 |  | ![[0.85 0.04; -0.04 0.85][x; y]+[0.00; 1.60]](/images/equations/BarnsleysFern/Inline3.svg) |
(1)
|
 |  | ![[-0.15 0.28; 0.26 0.24][x; y]+[0.00; 0.44]](/images/equations/BarnsleysFern/Inline6.svg) |
(2)
|
 |  | ![[0.20 -0.26; 0.23 0.22][x; y]+[0.00; 1.60]](/images/equations/BarnsleysFern/Inline9.svg) |
(3)
|
 |  | ![[0.00 0.00; 0.00 0.16][x; y]](/images/equations/BarnsleysFern/Inline12.svg) |
(4)
|
(Barnsley 1993, p. 86; Wagon 1991)。 這些仿射變換是收縮。 蕨類的尖端(類似於黑 spleenwort 品種的蕨類植物)是 
的不動點,最低兩個分支的尖端是 
和 
下主尖端的影像 (Wagon 1991)。
Barnsley's Fern
另請參閱
Barnsley's Tree, 動力系統, 分形, 迭代函式系統使用 探索
參考文獻
Barnsley, M. Fractals Everywhere, 2nd ed. Boston, MA: Academic Press, pp. 86, 90, 102 and Plate 2, 1993.Gleick, J. Chaos: Making a New Science. New York: Penguin Books, p. 238, 1988.Trott, M. Graphica 1: The World of Mathematica Graphics. The Imaginary Made Real: The Images of Michael Trott. Champaign, IL: Wolfram Media, pp. 46, 55, and 87, 1999.Wagon, S. "Biasing the Chaos Game: Barnsley's Fern." §5.3 in Mathematica in Action. New York: W. H. Freeman, pp. 156-163, 1991.在 中引用
Barnsley's Fern請引用為
Weisstein, Eric W. "Barnsley's Fern." 來自 網路資源。 https://mathworld.tw/BarnsleysFern.html