Continuous Group of Transformations

Abstract

Let B be Banach algebra and M be topological space. If there exists homeomorphism \[ f:M→ N \] of topological space M into convex set N of the space Bn, then homeomorphism f is called chart of the set M. The set M is called simple B-manifold of class Ck if for any two charts \[ f1:M→ N1⊂eq Bn \] \[ f2:M→ N2⊂eq Bn \] there exists diffeomorphism \[ f: Bn→ Bn \] of class Ck such that \[ f1 f=f2 \] Topological space M is called differential B-manifold of class Ck if topological space M is a union of simple B-manifolds Mi, i∈ I, and intersection Mi Mj of simple B-manifolds Mi, Mj is also simple B-manifold. Differential B-manifold G equipped with group structure such that map \[ (f,g)→ fg-1 \] is differentiable is called Lie group. Module TeG equipped with product \[ [v,w]c= RLjmc(vm,wj) -RLmjc(wj,vm) ∈ TeG \] is Lie algebra gL of Lie group G.

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