Interesting Esoterica

Maximum genus of the generalized Jenga game

Article by Rika Akiyama and Nozomi Abe and Hajime Fujita and Yukie Inaba and Mari Hataoka and Shiori Ito and Satomi Seita
  • Published in 2017
  • Added on
We treat the boundary of the union of blocks in the Jenga game as a surface with a polyhedral structure and consider its genus. We generalize the game and determine the maximum genus of the generalized game.

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BibTeX entry

@article{MaximumgenusofthegeneralizedJengagame,
	title = {Maximum genus of the generalized Jenga game},
	abstract = {We treat the boundary of the union of blocks in the Jenga game as a surface
with a polyhedral structure and consider its genus. We generalize the game and
determine the maximum genus of the generalized game.},
	url = {http://arxiv.org/abs/1708.01503v1 http://arxiv.org/pdf/1708.01503v1},
	author = {Rika Akiyama and Nozomi Abe and Hajime Fujita and Yukie Inaba and Mari Hataoka and Shiori Ito and Satomi Seita},
	comment = {},
	urldate = {2017-08-07},
	archivePrefix = {arXiv},
	eprint = {1708.01503},
	primaryClass = {math.HO},
	year = 2017,
	collections = {attention-grabbing-titles,games-to-play-with-friends,things-to-make-and-do}
}