Add documentation to some modules.
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@@ -1,7 +1,17 @@
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import Mathlib.Tactic.TypeStar
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/-!
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Interpretation to a semantic domain.
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This file serves to introduce the double-angle-bracket "denotation"
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notation by prodiving a class instance `Interp`, whose single
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method `interp` is what the double brackets map to. -/
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namespace Spa
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/-- A type `α` that implements this class has denotation / meaning
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in the semantic domain `dom`. -/
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class Interp (α : Type*) (dom : outParam Type*) where
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interp : α → dom
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@@ -1,7 +1,19 @@
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import Mathlib.Data.Finset.Basic
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/-!
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Base language.
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This file defines the core object language for the program analysis and
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transformation. It's a very basic imperative language. The `Spa/Language/Tagged/Basic.lean`
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file provides an auto-derived version of the `Expr`, `BasicStmt`, and `Stmt` data
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types with unique IDs per condtructor, enabling in-AST pointers.
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-/
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namespace Spa
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/-- A value-producing expression. Currently, this cannot have side effects. -/
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inductive Expr where
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| add (e₁ e₂ : Expr)
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| sub (e₁ e₂ : Expr)
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@@ -9,11 +21,15 @@ inductive Expr where
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| num (n : ℕ)
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deriving DecidableEq
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/-- A statement that cannot alter control flow (and thus, can be part of a basic block).
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This differs from, e.g., a loop, which can cause execution to jump to its top several times. -/
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inductive BasicStmt where
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| assign (x : String) (e : Expr)
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| noop
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deriving DecidableEq
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/-- Any statements, which may or may not change program state (variable assignments). -/
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inductive Stmt where
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| basic (bs : BasicStmt)
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| andThen (s₁ s₂ : Stmt)
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@@ -21,16 +37,19 @@ inductive Stmt where
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| whileLoop (e : Expr) (s : Stmt)
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deriving DecidableEq
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/-- Variables mentioned in this expression. -/
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def Expr.vars : Expr → Finset String
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| .add l r => l.vars ∪ r.vars
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| .sub l r => l.vars ∪ r.vars
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| .var s => {s}
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| .num _ => ∅
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/-- Variables assigned or mentioned in this basic statement. -/
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def BasicStmt.vars : BasicStmt → Finset String
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| .assign x e => {x} ∪ e.vars
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| .noop => ∅
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/-- Variables assigned or mentioned in this statement. -/
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def Stmt.vars : Stmt → Finset String
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| .basic bs => bs.vars
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| .andThen s₁ s₂ => s₁.vars ∪ s₂.vars
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@@ -1,8 +1,20 @@
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import Mathlib.Order.Lattice
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import Mathlib.Order.RelSeries
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/-!
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Lattice Definitions.
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This file provides some definitions for lattices. It used to be more critical
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when this was an Agda project, since it defined (semi)lattices, the ordering
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relation, etc. However, these have been lifted into `Mathlib.Order.Lattice`
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etc.. What remains are a couple of theorems about folds, as well
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as `FiniteHeightLattice`, the core concept of lattice-based static
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program analyses. See the documentation on that class for more information. -/
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namespace Spa
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/-- Predicate for binary functions independently monotone in both their arguments. -/
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def Monotone₂ {α β γ : Type*} [Preorder α] [Preorder β] [Preorder γ]
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(f : α → β → γ) : Prop :=
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(∀ b, Monotone (f · b)) ∧ (∀ a, Monotone (f a ·))
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@@ -11,18 +23,20 @@ section Folds
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variable {α β : Type*} [Preorder α] [Preorder β]
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/-- (right) folds are monotonic in both their arguments if the underlying accumulator function is. -/
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lemma foldr_mono {l₁ l₂ : List α} (f : α → β → β) {b₁ b₂ : β}
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(hl : List.Forall₂ (· ≤ ·) l₁ l₂) (hb : b₁ ≤ b₂)
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(hf₁ : ∀ b, Monotone fun a => f a b) (hf₂ : ∀ a, Monotone (f a)) :
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(hf₁ : ∀ b, Monotone (f · b)) (hf₂ : ∀ a, Monotone (f a ·)) :
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l₁.foldr f b₁ ≤ l₂.foldr f b₂ := by
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induction hl with
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| nil => exact hb
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| cons hxy _ ih =>
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exact le_trans (hf₁ _ hxy) (hf₂ _ ih)
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/-- (left) folds are monotinic in both their arguments if the underlying accumulator function is. -/
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lemma foldl_mono {l₁ l₂ : List α} (f : β → α → β) {b₁ b₂ : β}
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(hl : List.Forall₂ (· ≤ ·) l₁ l₂) (hb : b₁ ≤ b₂)
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(hf₁ : ∀ a, Monotone fun b => f b a) (hf₂ : ∀ b, Monotone (f b)) :
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(hf₁ : ∀ a, Monotone (f · a)) (hf₂ : ∀ b, Monotone (f b ·)) :
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l₁.foldl f b₁ ≤ l₂.foldl f b₂ := by
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induction hl generalizing b₁ b₂ with
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| nil => exact hb
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@@ -30,14 +44,16 @@ lemma foldl_mono {l₁ l₂ : List α} (f : β → α → β) {b₁ b₂ : β}
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exact ih (le_trans (hf₁ _ hb) (hf₂ _ hxy))
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omit [Preorder α] in
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/-- (right) folds on a particular list are monotonic if the underlying accumulator is monotonic in its accumulator argument. -/
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lemma foldr_mono' (l : List α) (f : α → β → β)
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(hf : ∀ a, Monotone (f a ·)) : Monotone fun b => l.foldr f b := by
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(hf : ∀ a, Monotone (f a ·)) : Monotone (l.foldr f ·) := by
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intro b₁ b₂ hb
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induction l with
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| nil => exact hb
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| cons x xs ih => exact hf x ih
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omit [Preorder α] in
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/-- (left) folds on a particular list are monotonic if the underlying accumulator is monotonic in its accumulator argument. -/
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lemma foldl_mono' (l : List α) (f : β → α → β)
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(hf : ∀ a, Monotone (f · a)) : Monotone fun b => l.foldl f b := by
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intro b₁ b₂ hb
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@@ -47,15 +63,18 @@ lemma foldl_mono' (l : List α) (f : β → α → β)
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end Folds
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/-- Predicate on types with `Preorder` that claims all $<$ chains in the type have at most `n` comparisons. -/
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def BoundedChains (α : Type*) [Preorder α] (n : ℕ) : Prop :=
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∀ c : LTSeries α, c.length ≤ n
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/-- Wrapper over `LTSeries` that exposes its beginning and end points, as well as its length, as part of the type. -/
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structure PointedLTSeries (α : Type*) (f t : α) (n : ℕ) [Preorder α] where
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series : LTSeries α
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head_series : series.head = f
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last_series : series.last = t
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length_series : series.length = n
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/-- A finite height lattice is a lattice in which all chains $a < \ldots < z$ have a maximum height `height`. -/
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class FiniteHeightLattice (α : Type*) [Lattice α] extends Bot α, Top α where
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height : ℕ
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longestChain : PointedLTSeries α ⊥ ⊤ height
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@@ -65,6 +84,7 @@ namespace FiniteHeightLattice
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variable (α : Type*) [Lattice α] [FiniteHeightLattice α]
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/-- The bottom element `⊥` of a finite height lattice is _actually_ the least element. -/
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lemma bot_le (a : α) : (⊥ : α) ≤ a := by
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by_cases heq : ⊥ ⊓ a = ⊥
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· exact inf_eq_left.mp heq
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