Maximum genus of the generalized Jenga game
- Published in 2017
- Added on
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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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- key
- MaximumgenusofthegeneralizedJengagame
- type
- article
- date_added
- 2017-08-07
- date_published
- 2017-12-07
BibTeX entry
@article{MaximumgenusofthegeneralizedJengagame, key = {MaximumgenusofthegeneralizedJengagame}, type = {article}, title = {Maximum genus of the generalized Jenga game}, author = {Rika Akiyama and Nozomi Abe and Hajime Fujita and Yukie Inaba and Mari Hataoka and Shiori Ito and Satomi Seita}, 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.}, comment = {}, date_added = {2017-08-07}, date_published = {2017-12-07}, urls = {http://arxiv.org/abs/1708.01503v1,http://arxiv.org/pdf/1708.01503v1}, collections = {Attention-grabbing titles,Games to play with friends,Things to make and do}, url = {http://arxiv.org/abs/1708.01503v1 http://arxiv.org/pdf/1708.01503v1}, urldate = {2017-08-07}, archivePrefix = {arXiv}, eprint = {1708.01503}, primaryClass = {math.HO}, year = 2017 }