Bohr compactification

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In mathematics, the Bohr compactification of a topological group G is a compact Hausdorff topological group H that may be canonically associated to G. Its importance lies in the reduction of the theory of uniformly almost periodic functions on G to the theory of continuous functions on H. The concept is named after Harald Bohr who pioneered the study of almost periodic functions, on the real line.

Definitions and basic properties[edit]

Given a topological group G, the Bohr compactification of G is a compact Hausdorff topological group Bohr(G) and a continuous homomorphism^[1]

b: G → Bohr(G)

which is universal with respect to homomorphisms into compact Hausdorff groups; this means that if K is another compact Hausdorff topological group and

f: G → K

is a continuous homomorphism, then there is a unique continuous homomorphism

Bohr(f): Bohr(G) → K

such that f = Bohr(f) ∘ b.

Theorem. The Bohr compactification exists^[2][3] and is unique up to isomorphism.

We will denote the Bohr compactification of G by Bohr(G) and the canonical map by

${\displaystyle \mathbf {b} :G\rightarrow \mathbf {Bohr} (G).}$

The correspondence G ↦ Bohr(G) defines a covariant functor on the category of topological groups and continuous homomorphisms.

The Bohr compactification is intimately connected to the finite-dimensional unitary representation theory of a topological group. The kernel of b consists exactly of those elements of G which cannot be separated from the identity of G by finite-dimensional unitary representations.

The Bohr compactification also reduces many problems in the theory of almost periodic functions on topological groups to that of functions on compact groups.

A bounded continuous complex-valued function f on a topological group G is uniformly almost periodic if and only if the set of right translates _gf where

${\displaystyle [{}_{g}f](x)=f(g^{-1}\cdot x)}$

is relatively compact in the uniform topology as g varies through G.

Theorem. A bounded continuous complex-valued function f on G is uniformly almost periodic if and only if there is a continuous function f₁ on Bohr(G) (which is uniquely determined) such that

${\displaystyle f=f_{1}\circ \mathbf {b} .}$^[4]

Maximally almost periodic groups[edit]

Topological groups for which the Bohr compactification mapping is injective are called maximally almost periodic (or MAP groups). In the case G is a locally compact connected group, MAP groups are completely characterized: They are precisely products of compact groups with vector groups of finite dimension.

See also[edit]

• Compact space – Type of mathematical space
• Compactification (mathematics) – Embedding a topological space into a compact space as a dense subset
• Pointed set – Basic concept in set theory
• Stone–Čech compactification – a universal map from a topological space X to a compact Hausdorff space βX, such that any map from X to a compact Hausdorff space factors through βX uniquely; if X is Tychonoff, then X is a dense subspace of βXPages displaying wikidata descriptions as a fallback
• Wallman compactification – A compactification of T₁ topological spaces

References[edit]

Notes[edit]

Bibliography[edit]

Further reading[edit]

• "Bohr compactification", Encyclopedia of Mathematics, EMS Press, 2001 [1994]