Documentation

Std.Sat.AIG.Basic

This module contains the basic definitions for an AIG (And Inverter Graph) in the style of AIGNET, as described in https://arxiv.org/pdf/1304.7861.pdf section 3. It consists of an AIG definition, a description of its semantics and basic operations to construct nodes in the AIG.

inductive Std.Sat.AIG.Decl (α : Type) :

A circuit node. These are not recursive but instead contain indices into an AIG, with inputs indexed by α.

  • const: {α : Type} → BoolStd.Sat.AIG.Decl α

    A node with a constant output value.

  • atom: {α : Type} → αStd.Sat.AIG.Decl α

    An input node to the circuit.

  • gate: {α : Type} → NatNatBoolBoolStd.Sat.AIG.Decl α

    An AIG gate with configurable input nodes and polarity. l and r are the input node indices while linv and rinv say whether there is an inverter on the left and right inputs, respectively.

Instances For
    Equations
    • Std.Sat.AIG.instHashableDecl = { hash := Std.Sat.AIG.hashDecl✝ }
    instance Std.Sat.AIG.instReprDecl {α✝ : Type} [Repr α✝] :

    Cache.WF xs is a predicate asserting that a cache : HashMap (Decl α) Nat is a valid lookup cache for xs : Array (Decl α), that is, whenever cache.find? decl returns an index into xs : Array Decl, xs[index] = decl. Note that this predicate does not force the cache to be complete, if there is no entry in the cache for some node, it can still exist in the AIG.

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      A cache for reusing elements from decls if they are available.

      Equations
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        @[irreducible]

        Create an empty Cache, valid with respect to any Array Decl.

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          @[irreducible]
          def Std.Sat.AIG.Cache.noUpdate {α : Type} [Hashable α] [DecidableEq α] {decls : Array (Std.Sat.AIG.Decl α)} {decl : Std.Sat.AIG.Decl α} (cache : Std.Sat.AIG.Cache α decls) :
          Std.Sat.AIG.Cache α (decls.push decl)

          Given a cache, valid with respect to some decls, we can extend the decls without extending the cache and remain valid.

          Equations
          • cache.noUpdate = cache.val,
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            @[irreducible]
            def Std.Sat.AIG.Cache.insert {α : Type} [Hashable α] [DecidableEq α] (decls : Array (Std.Sat.AIG.Decl α)) (cache : Std.Sat.AIG.Cache α decls) (decl : Std.Sat.AIG.Decl α) :
            Std.Sat.AIG.Cache α (decls.push decl)

            Given a cache, valid with respect to some decls, we can extend the decls and the cache at the same time with the same values and remain valid.

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              structure Std.Sat.AIG.CacheHit {α : Type} (decls : Array (Std.Sat.AIG.Decl α)) (decl : Std.Sat.AIG.Decl α) :

              Contains the index of decl in decls along with a proof that the index is indeed correct.

              • idx : Nat
              • hbound : self.idx < decls.size
              • hvalid : decls[self.idx] = decl
              Instances For
                theorem Std.Sat.AIG.Cache.get?_bounds {α : Type} [Hashable α] [DecidableEq α] {decls : Array (Std.Sat.AIG.Decl α)} {idx : Nat} (c : Std.Sat.AIG.Cache α decls) (decl : Std.Sat.AIG.Decl α) (hfound : c.val[decl]? = some idx) :
                idx < decls.size

                For a c : Cache α decls, any index idx that is a cache hit for some decl is within bounds of decls (i.e. idx < decls.size).

                theorem Std.Sat.AIG.Cache.get?_property {α : Type} [Hashable α] [DecidableEq α] {decls : Array (Std.Sat.AIG.Decl α)} {idx : Nat} (c : Std.Sat.AIG.Cache α decls) (decl : Std.Sat.AIG.Decl α) (hfound : c.val[decl]? = some idx) :
                decls[idx] = decl

                If Cache.get? decl returns some i then decls[i] = decl holds.

                opaque Std.Sat.AIG.Cache.get? {α : Type} [Hashable α] [DecidableEq α] {decls : Array (Std.Sat.AIG.Decl α)} (cache : Std.Sat.AIG.Cache α decls) (decl : Std.Sat.AIG.Decl α) :

                Lookup a Decl in a Cache.

                def Std.Sat.AIG.IsDAG (α : Type) (decls : Array (Std.Sat.AIG.Decl α)) :

                An Array Decl is a Direct Acyclic Graph (DAG) if a gate at index i only points to nodes with index lower than i.

                Equations
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                  The empty array is a DAG.

                  structure Std.Sat.AIG (α : Type) [DecidableEq α] [Hashable α] :

                  An And Inverter Graph together with a cache for subterm sharing.

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                    An AIG with an empty AIG and cache.

                    Equations
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                      def Std.Sat.AIG.Mem {α : Type} [Hashable α] [DecidableEq α] (aig : Std.Sat.AIG α) (a : α) :

                      The atom a occurs in aig.

