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import Mathlib.Logic.Equiv.Defs
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import Mathlib.Topology.Basic
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import Mathlib.Topology.Homeomorph
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import Mathlib.Topology.Algebra.ConstMulAction
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import Rubin.LocallyDense
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import Rubin.Topology
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import Rubin.Support
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import Rubin.RegularSupport
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structure HomeoGroup (α : Type _) [TopologicalSpace α] extends Homeomorph α α
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variable {α : Type _}
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variable [TopologicalSpace α]
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def HomeoGroup.coe : HomeoGroup α -> Homeomorph α α := HomeoGroup.toHomeomorph
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def HomeoGroup.from : Homeomorph α α -> HomeoGroup α := HomeoGroup.mk
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instance homeoGroup_coe : Coe (HomeoGroup α) (Homeomorph α α) where
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coe := HomeoGroup.coe
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instance homeoGroup_coe₂ : Coe (Homeomorph α α) (HomeoGroup α) where
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coe := HomeoGroup.from
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def HomeoGroup.toPerm : HomeoGroup α → Equiv.Perm α := fun g => g.coe.toEquiv
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instance homeoGroup_coe_perm : Coe (HomeoGroup α) (Equiv.Perm α) where
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coe := HomeoGroup.toPerm
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@[simp]
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theorem HomeoGroup.toPerm_def (g : HomeoGroup α) : g.coe.toEquiv = (g : Equiv.Perm α) := rfl
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@[simp]
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theorem HomeoGroup.mk_coe (g : HomeoGroup α) : HomeoGroup.mk (g.coe) = g := rfl
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@[simp]
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theorem HomeoGroup.eq_iff_coe_eq {f g : HomeoGroup α} : f.coe = g.coe ↔ f = g := by
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constructor
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{
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intro f_eq_g
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rw [<-HomeoGroup.mk_coe f]
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rw [f_eq_g]
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simp
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}
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{
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intro f_eq_g
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unfold HomeoGroup.coe
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rw [f_eq_g]
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}
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@[simp]
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theorem HomeoGroup.from_toHomeomorph (m : Homeomorph α α) : (HomeoGroup.from m).toHomeomorph = m := rfl
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instance homeoGroup_one : One (HomeoGroup α) where
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one := HomeoGroup.from (Homeomorph.refl α)
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theorem HomeoGroup.one_def : (1 : HomeoGroup α) = (Homeomorph.refl α : HomeoGroup α) := rfl
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instance homeoGroup_inv : Inv (HomeoGroup α) where
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inv := fun g => HomeoGroup.from (g.coe.symm)
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@[simp]
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theorem HomeoGroup.inv_def (g : HomeoGroup α) : (Homeomorph.symm g.coe : HomeoGroup α) = g⁻¹ := rfl
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theorem HomeoGroup.coe_inv {g : HomeoGroup α} : HomeoGroup.coe (g⁻¹) = (HomeoGroup.coe g).symm := rfl
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instance homeoGroup_mul : Mul (HomeoGroup α) where
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mul := fun a b => ⟨b.toHomeomorph.trans a.toHomeomorph⟩
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theorem HomeoGroup.coe_mul {f g : HomeoGroup α} : HomeoGroup.coe (f * g) = (HomeoGroup.coe g).trans (HomeoGroup.coe f) := rfl
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@[simp]
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theorem HomeoGroup.mul_def (f g : HomeoGroup α) : HomeoGroup.from ((HomeoGroup.coe g).trans (HomeoGroup.coe f)) = f * g := rfl
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instance homeoGroup_group : Group (HomeoGroup α) where
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mul_assoc := by
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intro a b c
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rw [<-HomeoGroup.eq_iff_coe_eq]
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repeat rw [HomeoGroup_coe_mul]
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rfl
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mul_one := by
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intro a
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rw [<-HomeoGroup.eq_iff_coe_eq]
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rw [HomeoGroup.coe_mul]
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rfl
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one_mul := by
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intro a
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rw [<-HomeoGroup.eq_iff_coe_eq]
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rw [HomeoGroup.coe_mul]
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rfl
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mul_left_inv := by
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intro a
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rw [<-HomeoGroup.eq_iff_coe_eq]
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rw [HomeoGroup.coe_mul]
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rw [HomeoGroup.coe_inv]
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simp
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rfl
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/--
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The HomeoGroup trivially has a continuous and faithful `MulAction` on the underlying topology `α`.
