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Learning.IsAlgEnvSeq.adapted_history๐Ÿ”—

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adapted_history๐Ÿ”—

LemmaLearning.IsAlgEnvSeq.adapted_history

No docstring.

๐Ÿ”—theorem
Learning.IsAlgEnvSeq.adapted_history.{u_1, u_2, u_3} {๐“ : Type u_1} {๐“จ : Type u_2} {ฮฉ : Type u_3} {m๐“ : MeasurableSpace ๐“} {m๐“จ : MeasurableSpace ๐“จ} {mฮฉ : MeasurableSpace ฮฉ} {A : โ„• โ†’ ฮฉ โ†’ ๐“} {Y : โ„• โ†’ ฮฉ โ†’ ๐“จ} (hA : โˆ€ (n : โ„•), Measurable (A n)) (hY : โˆ€ (n : โ„•), Measurable (Y n)) : MeasureTheory.Adapted (filtration hA hY) (history A Y)
Learning.IsAlgEnvSeq.adapted_history.{u_1, u_2, u_3} {๐“ : Type u_1} {๐“จ : Type u_2} {ฮฉ : Type u_3} {m๐“ : MeasurableSpace ๐“} {m๐“จ : MeasurableSpace ๐“จ} {mฮฉ : MeasurableSpace ฮฉ} {A : โ„• โ†’ ฮฉ โ†’ ๐“} {Y : โ„• โ†’ ฮฉ โ†’ ๐“จ} (hA : โˆ€ (n : โ„•), Measurable (A n)) (hY : โˆ€ (n : โ„•), Measurable (Y n)) : MeasureTheory.Adapted (filtration hA hY) (history A Y)

Code

lemma IsAlgEnvSeq.adapted_history
    (hA : โˆ€ n, Measurable (A n)) (hY : โˆ€ n, Measurable (Y n)) :
    Adapted (filtration hA hY) (history A Y)
Type uses (2)

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Proof
fun _ โ†ฆ measurable_iff_comap_le.mpr le_rfl

Dependency graph

Type dependencies (2)

filtration๐Ÿ”—

DefinitionLearning.IsAlgEnvSeq.filtration

Filtration generated by the history up to time n.

๐Ÿ”—def
Learning.IsAlgEnvSeq.filtration.{u_1, u_2, u_3} {๐“ : Type u_1} {๐“จ : Type u_2} {ฮฉ : Type u_3} {m๐“ : MeasurableSpace ๐“} {m๐“จ : MeasurableSpace ๐“จ} {mฮฉ : MeasurableSpace ฮฉ} {A : โ„• โ†’ ฮฉ โ†’ ๐“} {Y : โ„• โ†’ ฮฉ โ†’ ๐“จ} (hA : โˆ€ (n : โ„•), Measurable (A n)) (hY : โˆ€ (n : โ„•), Measurable (Y n)) : MeasureTheory.Filtration โ„• mฮฉ
Learning.IsAlgEnvSeq.filtration.{u_1, u_2, u_3} {๐“ : Type u_1} {๐“จ : Type u_2} {ฮฉ : Type u_3} {m๐“ : MeasurableSpace ๐“} {m๐“จ : MeasurableSpace ๐“จ} {mฮฉ : MeasurableSpace ฮฉ} {A : โ„• โ†’ ฮฉ โ†’ ๐“} {Y : โ„• โ†’ ฮฉ โ†’ ๐“จ} (hA : โˆ€ (n : โ„•), Measurable (A n)) (hY : โˆ€ (n : โ„•), Measurable (Y n)) : MeasureTheory.Filtration โ„• mฮฉ

Code

def IsAlgEnvSeq.filtration (hA : โˆ€ n, Measurable (A n)) (hY : โˆ€ n, Measurable (Y n)) :
    Filtration โ„• mฮฉ where
  seq i := MeasurableSpace.comap (history A Y i) inferInstance
  mono' i j hij := by
    simp only
    rw [โ† measurable_iff_comap_le]
    have : history A Y i = (fun h k โ†ฆ h โŸจk.1, by grindโŸฉ) โˆ˜ history A Y j := rfl
    rw [this]
    exact measurable_comp_comap _ (by fun_prop)
  le' i := by
    rw [โ† measurable_iff_comap_le]
    exact Learning.measurable_history hA hY i
Body uses (3)
Used by (18)

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history๐Ÿ”—

DefinitionLearning.history

History of the algorithm-environment sequence up to time n.

