[
[Fli20] Isha Agarwal, Matvey Borodin, Aidan Duncan, Kaylee Ji, Tanya Khovanova, Shane Lee, Boyan Litchev, Anshul Rastogi, Garima Rastogi, and Andrew Zhao. “The No-Flippancy Game.” math.CO arXiv:2006.09588 (2020).
]Search in Google Scholar
[
[WW04] Elwyn R. Berlekamp, John H. Conway and Richard K. Guy. Winning Ways for your Mathematical Plays, 2nd Edition, Volume 4. AK Peters (2004), p. 885.
]Search in Google Scholar
[
[Col82] Stanley Collings. “Coin Sequence Probabilities and Paradoxes.” Bulletin of the Institute of Mathematics and its Applications 18 (1982): 227–232.
]Search in Google Scholar
[
[Fel06] Daniel Felix. “Optimal Penney Ante Strategy via Correlation Polynomial Identities.” Electr. J. Comb. 13(1) (2006).10.37236/1061
]Search in Google Scholar
[
[MGS74] Martin Gardner. “Mathematical Games.” Scientific American, 231(4), (1974): 120–125.10.1038/scientificamerican0774-116
]Search in Google Scholar
[
[MGT88] Martin Gardner. Time Travel and Other Mathematical Bewilderments. W. H. Freeman, 1988.
]Search in Google Scholar
[
[GO81] L.J. Guibas and A.M. Odlyzko. “String Overlaps, Pattern Matching, and Nontransitive Games.” J. Combin. Theory Ser. A, 30, No. 2 (1981): 183–208.10.1016/0097-3165(81)90005-4
]Search in Google Scholar
[
[HN10] Steve Humble and Yutaka Nishiyama. “Humble-Nishiyama Randomness Game — A New Variation on Penney’s Coin Game.” Math. Today 46, No. 4 (2010): 194–195.
]Search in Google Scholar
[
[Pen69] Walter Penney. Journal of Recreational Mathematics, October 1969, p. 241.
]Search in Google Scholar
[
[Val17] Robert W. Vallin. “A sequence game on a roulette wheel, The Mathematics of Very Entertaining Subjects.” Research in Recreational Math, Volume II (2017). Princeton University Press.10.23943/princeton/9780691171920.003.0016
]Search in Google Scholar
