macaw/semmc-macaw.org

• Overview
• Code dependencies and related packages
  • Semantics background
• Modules of note
• Detailed approach
  • Possible task breakdown
• References

Overview

The high level goal is to write and/or generate architecture-specific backends for macaw based on the semantics discovered by semmc. In particular, we are interested in making macaw-ppc and macaw-arm. We will hand-write some of the code, but we will generate as much as possible automatically. We will read in the semantics files generated by semmc and use Template Haskell ¹ to generate a function that transforms machine states according to the learned semantics.

We will implement a base package (macaw-semmc) that provides shared infrastructure for all of our backends; this will include the Template Haskell function to create a state transformer function from learned semantics files.

Code dependencies and related packages

• macaw (binary code discovery)
• macaw-x86 (x86_64 backend for macaw)
• semmc (semantics learning and code synthesis)
• semmc-ppc (PowerPC backend for synthesis)
• dismantle-tablegen (disassembler infrastructure)
• dismantle-ppc (PowerPC disassembler)
• crucible (interface to SMT solvers)
• parameterized-utils (utilities for working with parameterized types)

Semantics background

The semmc library is designed to learn semantics for machine code instructions. Its output, for each Instruction Set Architecture (ISA), is a directory of files where each file contains a formula corresponding to the semantics for an opcode in the ISA. For example, the ADDI.sem file contains the semantics for the add immediate instruction in PowerPC.

There are functions in semmc for dealing with this representation. Formulas are loaded into a data type called ParameterizedFormula, which contains formula fragments based on the SimpleBuilder representation of crucible. This can be thought of as a convenient representation of SMT formulas.

Modules of note

• macaw: Data.Macaw.Architecture.Info This contains the machine-specific interface that must be implemented for each backend to macaw: ArchitectureInfo. There are many details, but the main workhorse is disassembleFn, which disassembles bytes into blocks (sequences of statements with no branches).

• macaw: Data.Macaw.CFG.Core

  This defines some key types for the translation we will have to do:

  • Stmt: statements that comprise basic blocks (a three-address code style representation).
  • Value: Values that can live in registers or memory, represented using an expression language defined in macaw (see App and Expr). Most values are bitvectors of various lengths.
  • ArchFn, ArchReg, ArchStmt, which are for representing architecture-specific behavior that can't be represented with the Stmt type. These are type families that are instantiated for each backend.
  • RegState, which is a map from registers to Value. The register type is a parameter and is architecture-specific (e.g., X86Reg). While this is basically a map (parameterized map from parameterized-utils), it has an additional invariant where it is always full (i.e., it has an entry for every register).

Note that our goal is to translate machine instructions into one or more macaw statements (the Stmt type). We will arrange these statements into basic blocks (linear sequences of blocks with no branches). The bridge between statements and the expression language is through the AssignStmt constructor of Stmt, which establishes an assignment (similarly the WriteMem statement). An assignment defines a new virtual register in macaw IR (via the Assignment type). The Assignment names the virtual register it defines through the assignId field. The assignRhs contains expressions through the EvalApp constructor (App being the expression language). The ReadMem constructor corresponds to reads from memory.

• macaw: Data.Macaw.CFG.App This module defines the expression language that is referenced by the Value type.
• macaw-x86: Data.Macaw.X86 This module contains the macaw backend for x86_64: x86_64_linux_info. The most important function in this definition is probably disassembleBlockFromAbsState, which disassembles instructions into basic blocks. This module also contains implementations of the two important interfaces in macaw-x86: Semantics and IsValue. We won't need the classes, but the underlying X86Generator Monad is instructive, as is the representation of expressions.
• macaw-x86: Data.Macaw.X86.X86Reg This module defines a representation of all of the parts of the machine state for X86. Each backend will have something analogous. Note that the definition of X86Reg is a GADT ² (despite the unusual definition style). This is important, as 1) macaw expects the register type to have a type parameter, and 2) the extra size guarantees are somewhat useful. Note that the strange form of the declaration is most likely historical. Before GHC 8.2, haddock could not parse documentation comments on GADT constructors.
• semmc: SemMC.Formula.Load Load learned formulas from disk into a map from opcodes to formulas.
• crucible: Lang.Crucible.Solver.SimpleBuilder This module defines a different App type that is the expression language for our parameterized formulas (i.e., instruction semantics). This is the AST we'll be walking in the Template Haskell code. By and large, we only use the bitvector operations. We also use a few uninterpreted functions to represent floating point operations.

Detailed approach

We will implement a macaw ArchitectureInfo for each backend, starting with PowerPC. There is a lot in this structure, so we will start by just implementing a DisassembleFn, which has the type:

  type DisassembleFn arch
   = forall ids
   .  Memory (ArchAddrWidth arch)
   -> NonceGenerator (ST ids) ids
   -> ArchSegmentOff arch
      -- ^ The offset to start reading from.
   -> ArchAddrWord arch
      -- ^ Maximum offset for this to read from.
   -> AbsBlockState (ArchReg arch)
      -- ^ Abstract state associated with address that we are disassembling
      -- from.
      --
      -- This is used for things like the height of the x87 stack.
   -> ST ids ([Block arch ids], MemWord (ArchAddrWidth arch), Maybe String)

Take the implementation of disassembleBlockFromAbsState in Data.Macaw.X86. Note that we can ignore the AbsBlockState parameter, which is only used for x86. We also don't need to implement the entire function. We can start by focusing on the equivalent of the execInstruction function. The surrounding code we can most likely adapt without many changes.

