Spectral/homology/sphere.hlean

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/-
Copyright (c) 2017 Kuen-Bang Hou (Favonia).
Released under Apache 2.0 license as described in the file LICENSE.
Author: Kuen-Bang Hou (Favonia)
-/
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import .homology
open eq pointed group algebra circle sphere nat equiv susp
function sphere homology int lift
namespace homology
section
parameter (theory : homology_theory)
open homology_theory
theorem Hpsphere : Π(n : )(m : ), HH theory n (plift (psphere m)) ≃g HH theory (n - m) (plift (psphere 0)) :=
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begin
intros n m, revert n, induction m with m,
{ exact λ n, isomorphism_ap (λ n, HH theory n (plift (psphere 0))) (sub_zero n)⁻¹ },
{ intro n, exact calc
HH theory n (plift (psusp (psphere m)))
≃g HH theory n (psusp (plift (psphere m))) : by exact HH_isomorphism theory n (plift_psusp (psphere m))
... ≃g HH theory (succ (pred n)) (psusp (plift (psphere m)))
: by exact isomorphism_ap (λ n, HH theory n (psusp (plift (psphere m)))) (succ_pred n)⁻¹
... ≃g HH theory (pred n) (plift (psphere m)) : by exact Hpsusp theory (pred n) (plift (psphere m))
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... ≃g HH theory (pred n - m) (plift (psphere 0)) : by exact v_0 (pred n)
... ≃g HH theory (n - succ m) (plift (psphere 0))
: by exact isomorphism_ap (λ n, HH theory n (plift (psphere 0))) (sub_sub n 1 m ⬝ ap (λ m, n - m) (add.comm 1 m))
}
end
end
end homology