def
definition
extendPeriodic8
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IndisputableMonolith.Streams on GitHub at line 42.
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explainer page
depends on
used by
-
blockSumAligned8_periodic -
extendPeriodic8 -
observeAvg8_periodic_eq_Z -
subBlockSum8_periodic_eq_Z -
extendPeriodic8_eq_mod -
extendPeriodic8_in_cylinder -
extendPeriodic8_period -
extendPeriodic8_zero -
sumFirst8_extendPeriodic_eq_Z -
blockSumAligned8_periodic -
extendPeriodic8 -
observeAvg8_periodic_eq_Z -
sampleW -
subBlockSum8_periodic_eq_Z -
sumFirst8_extendPeriodic_eq_Z
formal source
39 · intro _; exact (mem_Cylinder_zero w s)
40
41/-- Periodic extension of an 8‑bit window. -/
42def extendPeriodic8 (w : Pattern 8) : Stream := fun t =>
43 let h8 : 0 < 8 := by decide
44 let i : Fin 8 := ⟨t % 8, Nat.mod_lt _ h8⟩
45 w i
46
47@[simp] lemma extendPeriodic8_zero (w : Pattern 8) : extendPeriodic8 w 0 = w ⟨0, by decide⟩ := by
48 simp [extendPeriodic8]
49
50@[simp] lemma extendPeriodic8_eq_mod (w : Pattern 8) (t : Nat) :
51 extendPeriodic8 w t = w ⟨t % 8, Nat.mod_lt _ (by decide)⟩ := by
52 rfl
53
54lemma extendPeriodic8_period (w : Pattern 8) (t : Nat) :
55 extendPeriodic8 w (t + 8) = extendPeriodic8 w t := by
56 dsimp [extendPeriodic8]
57 have hmod : (t + 8) % 8 = t % 8 := by
58 rw [Nat.add_mod]
59 simp
60 have h8 : 0 < 8 := by decide
61 have hfin : (⟨(t + 8) % 8, Nat.mod_lt _ h8⟩ : Fin 8)
62 = ⟨t % 8, Nat.mod_lt _ h8⟩ := by
63 apply Fin.mk_eq_mk.mpr
64 exact hmod
65 rw [hfin]
66
67/-- Sum of the first `m` bits of a stream. -/
68def sumFirst (m : Nat) (s : Stream) : Nat :=
69 ∑ i : Fin m, (if s i.val then 1 else 0)
70
71/-- Base case: the sum of the first 0 bits is 0. -/
72@[simp] lemma sumFirst_zero (s : Stream) : sumFirst 0 s = 0 := by