Abstract
Polyominoes are connected plane figures formed of joining unit squares edge to edge.
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Bibliography
[1] U. Barbans, Andris Cibulis, Gilbert Lee, Andy Liu and Robert Wainwright, Polyomino Number Theory (II), , in Mathematical Properties of Sequences and other Combinatorial Structures, edited by J. S. No, H. Y. Song, T. Helleseth and P. V. Kumar, Kluwer, Boston, (2003) 93–100.
[2] U. Barbans, Andris Cibulis, Gilbert Lee, Andy Liu and Robert Wainwright, Polyomino Number Theory (III), in Tribute to a Mathemagician, edited by B. Cipra, E. Demaine, M. Demaine and T. Rodgers, A K Peters, Natick, (2005) 131–136.
[3] Andris Cibulis, Andy Liu, M. Lukjanska and George Sicherman, Polyiamond Number Theory, Journal of Recreational Mathematics, 33-1 (2005) 39–47.
[4] Andris Cibulis, Andy Liu and Robert Wainwright, Polyomino Number Theory (I), Crux Mathematicorum, 28 (2002) 147-150.
[5] Andris Cibulis and George Sicherman, Polyhex Compability, Math Horizons, November (2006) 36–37, 43.
[6] David Chou and Neo Lin, Tetris Algebra, Journal of Recreational Mathematics. 33-3 (2005) 182–192
[7] Solomon Golomb, Normed Division Domains, Amer. Math. Monthly, 88 (1981) 680–686.
[8] Richard Mah, Ryan Nowakowsky and WilliamWei, Polyiamond Compatibility. Delta-K, 50-1 (2012) 22–23.
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Liu, A.CF. (2018). Polyform Compatibility. In: S.M.A.R.T. Circle Projects. Springer Texts in Education. Springer, Cham. https://doi.org/10.1007/978-3-319-56811-9_3
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DOI: https://doi.org/10.1007/978-3-319-56811-9_3
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