[
[Aic+05] Oswin Aichholzer et al. “Games on triangulations”. In: Theoretical Computer Science 343 (2005), pp. 42–71. doi: http://doi.org/10.1016/j.tcs.2005.05.007.10.1016/j.tcs.2005.05.007
]Search in Google Scholar
[
[Apo76] Tom M. Apostol. Introduction to Analytic Number Theory. New York: Springer Science-Busines Media, 1976, pp. 62–63.10.1007/978-1-4757-5579-4
]Search in Google Scholar
[
[BCG82] Elwyn R. Berlekamp, John H. Conway, and Richard K. Guy. Winning Ways for Your Mathematical Plays. Vol. 2. New York, New York: Academic Press Inc., 1982.
]Search in Google Scholar
[
[Ber00] Elwyn Berlekamp. The Dots and Boxes Game: Sophisticated Child’s Play. Natick, MA: A K Peters, Lrd., 2000.10.1201/b14452
]Search in Google Scholar
[
[GKW76] RW Gaskell, MS Klamkin, and P Watson. “Triangulations and Pick’s theorem”. In: Mathematics Magazine 49.1 (1976), pp. 35–37.10.1080/0025570X.1976.11976535
]Search in Google Scholar
[
[Hor+14] Takashi Horiyama et al. “Sankaku-Tori: An Old Western-Japanese Game Played on a Point Set”. In: Fun with Algorithms 8496 (2014). Ed. by Alfredo Ferro, Fabrizio Luccio, and Peter Widmayer, pp. 230–239. doi: https://doi.org/10.1007/978-3-319-07890-8_20.10.1007/978-3-319-07890-8_20
]Search in Google Scholar
[
[htt] Gerry Myerson (https://mathoverflow.net/users/158000/gerry-myerson). Property of convex polygons on integer lattice structures. MathOverflow (https://mathoverflow.net/q/373673). Accessed Oct. 9, 2020. Math-Overflow.
]Search in Google Scholar
[
[JJ98] Gareth A. Jones and Josephine M. Jones. Elementary Number Theory. London: Springer, 1998, pp. 7–11.10.1007/978-1-4471-0613-5
]Search in Google Scholar
[
[Var09] Ilan Vardi. The Mathematical Theory of Dots. https://www.oocities.org/cf/ilanpi/math.html. Accessed Jul. 1, 2020. Oct. 2009.
]Search in Google Scholar
