Article
| Title: | Béla Uhrin - osobné spomienky (Czech) |
| Title: | Béla Uhrin - Personal Recollections (English) |
| Author: | Bálint, Vojtech |
| Language: | Czech |
| Journal: | Pokroky matematiky, fyziky a astronomie |
| ISSN: | 0032-2423 |
| Volume: | 70 |
| Issue: | 3 |
| Year: | 2025 |
| Pages: | 159-169 |
| Summary lang: | Czech |
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| Category: | math |
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| Summary: | Béla Uhrin (2. 3. 1938-17. 11. 2020) napísal a zverejnil v roku 2013 v maďarčine svoj profesijný životopis (aj keď išlo skôr o spomienky). Keďže jeho zaujímavé životné osudy sú úzko späté s Československom a keďže som ho osobne poznal viac ako štvrťstoročie, dovolil som si na základe jeho životopisu napísať tento článok, ktorý by mohol zaujímať širšiu čitateľskú obec. (Czech) |
| MSC: | 01A60 |
| MSC: | 01A70 |
| MSC: | 52-03 |
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| Date available: | 2026-03-04T04:21:31Z |
| Last updated: | 2026-03-12 |
| Stable URL: | http://hdl.handle.net/10338.dmlcz/153543 |
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| Reference: | [1] Fejes Tóth, L.: Lagerungen in der Ebene, auf der Kugel und im Raum.. Springer-Verlag, 1953. |
| Reference: | [2] Ferguson, S. P., Hales, T. C.: The Kepler conjecture: the Hales–Ferguson proof.. Springer, 2011. |
| Reference: | [3] Gauss, C. F.: Untersuchungen über die Eigenschaften der positiven ternären quadratischen Formen von Ludwig August Seber, Göttingische gelehrte Anzeigen 9. Juli 1831.. Tiež v Werke, Band 2, 2. Aufl., Göttingen, 1876, 188–196. Tiež v J. Reine Angew. Math. 20 (1840), 312–320. |
| Reference: | [4] Hales, T. C.: The sphere packing problem.. J. Comput. Appl. Math. 44 (1992), 41–76. 10.1016/0377-0427(92)90052-Y |
| Reference: | [5] Hales, T. C.: The status of the Kepler conjecture.. Math. Intelligencer 16 (1994), 47–58. 10.1007/BF03024356 |
| Reference: | [6] Hales, T. C.: Sphere packings, I.. Discrete Comput. Geom. 17 (1997), 1–51. 10.1007/BF02770863 |
| Reference: | [7] Hales, T. C.: Sphere packings, II.. Discrete Comput. Geom. 18 (1997), 135–149. 10.1007/PL00009312 |
| Reference: | [8] Hales, T. C.: Cannonballs and honeycombs.. Notices Amer. Math. Soc. 47 (4) (2000), 440–449. |
| Reference: | [9] Hales, T.: The formal proof of the Kepler conjecture: a critical retrospective. [online]. Dostupné z: https://arxiv.org/abs/2402.08032 |
| Reference: | [10] Hales, T. C., Ferguson, S. P.: The Kepler conjecture.. Discrete Comput. Geom. 36 (2006), 1–269. |
| Reference: | [11] Hsiang, W. -Y.: On the sphere packing problem and the proof of Kepler’s conjecture.. Internat. J. Math. 4 (1993), 739–831. 10.1142/S0129167X93000364 |
| Reference: | [12] Hsiang, W.-Y.: A rejoinder to T.C. Hales’ article: The status of the Kepler conjecture.. Math. Intelligencer 17 (1994), 35–42. |
| Reference: | [13] Kepler, J.: Strena seu de nive sexangula.. Tampach, 1611. |
| Reference: | [14] Rogers, C. A.: The packing of equal spheres.. Proc. Lond. Math. Soc. 8 (3) (1958), 609–620. 10.1112/plms/s3-8.4.609 |
| Reference: | [15] Thue, A.: On some geometric number-theoretic theoremsSelected mathematical papers.. Forhandlingerne ved de Skandinaviske Naturforskeres 14 (1892), 352–353. Tiež v: Nagell, T. et al. (eds.): Selected mathematical papers. Universitetsforlaget, Oslo, 1977. |
| Reference: | [16] Thue, A.: On the densest packing of congruent circles in the plane.. Skr. Vidensk-Selsk, Christiania 1 (1910), 3–9. Tiež v: Nagell, T. et al. (eds.): Selected mathematical papers. Universitetsforlaget, Oslo, 1977, 257–263. |
| Reference: | [17] Uhrin, B.: Szakmai életrajz. [online]. Dostupné z: https://real.mtak.hu/201408/1/100030.pdf |
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