Lecture 3
Massey: Ch. 1, Sec. 5.
State the classification theorem of compact surfaces - our short-term goal
is to prove this thing.
Ideas: explain the cannonical forms for our surfaces. Why do these give use
the surfaces we think they do? How is connect sum showing up in the
polygons representation? How do we recognize orientablity in these. Do many
examples - what does a three holed torus connect sum a projective space look
like in polygonal representation? Why are these things compact surfaces?