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--/
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instance homeoGroup_smul₁ : SMul (HomeoGroup α) α where
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smul := fun g x => g.toFun x
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@[simp]
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theorem HomeoGroup.smul₁_def (f : HomeoGroup α) (x : α) : f.toFun x = f • x := rfl
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@[simp]
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theorem HomeoGroup.smul₁_def' (f : HomeoGroup α) (x : α) : f.toHomeomorph x = f • x := rfl
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@[simp]
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theorem HomeoGroup.coe_toFun_eq_smul₁ (f : HomeoGroup α) (x : α) : FunLike.coe (HomeoGroup.coe f) x = f • x := rfl
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instance homeoGroup_mulAction₁ : MulAction (HomeoGroup α) α where
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one_smul := by
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intro x
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rfl
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mul_smul := by
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intro f g x
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rfl
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instance homeoGroup_mulAction₁_continuous : ContinuousConstSMul (HomeoGroup α) α where
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continuous_const_smul := by
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intro h
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constructor
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intro S S_open
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conv => {
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congr; ext
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congr; ext
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rw [<-HomeoGroup.smul₁_def']
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}
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simp only [Homeomorph.isOpen_preimage]
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exact S_open
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instance homeoGroup_mulAction₁_faithful : FaithfulSMul (HomeoGroup α) α where
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eq_of_smul_eq_smul := by
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intro f g hyp
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rw [<-HomeoGroup.eq_iff_coe_eq]
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ext x
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simp
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exact hyp x
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theorem HomeoGroup.smulImage_eq_image (g : HomeoGroup α) (S : Set α) :
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g •'' S = ⇑g.toHomeomorph '' S := rfl
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section FromContinuousConstSMul
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variable {G : Type _} [Group G]
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variable [MulAction G α] [ContinuousConstSMul G α]
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/--
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`fromContinuous` is a structure-preserving transformation from a continuous `MulAction` to a `HomeoGroup`
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--/
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def HomeoGroup.fromContinuous (α : Type _) [TopologicalSpace α] [MulAction G α] [ContinuousConstSMul G α]
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(g : G) : HomeoGroup α :=
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HomeoGroup.from (Homeomorph.smul g)
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@[simp]
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theorem HomeoGroup.fromContinuous_def (g : G) :
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HomeoGroup.from (Homeomorph.smul g) = HomeoGroup.fromContinuous α g := rfl
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@[simp]
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theorem HomeoGroup.fromContinuous_smul (g : G) :
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∀ x : α, (HomeoGroup.fromContinuous α g) • x = g • x :=
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by
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intro x
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unfold fromContinuous
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rw [<-HomeoGroup.smul₁_def', HomeoGroup.from_toHomeomorph]
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unfold Homeomorph.smul
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simp
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theorem HomeoGroup.fromContinuous_one :
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HomeoGroup.fromContinuous α (1 : G) = (1 : HomeoGroup α) :=
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by
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apply FaithfulSMul.eq_of_smul_eq_smul (α := α)
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simp
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theorem HomeoGroup.fromContinuous_mul (g h : G):
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(HomeoGroup.fromContinuous α g) * (HomeoGroup.fromContinuous α h) = (HomeoGroup.fromContinuous α (g * h)) :=
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by
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apply FaithfulSMul.eq_of_smul_eq_smul (α := α)
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intro x
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rw [mul_smul]
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simp
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rw [mul_smul]
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theorem HomeoGroup.fromContinuous_inv (g : G):
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HomeoGroup.fromContinuous α g⁻¹ = (HomeoGroup.fromContinuous α g)⁻¹ :=
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by
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apply FaithfulSMul.eq_of_smul_eq_smul (α := α)
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intro x
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group_action
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rw [mul_smul]
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simp
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theorem HomeoGroup.fromContinuous_eq_iff [FaithfulSMul G α] (g h : G):
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(HomeoGroup.fromContinuous α g) = (HomeoGroup.fromContinuous α h) ↔ g = h :=
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by
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constructor
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· intro cont_eq
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apply FaithfulSMul.eq_of_smul_eq_smul (α := α)
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intro x
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rw [<-HomeoGroup.fromContinuous_smul g]
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rw [cont_eq]
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simp
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· tauto
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@[simp]
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theorem HomeoGroup.fromContinuous_support (g : G) :
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Rubin.Support α (HomeoGroup.fromContinuous α g) = Rubin.Support α g :=
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by
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ext x
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repeat rw [Rubin.mem_support]
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rw [<-HomeoGroup.smul₁_def, <-HomeoGroup.fromContinuous_def]
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rw [HomeoGroup.from_toHomeomorph]
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rw [Homeomorph.smul]
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simp only [Equiv.toFun_as_coe, MulAction.toPerm_apply]
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@[simp]
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theorem HomeoGroup.fromContinuous_regularSupport (g : G) :
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Rubin.RegularSupport α (HomeoGroup.fromContinuous α g) = Rubin.RegularSupport α g :=
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by
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unfold Rubin.RegularSupport
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rw [HomeoGroup.fromContinuous_support]
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@[simp]
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theorem HomeoGroup.fromContinuous_smulImage (g : G) (V : Set α) :
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(HomeoGroup.fromContinuous α g) •'' V = g •'' V :=
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by
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repeat rw [Rubin.smulImage_def]
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simp
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def HomeoGroup.fromContinuous_embedding (α : Type _) [TopologicalSpace α] [MulAction G α] [ContinuousConstSMul G α] [FaithfulSMul G α]: G ↪ (HomeoGroup α) where
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toFun := fun (g : G) => HomeoGroup.fromContinuous α g
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inj' := by
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intro g h fromCont_eq
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simp at fromCont_eq
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apply FaithfulSMul.eq_of_smul_eq_smul (α := α)
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intro x
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rw [<-fromContinuous_smul, fromCont_eq, fromContinuous_smul]
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@[simp]
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theorem HomeoGroup.fromContinuous_embedding_toFun [FaithfulSMul G α] (g : G):
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HomeoGroup.fromContinuous_embedding α g = HomeoGroup.fromContinuous α g := rfl
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def HomeoGroup.fromContinuous_monoidHom (α : Type _) [TopologicalSpace α] [MulAction G α] [ContinuousConstSMul G α] [FaithfulSMul G α]: G →* (HomeoGroup α) where
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toFun := fun (g : G) => HomeoGroup.fromContinuous α g
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map_one' := by
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simp
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rw [fromContinuous_one]
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map_mul' := by
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simp
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intros
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rw [fromContinuous_mul]
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end FromContinuousConstSMul
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