor BozókiInstitute for Computer Science and Control (SZTAKI); Corvinus University of BudapestVerified email at sztaki.hu
Zsolt LángiBudapest University of TechnologyVerified email at math.bme.hu

Krisztina Regős

Krisztina Regős

Budapest University of Technology and Economics

Verified email at edu.bme.hu


Title Sort by citations Sort by year Sort by title	Cited by Cited by	Year
Balancing polyhedra G Domokos, F Kovács, Z Lángi, K Regős, PT Varga arXiv preprint arXiv:1810.05382, 2018	16	2018
Mono-unstable polyhedra with point masses have at least 8 vertices S Bozóki, G Domokos, F Kovács, K Regős International Journal of Solids and Structures 234, 111276, 2022	5	2022
A two-vertex theorem for normal tilings G Domokos, ÁG Horváth, K Regős Aequationes mathematicae 97 (1), 185-197, 2023	4	2023
A discrete time evolution model for fracture networks G Domokos, K Regős Central European Journal of Operations Research 32 (1), 83-94, 2024	3	2024
Polygonal tessellations as predictive models of molecular monolayers K Regős, R Pawlak, X Wang, E Meyer, S Decurtins, G Domokos, ... Proceedings of the National Academy of Sciences 120 (16), e2300049120, 2023	3	2023
The smallest mono-unstable convex polyhedron with point masses has 8 faces and 11 vertices D Papp, K Regős, G Domokos, S Bozóki European Journal of Operational Research 310 (2), 511-517, 2023	1	2023
Soft cells and the geometry of seashells G Domokos, A Goriely, ÁG Horváth, K Regős arXiv preprint arXiv:2402.04190, 2024		2024
The smallest mono-unstable, homogeneous convex polyhedron has at least 7 vertices S Bozóki, G Domokos, D Papp, K Regős arXiv preprint arXiv:2401.17906, 2024		2024
On equilibria of tetrahedra G Almádi, RJ MacG. Dawson, G Domokos, K Regős The Mathematical Intelligencer, 1-8, 2023		2023
An evolution model for polygonal tessellations as models for crack networks and other natural patterns P Bálint, G Domokos, K Regős Journal of Statistical Physics 190 (8), 130, 2023		2023
On Equilibria of Tetrahedra Gergő Almádi RJMG Dawson, G Domokos, K Regős		2023
Evolution and Memory of Fractured Planetary Shells: Insights from Mud Crack Analog Experiments S Silver, K Regős, G Domokos, DJ Jerolmack AGU Fall Meeting Abstracts 2022, EP42D-1650, 2022		2022

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