๐Ÿ”—def
Learning.history.{u_1, u_2, u_3} {๐“ : Type u_1} {๐“จ : Type u_2} {ฮฉ : Type u_3} (A : โ„• โ†’ ฮฉ โ†’ ๐“) (Y : โ„• โ†’ ฮฉ โ†’ ๐“จ) (n : โ„•) (ฯ‰ : ฮฉ) : โ†ฅ(Finset.Iic n) โ†’ ๐“ ร— ๐“จ
Learning.history.{u_1, u_2, u_3} {๐“ : Type u_1} {๐“จ : Type u_2} {ฮฉ : Type u_3} (A : โ„• โ†’ ฮฉ โ†’ ๐“) (Y : โ„• โ†’ ฮฉ โ†’ ๐“จ) (n : โ„•) (ฯ‰ : ฮฉ) : โ†ฅ(Finset.Iic n) โ†’ ๐“ ร— ๐“จ

Code

def history (A : โ„• โ†’ ฮฉ โ†’ ๐“) (Y : โ„• โ†’ ฮฉ โ†’ ๐“จ) (n : โ„•) (ฯ‰ : ฮฉ) : Iic n โ†’ ๐“ ร— ๐“จ :=
  fun i โ†ฆ (A i ฯ‰, Y i ฯ‰)
Used by (72)

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All dependencies, transitively (2)

measurable_comp_comap๐Ÿ”—

LemmaMeasureTheory.measurable_comp_comap

No docstring.

๐Ÿ”—theorem
MeasureTheory.measurable_comp_comap.{u_1, u_2, u_3} {ฮฑ : Type u_1} {ฮฒ : Type u_2} {ฮณ : Type u_3} {mฮฒ : MeasurableSpace ฮฒ} {mฮณ : MeasurableSpace ฮณ} (f : ฮฑ โ†’ ฮฒ) {g : ฮฒ โ†’ ฮณ} (hg : Measurable g) : Measurable (g โˆ˜ f)
MeasureTheory.measurable_comp_comap.{u_1, u_2, u_3} {ฮฑ : Type u_1} {ฮฒ : Type u_2} {ฮณ : Type u_3} {mฮฒ : MeasurableSpace ฮฒ} {mฮณ : MeasurableSpace ฮณ} (f : ฮฑ โ†’ ฮฒ) {g : ฮฒ โ†’ ฮณ} (hg : Measurable g) : Measurable (g โˆ˜ f)

Code

lemma measurable_comp_comap (f : ฮฑ โ†’ ฮฒ) {g : ฮฒ โ†’ ฮณ} (hg : Measurable g) :
    Measurable[mฮฒ.comap f] (g โˆ˜ f)
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Proof
by
  rw [measurable_iff_comap_le, โ† MeasurableSpace.comap_comp]
  exact MeasurableSpace.comap_mono hg.comap_le

measurable_history๐Ÿ”—

LemmaLearning.measurable_history

No docstring.

๐Ÿ”—theorem
Learning.measurable_history.{u_1, u_2, u_3} {๐“ : Type u_1} {๐“จ : Type u_2} {ฮฉ : Type u_3} {m๐“ : MeasurableSpace ๐“} {m๐“จ : MeasurableSpace ๐“จ} {mฮฉ : MeasurableSpace ฮฉ} {A : โ„• โ†’ ฮฉ โ†’ ๐“} {Y : โ„• โ†’ ฮฉ โ†’ ๐“จ} (hA : โˆ€ (n : โ„•), Measurable (A n)) (hY : โˆ€ (n : โ„•), Measurable (Y n)) (n : โ„•) : Measurable (history A Y n)
Learning.measurable_history.{u_1, u_2, u_3} {๐“ : Type u_1} {๐“จ : Type u_2} {ฮฉ : Type u_3} {m๐“ : MeasurableSpace ๐“} {m๐“จ : MeasurableSpace ๐“จ} {mฮฉ : MeasurableSpace ฮฉ} {A : โ„• โ†’ ฮฉ โ†’ ๐“} {Y : โ„• โ†’ ฮฉ โ†’ ๐“จ} (hA : โˆ€ (n : โ„•), Measurable (A n)) (hY : โˆ€ (n : โ„•), Measurable (Y n)) (n : โ„•) : Measurable (history A Y n)

Code

lemma measurable_history (hA : โˆ€ n, Measurable (A n))
    (hY : โˆ€ n, Measurable (Y n)) (n : โ„•) :
    Measurable (history A Y n)
Type uses (1)
Used by (10)

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Proof
by
  unfold history
  fun_prop