                      Equations
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                        Equations
                        • Std.Sat.AIG.instMembership = { mem := Std.Sat.AIG.Mem }
                        structure Std.Sat.AIG.Ref {α : Type} [Hashable α] [DecidableEq α] (aig : Std.Sat.AIG α) :

                        A reference to a node within an AIG. This is the AIG analog of Bool.

                        • gate : Nat
                        • hgate : self.gate < aig.decls.size
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                          @[inline]
                          def Std.Sat.AIG.Ref.cast {α : Type} [Hashable α] [DecidableEq α] {aig1 aig2 : Std.Sat.AIG α} (ref : aig1.Ref) (h : aig1.decls.size aig2.decls.size) :
                          aig2.Ref

                          A Ref into aig1 is also valid for aig2 if aig1 is smaller than aig2.

                          Equations
                          • ref.cast h = { gate := ref.gate, hgate := }
                          Instances For
                            structure Std.Sat.AIG.BinaryInput {α : Type} [Hashable α] [DecidableEq α] (aig : Std.Sat.AIG α) :

                            A pair of Refs, useful for LawfulOperators that act on two Refs at a time.

                            • lhs : aig.Ref
                            • rhs : aig.Ref
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                              @[inline]
                              def Std.Sat.AIG.BinaryInput.cast {α : Type} [Hashable α] [DecidableEq α] {aig1 aig2 : Std.Sat.AIG α} (input : aig1.BinaryInput) (h : aig1.decls.size aig2.decls.size) :
                              aig2.BinaryInput

                              The Ref.cast equivalent for BinaryInput.

                              Equations
                              • input.cast h = { lhs := input.lhs.cast h, rhs := input.rhs.cast h }
                              Instances For
                                structure Std.Sat.AIG.TernaryInput {α : Type} [Hashable α] [DecidableEq α] (aig : Std.Sat.AIG α) :

                                A collection of 3 of Refs, useful for LawfulOperators that act on three Refs at a time, in particular multiplexer style functions.

                                • discr : aig.Ref
                                • lhs : aig.Ref
                                • rhs : aig.Ref
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                                  @[inline]
                                  def Std.Sat.AIG.TernaryInput.cast {α : Type} [Hashable α] [DecidableEq α] {aig1 aig2 : Std.Sat.AIG α} (input : aig1.TernaryInput) (h : aig1.decls.size aig2.decls.size) :
                                  aig2.TernaryInput

                                  The Ref.cast equivalent for TernaryInput.

                                  Equations
                                  • input.cast h = { discr := input.discr.cast h, lhs := input.lhs.cast h, rhs := input.rhs.cast h }
                                  Instances For

                                    An entrypoint into an AIG. This can be used to evaluate a circuit, starting at a certain node, with AIG.denote or to construct bigger circuits on top of this specific node.

                                    • aig : Std.Sat.AIG α

                                      The AIG that we are in.

                                    • ref : self.aig.Ref

                                      The reference to the node in aig that this Entrypoint targets.

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                                      Transform an Entrypoint into a graphviz string. Useful for debugging purposes.

                                      Equations
                                      • One or more equations did not get rendered due to their size.
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                                        @[irreducible]
                                        def Std.Sat.AIG.toGraphviz.go {α : Type} [DecidableEq α] [ToString α] [Hashable α] (acc : String) (decls : Array (Std.Sat.AIG.Decl α)) (hinv : Std.Sat.AIG.IsDAG α decls) (idx : Nat) (hidx : idx < decls.size) :
                                        StateM (Std.HashSet (Fin decls.size)) String
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                                          Equations
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                                            def Std.Sat.AIG.toGraphviz.toGraphvizString {α : Type} [DecidableEq α] [ToString α] [Hashable α] (decls : Array (Std.Sat.AIG.Decl α)) (idx : Fin decls.size) :
                                            Instances For
                                              structure Std.Sat.AIG.RefVec {α : Type} [Hashable α] [DecidableEq α] (aig : Std.Sat.AIG α) (w : Nat) :

                                              A vector of references into aig. This is the AIG analog of BitVec.

                                              • refs : Array Nat
                                              • hlen : self.refs.size = w
                                              • hrefs : ∀ {i : Nat} (h : i < w), self.refs[i] < aig.decls.size
                                              Instances For
                                                structure Std.Sat.AIG.RefVecEntry (α : Type) [DecidableEq α] [Hashable α] [DecidableEq α] (w : Nat) :

                                                A sequence of references bundled with their AIG.

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                                                  structure Std.Sat.AIG.ShiftTarget {α : Type} [Hashable α] [DecidableEq α] (aig : Std.Sat.AIG α) (w : Nat) :

                                                  A RefVec bundled with constant distance to be shifted by.

                                                  • vec : aig.RefVec w
                                                  • distance : Nat
                                                  Instances For
                                                    structure Std.Sat.AIG.ArbitraryShiftTarget {α : Type} [Hashable α] [DecidableEq α] (aig : Std.Sat.AIG α) (m : Nat) :

                                                    A RefVec bundled with a RefVec as distance to be shifted by.

