+ ݀Äâ capmçX‘ š+€Üçŕ Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒX|Z€HH3pZ°$ڐEŤ oŰ5From the article "One Corona is Enough for the Euclidean Plane" by Doris Schattschneider and Nikolai Dolbilin, published in "Quasicrystals and Discrete Geometry," J. Patera, editor, The Fields Institute for Research in Mathematical Sciences Monograph Series, Vol. 10, AMS, Providence, RI, 1998, pp. 207-246. 6. http://forum.swarthmore.edu/dynamic/one-corona/998, pp.ÁŠŃŽ Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒX|U6ŔHH3pU6đ"°UŁ 1 http://forum.swarthmore.edu/dynamic/one-corona/™™™™™ ŞŞŞŞŞŞ ťťťťťť ĚĚĚĚĚĚ ÝÝÝÝÝÝîîîîîî˙˙˙˙˙˙" U6ŔU7@"U|U7Đ"U5` `!jĆPŔ Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒX|Z…€HH3pZ…°#äpEŻ =Catalog of Isohedral Tilings by Symmetric Polygonal Tiles ťťťťťť ĚĚĚĚĚĚ ÝÝÝÝÝÝîîîîîî˙˙˙˙˙˙#ăŕEö¨Z†#ăĐEö¨TĘdŞUŞUŞUŞUZ„`Z†#ă°Eö¨€g"ŻĚ Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒT%žHH!g¨8 l4< } Ż 4.4.4.4 (4)l4Œ8 l4<,`CúH_/ů”><80 t/ö\ƒW››ƒW››‘XĂČ"  Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒAŕÄÎ˙˙˙˙˜QU`1Ĺ0ý˜x€€€`0€ŔQ€€˙˙˙ř˙˙C€CE ĂöČűV° Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒBQV°Ť0ôV€ CxCE ăéčî€ Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒP%`M8@‡AĘ.=PM8Đ98@…l@M8đ-lMśĚĚĚĚM8đ ÄP2T=PŮCkCe˙ú ÂőČ"  Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒjWĐŤ TWĐŤ ,C€CECxCE?ĐÂččű€  Ľ0Ü˙˙˙˙ń€ˆ Ö’Œk€€€€€˙˙˙ř˙˙˙ř€€€€€€€€@€@€@€@€CxCECkCe?Đăčtp Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒCŐ€€€˙˙˙ř˙˙˙ř€€€€Ŕ€`0€€‚„„ˆ˜ˆ˜ˆ C‰Ce Ł¨  Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒBŐQV°Ť0ôV€ C‚€C% Ł*¨/Âý Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒAŐŕÄÎ˙˙˙˙˜QU`1Ĺ0ý˜x€€€`0€ŔQ€€˙˙˙ř˙˙C–C% Üá0{ Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒCŐ€€€˙˙˙ř˙˙˙ř€€€€Ŕ€`0€€‚„„ˆ˜ˆ˜ˆ C^C‚€ ă7č<  Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒCŐՀ€€˙˙˙ř˙˙˙ř€€€€Ŕ€`0€€‚„„ˆ˜ˆ˜ˆ Cœ€Ce ăÂčÇ)ż Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒCŐ€€€˙˙˙ř˙˙˙ř€€€€Ŕ€`0€€‚„„ˆ˜ˆ˜ˆ CDCe   Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒCŐՀ€€˙˙˙ř˙˙˙ř€€€€Ŕ€`0€€‚„„ˆ˜ˆ˜ˆ C‚€C‚€ ă^čcސ Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒCŐŐŐ€€˙˙˙ř˙˙˙ř€€€€Ŕ€`0€€‚„„ˆ˜ˆ˜ˆ C°Ce ă›č  Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒCŐՀ€€˙˙˙ř˙˙˙ř€€€€Ŕ€`0€€‚„„ˆ˜ˆ˜ˆ CCe  ĂDČI)ż Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒCŐŐŐ€€˙˙˙ř˙˙˙ř€€€€Ŕ€`0€€‚„„ˆ˜ˆ˜ˆ CŁCE ĂĎČÔ Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒCŐՀ€€˙˙˙ř˙˙˙ř€€€€Ŕ€`0€€‚„„ˆ˜ˆ˜ˆ CQCE ľş Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒCŐՀ€€˙˙˙ř˙˙˙ř€€€€Ŕ€`0€€‚„„ˆ˜ˆ˜ˆ C7C‚€ */ Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒCŐŐŐ€€˙˙˙ř˙˙˙ř€€€€Ŕ€`0€€‚„„ˆ˜ˆ˜ˆ C–C‚€ âščc  Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒlCCeC°Ce?ĐŁQ¨V Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒCŐŐŐŐ€€˙˙˙ř˙˙˙ř€€€€Ŕ€`0€€‚„„ˆ˜ˆ˜ˆ CŠ€C% ŁÜ¨á Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒCŐŐŐ€€˙˙˙ř˙˙˙ř€€€€Ŕ€`0€€‚„„ˆ˜ˆ˜ˆ C^C% èȭ$Ŕ Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒCŐŐŐ€€˙˙˙ř˙˙˙ř€€€€Ŕ€`0€€‚„„ˆ˜ˆ˜ˆ C*CE Ž“tĐ Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒCŐŐŐ€€˙˙˙ř˙˙˙ř€€€€Ŕ€`0€€‚„„ˆ˜ˆ˜ˆ CC‚€ ĹŢG2˝  Ľ0Ü˙˙˙˙ń€ˆ Ö’Œp22€342€€56BčC(7CE¨8Ѩ9??ţCœ€CeC–C‚€C‚€C‚€C^C‚€CkCeC‰CeC€CECŁCE  §Čp  Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒlŐC*CECś€CE?ЍV  Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒlŐCC‚€CŠ€C‚€?ĐŁľ¨ş>° Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒCŐŐŐŐ€€˙˙˙ř˙˙˙ř€€€€Ŕ€`0€€‚„„ˆ˜ˆ˜ˆ C7C% #(†ŽŔ Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒCŐŐŐŐ€€˙˙˙ř˙˙˙ř€€€€Ŕ€`0€€‚„„ˆ˜ˆ˜ˆ CC’€ ĽˇT @„  Ľ0Ü˙˙˙˙ń€ˆ Ö’Œp1ă@„BüŢ&,'°'ěćBü>|>|â't'°'ě ?űCŁCEC€CECxCECkCeC^C‚€C7C‚€CDCeCQCEC^C%C‚€C%C–C%CŠ€C%  ˘´¨}  Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒlŐŐC7C%C˝C%?Đ"€(I{  Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒlŐŐCC’€CŁC’€?ĐƒÂˆÇ Ľ0Ü˙˙˙˙ń€ˆ Ö’ŒCŐŐŐŐŐ€€˙˙˙ř˙˙˙ř€€€€Ŕ€`0€€‚„„ˆ˜ˆ˜ˆ CDC ‚ÁˆŠ