Danila Fedorin
b16f14fdfd
The port had flattened Agda's instance arguments ({{flA}}, {{evaluator}},
{{latticeInterpretation}}, {{validEvaluator}}) into explicitly threaded
values (fhL, E, I, hE). Restore them as typeclasses:
- Spa.FiniteHeightLattice: now actually used — Fixedpoint takes the
instance instead of a FixedHeight value; FiniteMap gets the missing
instance (height = ks.length * height B), so varsFixedHeight /
statesFixedHeight / signFixedHeight / constFixedHeight plumbing
disappears (instance bottoms are defeq to the old ones)
- Spa.Analysis.Forward.Evaluation: StmtEvaluator/ExprEvaluator become
classes; the Valid* Props become Prop-classes, as in Agda
- Spa.Analysis.Forward.Adapters: the expr→stmt adapter and its validity
are instances (Agda: the ExprToStmtAdapter instances)
- LatticeInterpretation is a class; sign/const interpretations,
evaluators and validity proofs are instances; use sites read like the
Agda module applications: result SignLattice prog
Proof simplifications (same theorems, proofs factored):
- Spa.Lattice.AboveBelow.monotone₂_of_strict: any ⊥-strict/⊤-dominated
operation on a flat lattice is monotone — replaces the four near-
identical case bashes per analysis (postulates in Agda)
- Spa.Lattice.AboveBelow.interp_sup_of/interp_inf_of: the shared flat-
lattice interpretation case analysis, making interpSign_sup/inf and
interpConst_sup/inf one-liners
lake build green with zero warnings; lake exe spa output verified
byte-identical (diff) to the previous, Agda-verified output.
Co-Authored-By: Claude Fable 5 <noreply@anthropic.com>
144 lines
5.7 KiB
Lean4
144 lines
5.7 KiB
Lean4
/-
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Port of `Analysis/Forward/Lattices.agda`.
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The Agda module instantiates `Lattice.FiniteMap` twice (variables ↦ abstract
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values, states ↦ variable maps) and re-exports everything with ᵛ/ᵐ suffixes.
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In Lean the two instantiations are `abbrev`s and the FiniteMap API is used
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directly; the module parameters (the finite-height lattice `L`, the program)
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become section variables, with the finite-height structure and the lattice
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interpretation arriving by instance resolution as in Agda.
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Correspondence:
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VariableValues, StateVariables ↦ VariableValues, StateVariables
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isLatticeᵛ/isLatticeᵐ, ⊔ᵛ, ≼ᵛ … ↦ (the FiniteMap Lattice instances)
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fixedHeightᵛ, fixedHeightᵐ ↦ (the FiniteMap FiniteHeightLattice instance)
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⊥ᵛ, ⊥ᵛ-contains-bottoms ↦ botV, FiniteMap.bot_contains_bots
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states-in-Map ↦ states_memKey
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variablesAt ↦ variablesAt
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variablesAt-∈ ↦ variablesAt_mem
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variablesAt-≈ ↦ (congruence, trivial with `=`)
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joinForKey, joinForKey-Mono ↦ joinForKey, joinForKey_mono
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joinAll, joinAll-Mono,
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joinAll-k∈ks-≡ ↦ joinAll, joinAll_mono, joinAll_mem_eq
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variablesAt-joinAll ↦ variablesAt_joinAll
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⟦_⟧ᵛ ↦ interpV
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⟦⊥ᵛ⟧ᵛ∅ ↦ interpV_botV_nil
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⟦⟧ᵛ-respects-≈ᵛ ↦ (trivial with `=`)
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⟦⟧ᵛ-⊔ᵛ-∨ ↦ interpV_sup
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⟦⟧ᵛ-foldr ↦ interpV_foldr
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-/
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import Spa.Language
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import Spa.Lattice.FiniteMap
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namespace Spa
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variable (L : Type) [Lattice L] (prog : Program)
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/-- Agda: `VariableValues`. -/
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abbrev VariableValues : Type := FiniteMap String L prog.vars
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/-- Agda: `StateVariables`. -/
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abbrev StateVariables : Type := FiniteMap prog.State (VariableValues L prog) prog.states
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/-- Agda: `⊥ᵛ` (the bottom of `fixedHeightᵛ`, now found by instance search). -/
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def botV [FiniteHeightLattice L] : VariableValues L prog :=
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FiniteHeightLattice.bot (VariableValues L prog)
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variable {L prog}
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omit [Lattice L] in
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/-- Agda: `states-in-Map`. -/
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theorem states_memKey (s : prog.State) (sv : StateVariables L prog) :
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FiniteMap.MemKey s sv :=
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FiniteMap.memKey_iff.mpr (prog.states_complete s)
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/-- Agda: `variablesAt`. -/
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def variablesAt (s : prog.State) (sv : StateVariables L prog) :
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VariableValues L prog :=
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(FiniteMap.locate (states_memKey s sv)).1
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omit [Lattice L] in
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/-- Agda: `variablesAt-∈`. -/
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theorem variablesAt_mem (s : prog.State) (sv : StateVariables L prog) :
