In algebraic topology, a peripheral subgroup for a space-subspace pair X ⊃ Y is a certain subgroup of the fundamental group of the complementary space, π₁(X − Y). Its conjugacy class is an invariant of the pair (X,Y). That is, any homeomorphism (X, Y) → (X′, Y′) induces an isomorphism π₁(X − Y) → π₁(X′ − Y′) taking peripheral subgroups to peripheral subgroups.

A peripheral subgroup consists of loops in X − Y which are peripheral to Y, that is, which stay "close to" Y (except when passing to and from the basepoint). When an ordered set of generators for a peripheral subgroup is specified, the subgroup and generators are collectively called a peripheral system for the pair (X, Y).

Peripheral systems are used in knot theory as a complete algebraic invariant of knots. There is a systematic way to choose generators for a peripheral subgroup of a knot in 3-space, such that distinct knot types always have algebraically distinct peripheral systems. The generators in this situation are called a longitude and a meridian of the knot complement.

Let Y be a subspace of the path-connected topological space X, whose complement X − Y is path-connected. Fix a basepoint x ∈ X − Y. For each path component V_i of X − Y∩Y, choose a path γ_i from x to a point in V_i. An element [α] ∈ π₁(X − Y, x) is called peripheral with respect to this choice if it is represented by a loop in U ∪  ∪ _iγ_i for every neighborhood U of Y. The set of all peripheral elements with respect to a given choice forms a subgroup of π₁(X − Y, x), called a peripheral subgroup.

In the diagram, a peripheral loop would start at the basepoint x and travel down the path γ until it's inside the neighborhood U of the subspace Y. Then it would move around through U however it likes (avoiding Y). Finally it would return to the basepoint x via γ. Since U can be a very tight envelope around Y, the loop has to stay close to Y.

Any two peripheral subgroups of π₁(X − Y, x), resulting from different choices of paths γ_i, are conjugate in π₁(X − Y, x). Also, every conjugate of a peripheral subgroup is itself peripheral with respect to some choice of paths γ_i. Thus the peripheral subgroup's conjugacy class is an invariant of the pair (X, Y).

A peripheral subgroup, together with an ordered set of generators, is called a peripheral system for the pair (X, Y). If a systematic method is specified for selecting these generators, the peripheral system is, in general, a stronger invariant than the peripheral subgroup alone. In fact, it is a complete invariant for knots.

The peripheral subgroups for a tame knot K in R³ are isomorphic to Z ⊕ Z if the knot is nontrivial, Z if it is the unknot. They are generated by two elements, called a longitude [l] and a meridian [m]. (If K is the unknot, then [l] is a power of [m], and a peripheral subgroup is generated by [m] alone.) A longitude is a loop that runs from the basepoint x along a path γ to a point y on the boundary of a tubular neighborhood of K, then follows along the tube, making one full lap to return to y, then returns to x via γ. A meridian is a loop that runs from x to y, then circles around the tube, returns to y, then returns to x. (The property of being a longitude or meridian is well-defined because the tubular neighborhoods of a tame knot are all ambiently isotopic.) Note that every knot group has a longitude and meridian; if [l] and [m] are a longitude and meridian in a given peripheral subgroup, then so are [l]·[m]ⁿ and [m]⁻¹, respectively (n ∈ Z). In fact, these are the only longitudes and meridians in the subgroup, and any pair will generate the subgroup.

A peripheral system for a knot can be selected by choosing generators [l] and [m] such that the longitude l has linking number 0 with K, and the ordered triple (m′,l′,n) is a positively oriented basis for R³, where m′ is the tangent vector of m based at y, l′ is the tangent vector of l based at y, and n is an outward-pointing normal to the tube at y. (Assume that representatives l and m are chosen to be smooth on the tube and cross only at y.) If so chosen, the peripheral system is a complete invariant for knots, as proven in [Waldhausen 1968].

• Fox, Ralph H., A quick trip through knot theory, in: M.K. Fort (Ed.), "Topology of 3-Manifolds and Related Topics", Prentice-Hall, NJ, 1961, pp. 120–167. MR0140099
• Waldhausen, Friedhelm (1968), "On irreducible 3-manifolds which are sufficiently large", Annals of Mathematics, Second Series, 87 (1): 56–88, doi:10.2307/1970594, ISSN 0003-486X, JSTOR 1970594, MR 0224099
• Dehn, Max, Die beiden Kleeblattschlingen, Mathematische Annalen 75 (1914), no. 3, 402–413.