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In coordinate geometry a 3-sphere with centre (x0, y0, z0, w0) and radius r is the set of all points (x,y,z,w) in R4 such that
Whereas a sphere has dimension 2 and is therefore a 2-manifold (a surface), a 3-sphere has dimension 3 and is a 3-manifold.
Every non-empty intersection of a 3-sphere with a three space is a sphere (unless the space merely touches the 3-sphere, in which case the intersection is a single point).
The unit quaternions form a 3-sphere, and since they are a group under multiplication, the 3-sphere can be regarded as a topological group, even a Lie group, in a natural fashion. This group is isomorphic to SU(2), the group of 2-by-2 complex unitary matrices with determinant 1.
A major unsolved problem concerning 3-spheres is the Poincaré conjecture.
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