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Einstein problem (English Wikipedia)

Analysis of information sources in references of the Wikipedia article "Einstein problem" in English language version.

refsWebsite
Global rank English rank
5arxiv.org
69th place
59th place
5doi.org
2nd place
2nd place
3semanticscholar.org
11th place
8th place
1jstor.org
26th place
20th place
1ams.org
451st place
277th place
1uark.edu
low place
6,604th place
1web.archive.org
1st place
1st place
1quantamagazine.org
6,413th place
4,268th place
1aperiodical.com
low place
low place
1escholarship.org
1,523rd place
976th place
1worldcat.org
5th place
5th place
1nytimes.com
7th place
7th place
1momath.org
low place
low place
1sciencenews.org
3,410th place
2,939th place

ams.org

mathscinet.ams.org

aperiodical.com

arxiv.org

  • Klaassen, Bernhard (2022). "Forcing nonperiodic tilings with one tile using a seed". European Journal of Combinatorics. 100 (C): 103454. arXiv:2109.09384. doi:10.1016/j.ejc.2021.103454. S2CID 237571405.
  • Socolar, Joshua E. S.; Taylor, Joan M. (2011). "An Aperiodic Hexagonal Tile". Journal of Combinatorial Theory, Series A. 118 (8): 2207–2231. arXiv:1003.4279. doi:10.1016/j.jcta.2011.05.001. S2CID 27912253.
  • Smith, David; Myers, Joseph Samuel; Kaplan, Craig S.; Goodman-Strauss, Chaim (Mar 2023). "An aperiodic monotile". arXiv:2303.10798 [math.CO].
  • Smith, David; Myers, Joseph Samuel; Kaplan, Craig S.; Goodman-Strauss, Chaim (2024). "An aperiodic monotile". Combinatorial Theory. 4 (1). arXiv:2303.10798. doi:10.5070/C64163843. ISSN 2766-1334.
  • Smith, David; Myers, Joseph Samuel; Kaplan, Craig S.; Goodman-Strauss, Chaim (2023). "A chiral aperiodic monotile". arXiv:2305.17743 [math.CO].

doi.org

  • Klaassen, Bernhard (2022). "Forcing nonperiodic tilings with one tile using a seed". European Journal of Combinatorics. 100 (C): 103454. arXiv:2109.09384. doi:10.1016/j.ejc.2021.103454. S2CID 237571405.
  • Radin, Charles (1995). "Aperiodic tilings in higher dimensions". Proceedings of the American Mathematical Society. 123 (11). American Mathematical Society: 3543–3548. doi:10.2307/2161105. JSTOR 2161105. MR 1277129.
  • Gummelt, Petra (1996). "Penrose Tilings as Coverings of Congruent Decagons". Geometriae Dedicata. 62 (1): 1–17. doi:10.1007/BF00239998. S2CID 120127686.
  • Socolar, Joshua E. S.; Taylor, Joan M. (2011). "An Aperiodic Hexagonal Tile". Journal of Combinatorial Theory, Series A. 118 (8): 2207–2231. arXiv:1003.4279. doi:10.1016/j.jcta.2011.05.001. S2CID 27912253.
  • Smith, David; Myers, Joseph Samuel; Kaplan, Craig S.; Goodman-Strauss, Chaim (2024). "An aperiodic monotile". Combinatorial Theory. 4 (1). arXiv:2303.10798. doi:10.5070/C64163843. ISSN 2766-1334.

escholarship.org

jstor.org

momath.org

nytimes.com

quantamagazine.org

sciencenews.org

semanticscholar.org

api.semanticscholar.org

  • Klaassen, Bernhard (2022). "Forcing nonperiodic tilings with one tile using a seed". European Journal of Combinatorics. 100 (C): 103454. arXiv:2109.09384. doi:10.1016/j.ejc.2021.103454. S2CID 237571405.
  • Gummelt, Petra (1996). "Penrose Tilings as Coverings of Congruent Decagons". Geometriae Dedicata. 62 (1): 1–17. doi:10.1007/BF00239998. S2CID 120127686.
  • Socolar, Joshua E. S.; Taylor, Joan M. (2011). "An Aperiodic Hexagonal Tile". Journal of Combinatorial Theory, Series A. 118 (8): 2207–2231. arXiv:1003.4279. doi:10.1016/j.jcta.2011.05.001. S2CID 27912253.

uark.edu

comp.uark.edu

web.archive.org

worldcat.org

search.worldcat.org