G space

In geometry, a G-space is a topological space provided with a continuous group effect . Continuous group effects and the general terms defined in this context occur naturally in many mathematical problems.

definition

Let be a topological space, a ( topological or discrete ) group and ${\ displaystyle M}$ ${\ displaystyle G}$

{\ displaystyle G \ times M \ rightarrow M}

{\ displaystyle (g, x) \ mapsto gx}

a continuous effect of on , that is, a continuous mapping with ${\ displaystyle G}$ ${\ displaystyle M}$

{\ displaystyle g (hx) = (gh) x}

for everyone as well ${\ displaystyle g, h \ in G, x \ in M}$

{\ displaystyle ex = x}

for the neutral element and all , then it is called G-space. ${\ displaystyle e \ in G}$ ${\ displaystyle x \ in M}$ ${\ displaystyle M}$

More terms

In the following, let it be a G-space, the product topology and the path space the quotient topology . ${\ displaystyle M}$ ${\ displaystyle G \ times M}$ ${\ displaystyle G \ backslash M}$

Transitive effect

One effect is transitive , if for every pair one with there. ${\ displaystyle G \ times M \ rightarrow M}$ ${\ displaystyle (x, y) \ in M \ times M}$ ${\ displaystyle g \ in G}$ ${\ displaystyle gx = y}$

If transitive acts on, then is homeomorphic to with the quotient topology, where the stabilizer is an (arbitrary) element . ${\ displaystyle G}$ ${\ displaystyle M}$ ${\ displaystyle M}$ ${\ displaystyle G / G_ {x}}$ ${\ displaystyle G_ {x} = \ left \ {g \ in G: gx = x \ right \}}$ ${\ displaystyle x \ in M}$

Free effect

An effect is called free if it always follows from (with and ) . ${\ displaystyle G \ times M \ rightarrow M}$ ${\ displaystyle gx = x}$ ${\ displaystyle g \ in G}$ ${\ displaystyle x \ in M}$ ${\ displaystyle g = e}$

An effect is free if, for all of them, the stabilizer consists only of the neutral element. ${\ displaystyle x \ in M}$ ${\ displaystyle G_ {x} \ subset G}$

Effective effect

One effect is effective (or true ), if for every one with there. ${\ displaystyle g \ not = e}$ ${\ displaystyle x \ in M}$ ${\ displaystyle gx \ not = x}$

An effect is then only effective if the corresponding homomorphism of in the group of homeomorphisms of is a monomorphism . ${\ displaystyle G}$ ${\ displaystyle X}$

Fixed points

The fixed points of an element are the elements with . ${\ displaystyle g \ in G}$ ${\ displaystyle x \ in M}$ ${\ displaystyle gx = x}$

A point is called the global fixed point of the group effect if it applies to all . ${\ displaystyle x \ in M}$ ${\ displaystyle gx = x}$ ${\ displaystyle g \ in G}$

Actual effect

An effect actually means when it is through ${\ displaystyle G \ times M \ rightarrow M}$

{\ displaystyle (g, x) \ rightarrow (x, gx)}

given figure is an actual figure . ${\ displaystyle \ rho: G \ times X \ rightarrow X \ times X}$

If the effect of on is actually Hausdorffsch and all orbits are closed. The stabilizer of each point is compact and the map is a homeomorphism . ${\ displaystyle G}$ ${\ displaystyle M}$ ${\ displaystyle G \ backslash M}$ ${\ displaystyle Gx}$ ${\ displaystyle G / G_ {x} \ rightarrow Gx}$

Actually discontinuous action, discontinuity area

An effect is actually called discontinuous if there is an environment for everyone for which ${\ displaystyle G \ times M \ rightarrow M}$ ${\ displaystyle x \ in M}$ ${\ displaystyle U}$

{\ displaystyle \ sharp \ left \ {g \ in G: gU \ cap U \ not = \ emptyset \ right \} <\ infty}

.

A free effect is actually discontinuous if and only if the projection is an overlay . ${\ displaystyle M \ rightarrow G \ backslash M}$

An -invariant, open subset is called a discontinuity domain if the effect of on is actually discontinuous. In general, a maximum discontinuity area need not be uniquely determined. ${\ displaystyle G}$ ${\ displaystyle \ Omega \ subset M}$ ${\ displaystyle G}$ ${\ displaystyle U}$

In the case of a Klein group and its effect on the sphere at infinity there is a definite maximum discontinuity area, this is the complement of the Limes set and is often referred to as the discontinuity area of the Klein group. (This also applies more generally to discrete groups of isometries of Hadamard manifolds and their effect on the sphere at infinity.)

Co-compact effect

An effect is called co-compact when the orbit space is compact. ${\ displaystyle G \ times M \ rightarrow M}$ ${\ displaystyle G \ backslash M}$

An effect is co-compact when there is a compact fundamental domain .

Geometric effect

An effect is called geometric (English: geometric action ) if it is actually discontinuous and co-compact.

swell

^ Tammo tom Dieck : Algebraic Topology . European Mathematical Society Publishing House, Zurich 2008, ISBN 978-3-03719-048-7 , pp. 17 .
^ Properly discontinuous actions

[1] Tammo tom Dieck : Algebraic Topology . European Mathematical Society Publishing House, Zurich 2008, ISBN 978-3-03719-048-7 , pp. 17 .

[2] Properly discontinuous actions