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(s, variablesAt s sv) ∈ sv :=
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(FiniteMap.locate (states_memKey s sv)).2
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/-- Agda: `m₁≼m₂⇒m₁[k]ᵐ≼m₂[k]ᵐ`, specialized the way `Forward.agda` uses it. -/
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theorem variablesAt_le {sv₁ sv₂ : StateVariables L prog} (hle : sv₁ ≤ sv₂)
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(s : prog.State) : variablesAt s sv₁ ≤ variablesAt s sv₂ :=
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FiniteMap.le_of_mem_mem prog.states_nodup hle
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(variablesAt_mem s sv₁) (variablesAt_mem s sv₂)
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variable [FiniteHeightLattice L]
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/-- Agda: `joinForKey`. -/
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def joinForKey (k : prog.State) (sv : StateVariables L prog) :
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VariableValues L prog :=
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(sv.valuesAt (prog.incoming k)).foldr (· ⊔ ·) (botV L prog)
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/-- Agda: `joinForKey-Mono`. -/
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theorem joinForKey_mono (k : prog.State) :
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Monotone (joinForKey (L := L) k) := by
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intro sv₁ sv₂ hle
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exact foldr_mono _ (FiniteMap.valuesAt_le hle (prog.incoming k)) (le_refl _)
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(fun b _ _ hab => sup_le_sup_right hab b)
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(fun a _ _ hab => sup_le_sup_left hab a)
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/-- Agda: `joinAll` (the "Exercise 4.26" generalized update with `f = id`). -/
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def joinAll (sv : StateVariables L prog) : StateVariables L prog :=
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FiniteMap.generalizedUpdate id joinForKey prog.states sv
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/-- Agda: `joinAll-Mono`. -/
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theorem joinAll_mono : Monotone (joinAll (L := L) (prog := prog)) :=
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FiniteMap.generalizedUpdate_monotone monotone_id joinForKey_mono
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/-- Agda: `joinAll-k∈ks-≡`. -/
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theorem joinAll_mem_eq {s : prog.State} {vs : VariableValues L prog}
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{sv : StateVariables L prog} (h : (s, vs) ∈ joinAll sv) :
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vs = joinForKey s sv :=
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FiniteMap.generalizedUpdate_mem_eq (prog.states_complete s) h
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/-- Agda: `variablesAt-joinAll`. -/
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theorem variablesAt_joinAll (s : prog.State) (sv : StateVariables L prog) :
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variablesAt s (joinAll sv) = joinForKey s sv :=
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joinAll_mem_eq (variablesAt_mem s (joinAll sv))
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/-! ### Lifting an interpretation to variable maps -/
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variable [I : LatticeInterpretation L]
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omit [FiniteHeightLattice L] in
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/-- Agda: `⟦_⟧ᵛ`. -/
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def interpV (vs : VariableValues L prog) (ρ : Env) : Prop :=
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∀ (k : String) (l : L), (k, l) ∈ vs →
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∀ (v : Value), Env.Mem (k, v) ρ → I.interp l v
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/-- Agda: `⟦⊥ᵛ⟧ᵛ∅`. -/
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theorem interpV_botV_nil : interpV (botV L prog) [] := by
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intro k l _ v hmem
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cases hmem
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omit [FiniteHeightLattice L] in
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/-- Agda: `⟦⟧ᵛ-⊔ᵛ-∨`. -/
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theorem interpV_sup {vs₁ vs₂ : VariableValues L prog} {ρ : Env}
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(h : interpV vs₁ ρ ∨ interpV vs₂ ρ) : interpV (vs₁ ⊔ vs₂) ρ := by
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intro k l hmem v hv
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obtain ⟨l₁, l₂, rfl, h₁, h₂⟩ := FiniteMap.mem_sup hmem
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rcases h with h | h
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· exact I.interp_sup v (Or.inl (h _ _ h₁ _ hv))
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· exact I.interp_sup v (Or.inr (h _ _ h₂ _ hv))
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/-- Agda: `⟦⟧ᵛ-foldr`. -/
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theorem interpV_foldr {vs : VariableValues L prog}
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{vss : List (VariableValues L prog)} {ρ : Env}
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(hvs : interpV vs ρ) (hmem : vs ∈ vss) :
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interpV (vss.foldr (· ⊔ ·) (botV L prog)) ρ := by
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induction vss with
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| nil => cases hmem
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| cons vs' vss' ih =>
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rcases List.mem_cons.mp hmem with rfl | hmem'
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· exact interpV_sup (Or.inl hvs)
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· exact interpV_sup (Or.inr (ih hmem'))
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end Spa
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