Fractal Dragon Curves and Stuff Like That

There are so many articles dealing with folding long strips of paper into fractal dragon curves that I felt they needed their own biblography section!

Brillhart, John and Patrick Morton, A case study in mathematical research: the Golay-Rudin-Shapiro sequence, American Mathematical Monthly, Vol. 103, No. 10 (Dec. 1996), 854-869.
Davis, Chandler and Donald E. Knuth, Number representations and dragon curves - I, Journal of Recreational Mathematics, Vol. 3, No. 2 (April 1970), 66-81.
Davis, Chandler and Donald E. Knuth, Number representations and dragon curves - II, Journal of Recreational Mathematics, Vol. 3, No. 3 (July 1970), 133-149.
Dekking, Michel, Michel Mendes France, and Alf van der Poorten, FOLDS!, parts I, II and III, Mathematical Intelligencer, Vol. 4 (1983), 130-138, 173-181, and 190-195.
Gardner, Martin, Mathematical games, Scientific American, No. 216 (March 1967), 124-125; (April 1967), 118-120; No. 217 (July 1967), 115.
Justin, Jacques, Mathematics of origami, part 2, British Origami (magazine of the British Origami Society), No. 111 (April 1985), 32-34.
Mendes France, Michel and Alf van der Poorten, Arithmetic and analytic properties of paperfolding sequences, Bulletin of the Australian Mathematical Society, Vol. 24 (1981), 123-131.
Mendes France, Michel, Folding paper and thermodynamics, Physics Reports (Review section of Physics Letters), Vol. 103, No. 1-4 (1984), 161-172.
Morton, Patrick and W. Mourant, Paper folding, digit patterns, and groups of arithmetic fractals, Proceedings of the London Mathematical Society, Vol. 59, No. 3 (1989), 253-293.

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