Topology Seminar Wisconsin, 1965
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Abstract algebra
Cantor set
Cartesian coordinate system
Cartesian product
Category=PBP
Characterization (mathematics)
Commutator subgroup
Compactification (mathematics)
Complete metric space
Conjecture
Continuous function (set theory)
Continuum hypothesis
Countable set
Cyclic group
Degeneracy (mathematics)
Dehn's lemma
Diagram (category theory)
Dimension
Dimension theory (algebra)
Disk (mathematics)
Epimorphism
eq_isMigrated=1
eq_isMigrated=2
eq_nobargain
Euclidean space
Existential quantification
First-countable space
Fixed-point property
Function (mathematics)
Fundamental group
Graph of a function
Grassmannian
H-cobordism
Hausdorff distance
Homeomorphism
Homotopy
Homotopy group
Hyperplane
Inclusion map
Inner automorphism
Intersection (set theory)
Jordan curve theorem
K-cell (mathematics)
Knot theory
Limit ordinal
Limit point
Line (geometry)
Linear extension
Mathematical induction
Mean value theorem
Metric space
Metrization theorem
Moore space
N-sphere
Neighbourhood (mathematics)
Open set
Order topology
P-adic number
Poincare conjecture
Projection (linear algebra)
Projection (mathematics)
Projective line
Rectangle
Semi-locally simply connected
Sign (mathematics)
Simply connected space
Sphere theorem (3-manifolds)
Submanifold
Subset
Tangent space
Theorem
Topological space
Ultrafilter
Upper half-plane
Product details
- ISBN 9780691080567
- Weight: 369g
- Dimensions: 152 x 229mm
- Publication Date: 21 Nov 1966
- Publisher: Princeton University Press
- Publication City/Country: US
- Product Form: Paperback
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During the summer of 1965, an informal seminar in geometric topology was held at the University of Wisconsin under the direction of Professor Bing. Twenty-five of these lectures are included in this study, among them Professor Bing's lecture describing the recent attacks of Haken and Poincare on the Poincare conjectures, and sketching a proof of Haken's main result.
