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In mathematics, a solid torus is a topological space homeomorphic to ${\displaystyle S^1\times D^2}$, i.e. the cartesian product of the circle with a two dimensional disc endowed with the product topology. The solid torus is a connected, compact, orientable 3-dimensional manifold with boundary. The boundary is homeomorphic to ${\displaystyle S^1\times S^1}$, the ordinary torus.

A standard way to picture a solid torus is as a toroid, embedded in 3-space.

Since the disk ${\displaystyle D^2}$ is contractible, the solid torus has the homotopy type of ${\displaystyle S^1}$. Therefore the fundamental group and homology groups are isomorphic to those of the circle:

${\displaystyle {\pi }_1(S^1\times D^2)\cong {\pi }_1(S^1)\cong \mathbb{\mathbb{Z}},}$

${\displaystyle H_k(S^1\times D^2)\cong H_k(S^1)\cong \{\begin{array}{ll}\mathbb{\mathbb{Z}}& \text{ if }k=0,1\\ 0& \text{ otherwise }\end{array}.}$

See also

• Whitehead manifold
• Hyperbolic Dehn surgery

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