                                                    • n : Nat
                                                    • target : aig.RefVec m
                                                    • distance : aig.RefVec self.n
                                                    Instances For
                                                      structure Std.Sat.AIG.ExtendTarget {α : Type} [Hashable α] [DecidableEq α] (aig : Std.Sat.AIG α) (newWidth : Nat) :

                                                      A RefVec to be extended to newWidth.

                                                      • w : Nat
                                                      • vec : aig.RefVec self.w
                                                      Instances For
                                                        def Std.Sat.AIG.denote {α : Type} [Hashable α] [DecidableEq α] (assign : αBool) (entry : Std.Sat.AIG.Entrypoint α) :

                                                        Evaluate an AIG.Entrypoint using some assignment for atoms.

                                                        Equations
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                                                          @[irreducible]
                                                          def Std.Sat.AIG.denote.go {α : Type} (x : Nat) (decls : Array (Std.Sat.AIG.Decl α)) (assign : αBool) (h1 : x < decls.size) (h2 : Std.Sat.AIG.IsDAG α decls) :
                                                          Equations
                                                          • One or more equations did not get rendered due to their size.
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                                                            Denotation of an AIG at a specific Entrypoint.

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                                                              Denotation of an AIG at a specific Entrypoint with the Entrypoint being constructed on the fly.

                                                              Equations
                                                              • One or more equations did not get rendered due to their size.
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                                                                Equations
                                                                • One or more equations did not get rendered due to their size.
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                                                                  def Std.Sat.AIG.UnsatAt {α : Type} [Hashable α] [DecidableEq α] (aig : Std.Sat.AIG α) (start : Nat) (h : start < aig.decls.size) :

                                                                  The denotation of the sub-DAG in the aig at node start is false for all assignments.

                                                                  Instances For

                                                                    The denotation of the Entrypoint is false for all assignments.

                                                                    Equations
                                                                    • entry.Unsat = entry.aig.UnsatAt entry.ref.gate
                                                                    Instances For
                                                                      structure Std.Sat.AIG.Fanin {α : Type} [Hashable α] [DecidableEq α] (aig : Std.Sat.AIG α) :

                                                                      An input to an AIG gate.

                                                                      • ref : aig.Ref

                                                                        The node we are referring to.

                                                                      • inv : Bool

                                                                        Whether the node is inverted

                                                                      Instances For
                                                                        @[inline]
                                                                        def Std.Sat.AIG.Fanin.cast {α : Type} [Hashable α] [DecidableEq α] {aig1 aig2 : Std.Sat.AIG α} (fanin : aig1.Fanin) (h : aig1.decls.size aig2.decls.size) :
                                                                        aig2.Fanin

                                                                        The Ref.cast equivalent for Fanin.

                                                                        Instances For
                                                                          structure Std.Sat.AIG.GateInput {α : Type} [Hashable α] [DecidableEq α] (aig : Std.Sat.AIG α) :

                                                                          The input type for creating AIG and gates.

                                                                          • lhs : aig.Fanin
                                                                          • rhs : aig.Fanin
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                                                                            @[inline]
                                                                            def Std.Sat.AIG.GateInput.cast {α : Type} [Hashable α] [DecidableEq α] {aig1 aig2 : Std.Sat.AIG α} (input : aig1.GateInput) (h : aig1.decls.size aig2.decls.size) :
                                                                            aig2.GateInput

                                                                            The Ref.cast equivalent for GateInput.

                                                                            Equations
                                                                            • input.cast h = { lhs := input.lhs.cast h, rhs := input.rhs.cast h }
                                                                            Instances For
                                                                              def Std.Sat.AIG.mkGate {α : Type} [Hashable α] [DecidableEq α] (aig : Std.Sat.AIG α) (input : aig.GateInput) :

                                                                              Add a new and inverter gate to the AIG in aig. Note that this version is only meant for proving, for production purposes use AIG.mkGateCached and equality theorems to this one.

                                                                              Equations
                                                                              • One or more equations did not get rendered due to their size.
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                                                                                def Std.Sat.AIG.mkAtom {α : Type} [Hashable α] [DecidableEq α] (aig : Std.Sat.AIG α) (n : α) :

                                                                                Add a new input node to the AIG in aig. Note that this version is only meant for proving, for production purposes use AIG.mkAtomCached and equality theorems to this one.

                                                                                Equations
                                                                                • aig.mkAtom n = { aig := { decls := aig.decls.push (Std.Sat.AIG.Decl.atom n), cache := aig.cache.noUpdate, invariant := }, ref := { gate := aig.decls.size, hgate := } }
                                                                                Instances For

                                                                                  Add a new constant node to aig. Note that this version is only meant for proving, for production purposes use AIG.mkConstCached and equality theorems to this one.

                                                                                  Equations
                                                                                  • aig.mkConst val = { aig := { decls := aig.decls.push (Std.Sat.AIG.Decl.const val), cache := aig.cache.noUpdate, invariant := }, ref := { gate := aig.decls.size, hgate := } }
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