Merge branch 'master' of https://github.com/cmu-phil/Spectral
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commit
55b831d713
1 changed files with 50 additions and 6 deletions
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@ -1,6 +1,20 @@
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import .spectrum .EM
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-- TODO move this
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namespace int
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definition max0_le_of_le {n : ℤ} {m : ℕ} (H : n ≤ of_nat m)
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: nat.le (max0 n) m :=
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begin
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induction n with n n,
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{ exact le_of_of_nat_le_of_nat H },
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{ exact nat.zero_le m }
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end
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end int
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open int trunc eq is_trunc lift unit pointed equiv is_equiv algebra EM
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namespace spectrum
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definition trunc_int.{u} (k : ℤ) (X : Type.{u}) : Type.{u} :=
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@ -60,13 +74,35 @@ begin
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{ -- case = -1
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exact is_trunc -1 X },
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{ -- case < -1
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exact lift unit } }
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exact is_contr X } }
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end
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definition is_trunc_int_change_int {k l : ℤ} (X : Type) (p : k = l)
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: is_trunc_int k X → is_trunc_int l X :=
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begin induction p, exact id end
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definition is_trunc_int_loop (A : pType) (k : ℤ)
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: is_trunc_int (k + 1) A → is_trunc_int k (Ω A) :=
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begin
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intro H, induction k with k k,
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{ apply is_trunc_loop, exact H },
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{ cases k with k,
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{ apply is_trunc_loop, exact H},
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{ apply is_trunc_loop, cases k with k,
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{ exact H },
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{ apply is_trunc_succ, exact H } } }
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end
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definition is_trunc_of_is_trunc_int (k : ℤ) (X : Type)
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: is_trunc_int k X → is_trunc (max0 k) X :=
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begin
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intro H, induction k with k k,
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{ exact H },
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{ cases k with k,
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{ apply is_trunc_succ, exact H },
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{ apply is_trunc_of_is_contr, exact H } }
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end
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definition is_strunc (k : ℤ) (E : spectrum) : Type :=
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Π (n : ℤ), is_trunc_int (k + n) (E n)
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@ -84,7 +120,7 @@ begin
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{ -- case = -1
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exact is_trunc_trunc -1 X },
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{ -- case < -1
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exact up unit.star } }
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apply is_trunc_lift } }
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end
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definition is_trunc_ptrunc_int (k : ℤ) (X : pType)
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@ -97,7 +133,7 @@ begin
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{ -- case = -1
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apply is_trunc_lift, apply is_trunc_unit },
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{ -- case < -1
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exact up unit.star } }
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apply is_trunc_lift, apply is_trunc_unit } }
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end
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definition is_strunc_strunc (k : ℤ) (E : spectrum)
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@ -111,16 +147,24 @@ begin
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{ -- case ≥ 0
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apply is_trunc_int_change_int (EM G n) (zero_add n)⁻¹,
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apply is_trunc_EM },
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{ cases n,
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{ induction n with n IH,
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{ -- case = -1
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apply is_trunc_loop, exact ab_group.is_set_carrier G },
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{ -- case < -1
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exact up unit.star }}
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apply is_trunc_int_loop, exact IH }}
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end
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definition trivial_shomotopy_group_of_is_strunc (E : spectrum)
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{n k : ℤ} (K : is_strunc n E) (H : n < k)
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: is_contr (πₛ[k] E) :=
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sorry
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let m := n + (2 - k) in
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have I : m < 2, from
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calc
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m = (2 - k) + n : int.add_comm n (2 - k)
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... < (2 - k) + k : add_lt_add_left H (2 - k)
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... = 2 : sub_add_cancel 2 k,
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@trivial_homotopy_group_of_is_trunc (E (2 - k)) (max0 m) 2
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(is_trunc_of_is_trunc_int m (E (2 - k)) (K (2 - k)))
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(nat.succ_le_succ (max0_le_of_le (le_sub_one_of_lt I)))
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end spectrum
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