Extension of a topological group

In mathematics, more specifically in topological groups, an extension of topological groups, or a topological extension, is a short exact sequence ${\displaystyle 0\to H\stackrel{ı}{\to }X\stackrel{\pi }{\to }G\to 0}$ where ${\displaystyle H,X}$ and ${\displaystyle G}$ are topological groups and ${\displaystyle i}$ and ${\displaystyle \pi }$ are continuous homomorphisms which are also open onto their images.^[1] Every extension of topological groups is therefore a group extension.

We say that the topological extensions

${\displaystyle 0\to H\stackrel{i}{\to }X\stackrel{\pi }{\to }G\to 0}$

and

${\displaystyle 0\to H\stackrel{i^{\prime }}{\to }{X}^{\prime }\stackrel{{\pi }^{\prime }}{\to }G\to 0}$

are equivalent (or congruent) if there exists a topological isomorphism ${\displaystyle T:X\to X^{\prime }}$ making commutative the diagram of Figure 1.

We say that the topological extension

${\displaystyle 0\to H\stackrel{i}{\to }X\stackrel{\pi }{\to }G\to 0}$

is a split extension (or splits) if it is equivalent to the trivial extension

${\displaystyle 0\to H\stackrel{i_H}{\to }H\times G\stackrel{{\pi }_G}{\to }G\to 0}$

where ${\displaystyle i_H:H\to H\times G}$ is the natural inclusion over the first factor and ${\displaystyle {\pi }_G:H\times G\to G}$ is the natural projection over the second factor.

It is easy to prove that the topological extension ${\displaystyle 0\to H\stackrel{i}{\to }X\stackrel{\pi }{\to }G\to 0}$ splits if and only if there is a continuous homomorphism ${\displaystyle R:X\to H}$ such that ${\displaystyle R\circ i}$ is the identity map on ${\displaystyle H}$

Note that the topological extension ${\displaystyle 0\to H\stackrel{i}{\to }X\stackrel{\pi }{\to }G\to 0}$ splits if and only if the subgroup ${\displaystyle i(H)}$ is a topological direct summand of ${\displaystyle X}$

• Take ${\displaystyle ℝ}$ the real numbers and ${\displaystyle \mathbb{Z}}$ the integer numbers. Take ${\displaystyle ı}$ the natural inclusion and ${\displaystyle \pi }$ the natural projection. Then

${\displaystyle 0\to \mathbb{Z}\stackrel{ı}{\to }ℝ\stackrel{\pi }{\to }ℝ/\mathbb{Z}\to 0}$

is an extension of topological abelian groups. Indeed it is an example of a non-splitting extension.

An extension of topological abelian groups will be a short exact sequence ${\displaystyle 0\to H\stackrel{ı}{\to }X\stackrel{\pi }{\to }G\to 0}$ where ${\displaystyle H,X}$ and ${\displaystyle G}$ are locally compact abelian groups and ${\displaystyle i}$ and ${\displaystyle \pi }$ are relatively open continuous homomorphisms.^[2]

• Let be an extension of locally compact abelian groups

${\displaystyle 0\to H\stackrel{ı}{\to }X\stackrel{\pi }{\to }G\to 0.}$

Take ${\displaystyle H^{\wedge },X^{\wedge }}$ and ${\displaystyle G^{\wedge }}$ the Pontryagin duals of ${\displaystyle H,X}$ and ${\displaystyle G}$ and take ${\displaystyle i^{\wedge }}$ and ${\displaystyle {\pi }^{\wedge }}$ the dual maps of ${\displaystyle i}$ and ${\displaystyle \pi }$. Then the sequence

${\displaystyle 0\to G^{\wedge }\stackrel{{\pi }^{\wedge }}{\to }{X}^{\wedge }\stackrel{{ı}^{\wedge }}{\to }{H}^{\wedge }\to 0}$

is an extension of locally compact abelian groups.

A very special kind of topological extensions are the ones of the form ${\displaystyle 0\to 𝕋\stackrel{i}{\to }X\stackrel{\pi }{\to }G\to 0}$ where ${\displaystyle 𝕋}$ is the unit circle and ${\displaystyle X}$ and ${\displaystyle G}$ are topological abelian groups.^[3]

A topological abelian group ${\displaystyle G}$ belongs to the class ${\displaystyle 𝒮(𝕋)}$ if and only if every topological extension of the form ${\displaystyle 0\to 𝕋\stackrel{i}{\to }X\stackrel{\pi }{\to }G\to 0}$ splits

• Every locally compact abelian group belongs to ${\displaystyle 𝒮(𝕋)}$. In other words every topological extension ${\displaystyle 0\to 𝕋\stackrel{i}{\to }X\stackrel{\pi }{\to }G\to 0}$ where ${\displaystyle G}$ is a locally compact abelian group, splits.

• Every locally precompact abelian group belongs to ${\displaystyle 𝒮(𝕋)}$.

• The Banach space (and in particular topological abelian group) ${\displaystyle {\ell }^1}$ does not belong to ${\displaystyle 𝒮(𝕋)}$.

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