The execInstruction function is defined in Data.Macaw.X86.Semantics. The signature of this function is more interesting than its implementation:

  execInstruction :: FullSemantics m
                  => Value m (BVType 64)
                     -- ^ Next ip address
                  -> F.InstructionInstance
                  -> Maybe (m ())

This signature is more general than necessary: we can concretize the typeclass constraint to a concrete Monad in the style of the X86Generator Monad. We should create a simple Monad based on the State Monad from mtl and provide some functions on it that mirror those of the Semantics typeclass from macaw-x86. An example Monad declaration might be:

  {-# LANGUAGE GeneralizedNewtypeDeriving #-}
  import           Control.Monad.ST ( ST )
  import qualified Control.Monad.State.Strict as St
  data PreBlock ids = PreBlock { pBlockIndex :: !Word64
                               , pBlockAddr  :: !(MemSegmentOff 64)
                                 -- ^ Starting address of function in preblock.
                               , pBlockStmts :: !(Seq (Stmt X86_64 ids))
                               , pBlockState :: !(RegState X86Reg (Value X86_64 ids))
                               , pBlockApps  :: !(MapF (App (Value X86_64 ids)) (Assignment X86_64 ids))
                               }
  data GenState w s ids = GenState { assignIdGen :: !(NonceGenerator (ST s) ids)
                                   , blockSeq :: !(BlockSeq ids)
                                   , blockState :: !(PreBlock ids)
                                   , genAddr :: !(MemSegmentOff w)
                                   }
  newtype MCGenerator w s ids a = MCGenerator { runGen :: St.StateT (GenState w s ids) (ST s) a }
                                deriving (Monad,
                                          Functor,
                                          Applicative,
                                          St.MonadState (GenState w s ids))

The PreBlock type is the key: it is the block currently being constructed (at any given time). It has a RegState, which is one of the key things we will be modifying. Many of the combinators relating to the X86Generator in macaw-x86 are defined in service of updating this state as machine code instructions are encountered. It is a PreBlock because it isn't yet a block. It becomes a block once we encounter a terminator instruction (e.g., a jump of some kind). At that point, we add it to the underlying collection of blocks.

We will need many of the helpers in the Data.Macaw.X86 module that operate on the X86Generator Monad. It may also be helpful to have an additional component to the Monad to signal errors (e.g, Control.Monad.Except.ExceptT). We need the base of the Monad transformer stack to be ST so that we can allocate nonces.

Since we are specializing our execInstruction to this Monad, its type will look something like:

  execInstruction :: Value PPC.PPC ids (BVType w)
                     -- ^ Next ip address
                  -> PPC.Instruction
                  -- ^ An instruction from Dismantle
                  -> Maybe (MCGenerator w s ids ())

Think of this as the action that we take given an instruction and the value of the instruction pointer (IP) when that instruction is executed. We pass in the instruction pointer to accommodate IP-relative addressing (i.e., addresses that are computed relative to the address of the instruction computing the address). execInstruction returns a Maybe in case the instruction is invalid. That is not especially likely given our encoding, but it is possible.

As an example of what an implementation of this function might look like is:

  execInstruction :: Value PPC.PPC ids (BVType w)
                     -- ^ Next ip address
                  -> PPC.Instruction
                  -- ^ An instruction from Dismantle
                  -> Maybe (MCGenerator w s ids ())
  execInstruction ip (PPC.Instruction opcode operands) =
    case opcode of
      PPC.ADD4 ->
        case operands of
          (r1 :> r2 :> r3 :> Nil) -> Just $ do
            v2 <- get r2
            v3 <- get r3
            define r1 (BVAdd v2 v3)

For appropriate definitions of get and define, which read from and write to (respectively) the RegState in the PreBlock of the GenState in the MCGenerator Monad.

Possible task breakdown

1. Define a suitable MCGenerator state Monad and accompanying state
2. Work out some suitable helper functions (taking inspiration from macaw-x86, but not copying out all of the complexity) for managing the state and accumulating basic blocks
3. Try to define a few simple cases for execInstruction to ensure that the Monad and API is suitable and can actually be used to implement the main DisassembleFn
4. Sketch out a function with the signature implied by DisassembleFn, ensuring that it is actually capable of calling the functions defined in earlier steps
5. Start replacing the hand-written execInstruction with a Template Haskell version

Note: we don't want to define execInstruction by hand - we just want to learn enough to generate it from the formulas we obtain from semmc, and figure out what primitives we need to support that.

References

---

¹

https://hackage.haskell.org/package/template-haskell

²

https://downloads.haskell.org/~ghc/8.2.1/docs/html/users_guide/glasgow_exts.html#generalised-algebraic-data-types-gadts