Геометрическое решение проблемы В. В. Произволова
Matematicheskoe Prosveshchenie, Série 3, Matematicheskoe Prosveshchenie, Tome 8 (2004), pp. 229-236
Voir la notice du chapitre de livre
@article{MP_2004_3_8_a18,
author = {G. A. Gal'perin},
title = {{\CYRG}{\cyre}{\cyro}{\cyrm}{\cyre}{\cyrt}{\cyrr}{\cyri}{\cyrch}{\cyre}{\cyrs}{\cyrk}{\cyro}{\cyre} {\cyrr}{\cyre}{\cyrsh}{\cyre}{\cyrn}{\cyri}{\cyre} {\cyrp}{\cyrr}{\cyro}{\cyrb}{\cyrl}{\cyre}{\cyrm}{\cyrery} {{\CYRV}.} {{\CYRV}.~{\CYRP}{\cyrr}{\cyro}{\cyri}{\cyrz}{\cyrv}{\cyro}{\cyrl}{\cyro}{\cyrv}{\cyra}}},
journal = {Matematicheskoe Prosveshchenie},
pages = {229--236},
year = {2004},
volume = {Ser. 3, 8},
language = {ru},
url = {http://geodesic.mathdoc.fr/item/MP_2004_3_8_a18/}
}
G. A. Gal'perin. Геометрическое решение проблемы В. В. Произволова. Matematicheskoe Prosveshchenie, Série 3, Matematicheskoe Prosveshchenie, Tome 8 (2004), pp. 229-236. http://geodesic.mathdoc.fr/item/MP_2004_3_8_a18/
[1] “Usloviya zadach”, Matematicheskoe prosveschenie. Tretya seriya, no. 6, MTsNMO, M., 2002, 133–135 | MR
[2] Pervaya konferentsiya po kombinatornoi geometrii i ee prilozheniyam, tezisy soobschenii, ed. V. G. Boltyanskii, Batumi, 1985
[3] G. A. Galperin, “Reshenie zadachi Proizvolova o pokrytii mnogomernogo mnogogrannika piramidami, i ee obobschenie”, DAN SSSR, 293:2 (1987), 283–288 | MR | Zbl
[4] F. V. Petrov, S. E. Rukshin, “Teoremy o pokryvayuschikh i neperesekayuschikhsya treugolnikakh i ikh obobscheniya”, Matematicheskoe prosveschenie. Tretya seriya, no. 8, 2004, 222–228