homology sphere

In algebraic topology, a homology sphere is a topological space X having the homology groups of an n-sphere, for some integer n ≥ 1. That is, we have

H₀(X,Z) and H_n(X,Z) are infinite cyclic

and

H_i(X,Z) = {0} for all other i.

Therefore X is a connected space, with one non-zero higher Betti number: b_n. It doesn't follow that X is simply connected, only that its fundamental group is perfect.

Poincar sphere

The Poincar sphere, or Poincar dodecahedral space, is a particular example of a homology sphere. It is the only known homology 3-sphere (besides the 3-sphere itself) with finite fundamental group. Its fundamental group is known as the binary icosahedral group and has order 120. This shows the Poincar conjecture cannot be stated in homology terms alone. Here is a simple way to construct the space that gave rise to the term "dodecahedral space": first note that every face of a dodecahedron has an opposite face, so every face can be glued to its opposite by the minimal clockwise twist needed to line up the faces. After this gluing, the result is a closed 3-manifold. The Poincare sphere is a spherical 3-manifold. See Seifert-Weber space for a similar construction that results in a hyperbolic 3-manifold. Alternatively, the Poincar sphere can be constructed as the quotient space SO(3)/I where I is the icosahedral group (i.e. the symmetry group of the regular icosahedron and dodecahedron; isomorphic to the alternating group A₅); less technically, this means that the Poincare sphere is the space of all possible positions of an icosahedron. Alternatively, one can pass to the universal cover of SO(3) which can be realized as the group of unit quaternions and is homeomorphic to the 3-sphere. In this case, the Poincar sphere is isomorphic to S³/Ĩ where Ĩ is the binary isosahedral group, the perfect double cover of I living in S³. Another approach is by Dehn surgery. The Poincar sphere results from +1 surgery on the right handed trefoil knot.

<< Previous

Word Browser

Next >>

edomite language
door to door
chroot
bernard saisset
full count
croc
1998 commonwealth games
battle of indus
bcker b 131
ensemble georgika
steel pulse

operators in c and c plus plus
handsworth revolution
rtbf
irish aviation authority
tv osaka
battle of parwan
plastic model
sanyo
sommelier
ornithischia
witchfinder general

anagarika dharmapala
socialist party (francophone belgium)
pulmonology
stalky & co.
balthasar neumann
serang
karl peters
bcdc plus plus
carl friedrich goerdeler
elizabeth boleyn, countess of wiltshire
scott gorham

tentacle
national assembly of hungary
spaten
roadblock
scour
wasco
capillary number
cherimoya
thyreophora
socialist party (belgium)
atomic weapons establishment