Fred wrote: << On 10/24/10, Dan Asimov <dasimov@earthlink.net> wrote: << [Most of this was written before several posts that explain much of what I've described below, but for clarity I'm leaving this unedited.] Let C be a simple closed curve in R^3 - {p,q,r}, where #{p,q,r} = 3.
Should read " R^2 - {p,q,r} "?
Yes, indeed. Thank you for pointing that out. << ... In the case of the simple closed curve of the painting, it's fun to let the exterior "ooze into" the curve, by shading that in. What remains is a very skinny and folded snake with one eye at each end (namely, the two punctures in its interior). Once this becomes clear, it's easy to imagine how a sequence of Dehn twists might result in unfolding the snake. The inverse of the corresponding word is, I'm guessing, what was painted on the wall. (But the resolution of the photo is too low for me to be able to read that word.)
a b c' b' a' b' a b c b' a' b c' b' a' b' a b c' b' a' b a b c b' --- the last "a" being a trifle dubious. WFL
Wow, when I magnify that picture on my computer I can't make head or tail of those letters. But if there are three of them, it's clear that my guess (that it was a word in the usual two Dehn twists that generate that group) was wrong. --Dan Those who sleep faster are more rested sooner.