0708-1300/Hawaiian Earring

0708-1300/Navigation Panel   Add your name / see who's in! # Week of... Links Fall Semester 1 Sep 10 About, Tue, Thu 2 Sep 17 Tue, HW1, Thu 3 Sep 24 Tue, Photo, Thu 4 Oct 1 Questionnaire, Tue, HW2, Thu 5 Oct 8 Thanksgiving, Tue, Thu 6 Oct 15 Tue, HW3, Thu 7 Oct 22 Tue, Thu 8 Oct 29 Tue, HW4, Thu, Hilbert sphere 9 Nov 5 Tue,Thu, TE1 10 Nov 12 Tue, Thu 11 Nov 19 Tue, Thu, HW5 12 Nov 26 Tue, Thu 13 Dec 3 Tue, Thu, HW6 Spring Semester 14 Jan 7 Tue, Thu, HW7 15 Jan 14 Tue, Thu 16 Jan 21 Tue, Thu, HW8 17 Jan 28 Tue, Thu 18 Feb 4 Tue 19 Feb 11 TE2, Tue, HW9, Thu, Feb 17: last chance to drop class R Feb 18 Reading week 20 Feb 25 Tue, Thu, HW10 21 Mar 3 Tue, Thu 22 Mar 10 Tue, Thu, HW11 23 Mar 17 Tue, Thu 24 Mar 24 Tue, HW12, Thu 25 Mar 31 Referendum,Tue, Thu 26 Apr 7 Tue, Thu R Apr 14 Office hours R Apr 21 Office hours F Apr 28 Office hours, Final (Fri, May 2) Register of Good Deeds Errata to Bredon's Book

Back to 0708-1300/Homework Assignment 7.

Assume ${\displaystyle r\in [0,1)}$ and ${\displaystyle r=0.a_{1}a_{2}...}$ is a decimal expansion without an infinite tail of nines. Let ${\displaystyle \gamma }$ be a path that goes around the first (the largest) circle ${\displaystyle a_{1}}$ times, then ${\displaystyle a_{2}}$ times around the second and so on. Observe that thanks to the shrinking of the circles it is possible the continuity of the curve at time ${\displaystyle 1}$ for the irrational numbers. Proving that two such curves belongs to different homotopy classes tell us that the number of homotopy classes is uncountable.

Now, assume that two such curves, corresponding to two different real numbers, are homotopic. Let ${\displaystyle k}$ be the first decimal digit in which the numbers differ and ${\displaystyle P_{k}}$ the quotient map of identifying all the circles but the ${\displaystyle k}$-th one to the joint point. if ${\displaystyle H}$ is a homotopy of the curves then ${\displaystyle P_{k}\circ H}$ is a homotopy of the projection of the curves which winds a different number of times. But this contradict the computation of the fundamental group o the circle.