Contents

Idea

The circle is a fantastic thing with lots and lots of properties and extra structures. It is a:

• topological space
• smooth manifold
• Lie group (the circle group)
• co-H-group?

and it is one of the basic building blocks for lots of areas of mathematics, including:

• homotopy theory
• loop spaces
• knots and links

Definition

We consider the circle first as a topological space, then as the homotopy type represented by that space.

As a topological space

The standard equivalence of the two definitions is given by the map $ℝ\to ℂ$, $t\mapsto e^{2\pi it}$.

As a homotopy type

As a homotopy type the circle is for instance the homotopy pushout

A formalization as a higher inductive type in homotopy type theory is given by

Axiom circle : Type.

Axiom base : circle.
Axiom loop : base ~~> base.

See (Shulman).

Properties

The circle is a compact, connected topological space. It is a $1$-dimensional smooth manifold (indeed, it is the only $1$-dimensional compact, connected smooth manifold). It is not simply connected. Its first homotopy group is the integers

(A proof of this in homotopy type theory is in Shulman P1S1.)

But the higher homotopy groups ${\pi }_n(S^1)\simeq *$, $n>1$ all vanish (and so is a homotopy 1-type). The circle is a model for the classifying space for the abelian group $\mathbb{Z}$, the integers.

The product of the circle with itself is the torus

Generally, the $n$-torus is $(S^1{)}^n$.

Related concepts

• sphere

• pseudocircle

References

A formalization in homotopy type theory is in

• Mike Shulman, Circle.v

The proof that ${\pi }_1(S^1)\simeq \mathbb{Z}$ in this context is in

• Mike Shulman, P1S1.v