In the mathematical field of topology, a free loop is a variant of the notion of a loop. Whereas a loop has a distinguished point on it, called its basepoint, a free loop lacks such a distinguished point. Formally, let ${\displaystyle X}$ be a topological space. Then a free loop in ${\displaystyle X}$ is an equivalence class of continuous functions from the circle ${\displaystyle S^{1}}$ to ${\displaystyle X}$. Two loops are equivalent if they differ by a reparameterization of the circle. That is, ${\displaystyle f\sim g}$ if there exists a homeomorphism ${\displaystyle \psi :S^{1}\rightarrow S^{1}}$ such that ${\displaystyle g=f\circ \psi .}$

Thus, a free loop, as opposed to a based loop used in the definition of the fundamental group, is a map from the circle to the space without the basepoint-preserving restriction. Assuming the space is path-connected, free homotopy classes of free loops correspond to conjugacy classes in the fundamental group.

Recently, interest in the space of all free loops ${\displaystyle LX}$ has grown with the advent of string topology, i.e. the study of new algebraic structures on the homology of the free loop space.

• Loop space
• Loop (topology)
• Quasigroup

• Brylinski, Jean-Luc: Loop spaces, characteristic classes and geometric quantization. Reprint of the 1993 edition. Modern Birkhäuser Classics. Birkhäuser Boston, Inc., Boston, MA, 2008.
• Cohen and Voronov: Notes on String Topology

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