User:Jheald/sandbox/GA/Some groups found in GA

(From Lundholm, Svensson (2009) "Clifford algebra, geometric algebra, and applications", Archiv 0907.5356v1.pdf; p. 58) -- or Lounesto §17.2, p.220.

The following are some of the groups that can be identified in a Clifford Algebra ${\displaystyle {\mathcal {G}}}$:

• the group of all invertible elements: ${\displaystyle {\mathcal {G}}^{\times }:=\{x\in {\mathcal {G}}:\exists y\in {\mathcal {G}}:xy=yx=1\}}$
• the Lipschitz group (after Rudolf Lipschitz 1880/86): ${\displaystyle {\tilde {\Gamma }}:=\{x\in {\mathcal {G}}^{\times }:x^{*}Vx^{-1}\subseteq V\}}$
• the versor group: ${\displaystyle \Gamma :=\{v_{1}v_{2}\dots v_{k}\in G:v_{i}\in V^{\times }\}}$

  ... but these are blades, not versors -- has a line got lost?

• (Pin group) the group of unit versors: ${\displaystyle \mathrm {Pin} :=\{x\in \Gamma :xx^{\dagger }=\pm 1\}}$
• (Spin group) the group of even unit versors: ${\displaystyle \mathrm {Spin} :=\mathrm {Pin} \cap {\mathcal {G}}^{+}}$
• the rotor group: ${\displaystyle \mathrm {Spin+} :=\{x\in \mathrm {Spin} :xx^{\dagger }=1\}}$

where ${\displaystyle V^{\times }:=\{v\in V:v^{2}\neq 0\}}$ is the set of invertible vectors.

• It is an important property of Clifford algebras that ${\displaystyle \Gamma ={\tilde {\Gamma }}}$
  • (Really? surely a typical rotor is a member of the first, but it is not a blade (the second group)).