Portability  portable 

Stability  experimental 
Maintainer  erkokl@gmail.com 
 Programming with symbolic values
 Uninterpreted constants and functions
 Proving properties
 Model extraction
 SMT Interface: Configurations and solvers
 Symbolic computations
 Module exports
(The sbv library is hosted at http://github.com/LeventErkok/sbv. Comments, bug reports, and patches are always welcome.)
SBV: Symbolic Bit Vectors in Haskell
Express properties about bitprecise Haskell programs and automatically prove them using SMT solvers.
$ ghci XScopedTypeVariables Prelude> :m Data.SBV Prelude Data.SBV> prove $ \(x::SWord8) > x `shiftL` 2 .== 4*x Q.E.D. Prelude Data.SBV> prove $ forAll ["x"] $ \(x::SWord8) > x `shiftL` 2 .== x Falsifiable. Counterexample: x = 128 :: SWord8
The function prove
has the following type:
prove
::Provable
a => a >IO
ThmResult
The class Provable
comes with instances for nary predicates, for arbitrary n.
The predicates are just regular Haskell functions over symbolic signed and unsigned
bitvectors. Functions for checking satisfiability (sat
and allSat
) are also
provided.
In particular, the sbv library introduces the types:

SBool
: Symbolic Booleans (bits) 
SWord8
,SWord16
,SWord32
,SWord64
: Symbolic Words (unsigned) 
SInt8
,SInt16
,SInt32
,SInt64
: Symbolic Ints (signed) 
SArray
,SFunArray
: Flat arrays of symbolic values  Symbolic polynomials over GF(2^n), and polynomial arithmetic
 Uninterpreted constants and functions over symbolic values
The user can construct ordinary Haskell programs using these types, which behave
very similar to their concrete counterparts. In particular these types belong to the
standard classes Num
, Bits
, custom versions of Eq
(EqSymbolic
)
and Ord
(OrdSymbolic
), along with several other custom classes for simplifying
bitprecise programming with symbolic values. The framework takes full advantage
of Haskell's type inference to avoid many common mistakes.
Furthermore, predicates (i.e., functions that return SBool
) built out of
these types can also be:
 proven correct via an external SMT solver (the
prove
function)  checked for satisfiability (the
sat
andallSat
functions)  quickchecked
If a predicate is not valid, prove
will return a counterexample: An
assignment to inputs such that the predicate fails. The sat
function will
return a satisfying assignment, if there is one. The allSat
function returns
all satisfying assignments, lazily.
The sbv library uses thirdparty SMT solvers via the standard SMTLib interface: http://goedel.cs.uiowa.edu/smtlib/.
While the library is designed to work with any SMTLib compliant SMTsolver, solver specific support is required for parsing counterexample/model data since there is currently no agreed upon format for getting models from arbitrary SMT solvers. (The SMTLib2 initiative will potentially address this issue in the future, at which point the sbv library can be generalized as well.) Currently, we only support the Yices SMT solver from SRI as far as the counterexample and model generation support is concerned: http://yices.csl.sri.com/. However, other solvers can be hooked up with relative ease.
You should download and install Yices on your machine, and make sure the
yices
executable is in your path before using the sbv library, as it is the
current default solver. Alternatively, you can specify the location of yices
executable in the environment variable SBV_YICES
and the options to yices
in SBV_YICES_OPTIONS
. (The default for the latter is '"m f"'.)
 type SBool = SBV Bool
 type SWord8 = SBV Word8
 type SWord16 = SBV Word16
 type SWord32 = SBV Word32
 type SWord64 = SBV Word64
 type SInt8 = SBV Int8
 type SInt16 = SBV Int16
 type SInt32 = SBV Int32
 type SInt64 = SBV Int64
 class SymArray array where
 newArray_ :: (HasSignAndSize a, HasSignAndSize b) => Maybe (SBV b) > Symbolic (array a b)
 newArray :: (HasSignAndSize a, HasSignAndSize b) => String > Maybe (SBV b) > Symbolic (array a b)
 readArray :: array a b > SBV a > SBV b
 resetArray :: SymWord b => array a b > SBV b > array a b
 writeArray :: SymWord b => array a b > SBV a > SBV b > array a b
 mergeArrays :: SymWord b => SBV Bool > array a b > array a b > array a b
 data SArray a b
 data SFunArray a b
 bitValue :: (Bits a, SymWord a) => SBV a > Int > SBool
 setBitTo :: (Bits a, SymWord a) => SBV a > Int > SBool > SBV a
 oneIf :: (Num a, SymWord a) => SBool > SBV a
 lsb :: (Bits a, SymWord a) => SBV a > SBool
 msb :: (Bits a, SymWord a) => SBV a > SBool
 allEqual :: (Eq a, SymWord a) => [SBV a] > SBool
 allDifferent :: (Eq a, SymWord a) => [SBV a] > SBool
 blastBE :: (Bits a, SymWord a) => SBV a > [SBool]
 blastLE :: (Bits a, SymWord a) => SBV a > [SBool]
 class FromBits a where
 fromBitsLE :: [SBool] > a
 fromBitsBE :: [SBool] > a
 class Splittable a b  b > a where
 class Bits a => Polynomial a where
 class Mergeable a where
 class EqSymbolic a where
 class (Mergeable a, EqSymbolic a) => OrdSymbolic a where
 class BVDivisible a where
 bvQuotRem :: a > a > (a, a)
 class Boolean b where
 bAnd :: Boolean b => [b] > b
 bOr :: Boolean b => [b] > b
 bAny :: Boolean b => (a > b) > [a] > b
 bAll :: Boolean b => (a > b) > [a] > b
 class PrettyNum a where
 readBin :: Num a => String > a
 class Uninterpreted a where
 uninterpret :: String > a
 type Predicate = Symbolic SBool
 class Provable a where
 class Equality a where
 prove :: Provable a => a > IO ThmResult
 proveWith :: Provable a => SMTConfig > a > IO ThmResult
 isTheorem :: Provable a => a > IO Bool
 isTheoremWithin :: Provable a => Int > a > IO (Maybe Bool)
 sat :: Provable a => a > IO SatResult
 satWith :: Provable a => SMTConfig > a > IO SatResult
 isSatisfiable :: Provable a => a > IO Bool
 isSatisfiableWithin :: Provable a => Int > a > IO (Maybe Bool)
 allSat :: Provable a => a > IO AllSatResult
 allSatWith :: Provable a => SMTConfig > a > IO AllSatResult
 numberOfModels :: Provable a => a > IO Int
 newtype ThmResult = ThmResult SMTResult
 newtype SatResult = SatResult SMTResult
 newtype AllSatResult = AllSatResult [SMTResult]
 data SMTResult
 = Unsatisfiable SMTConfig
  Satisfiable SMTConfig [(String, CW)]
  Unknown SMTConfig [(String, CW)]
  ProofError SMTConfig [String]
  TimeOut SMTConfig
 class SatModel a where
 getModel :: SatModel a => SMTResult > a
 displayModels :: SatModel a => (Int > a > IO ()) > AllSatResult > IO Int
 data SMTConfig = SMTConfig {}
 data SMTSolver = SMTSolver {}
 defaultSMTCfg :: SMTConfig
 verboseSMTCfg :: SMTConfig
 timingSMTCfg :: SMTConfig
 verboseTimingSMTCfg :: SMTConfig
 timeout :: Int > SMTConfig > SMTConfig
 yices :: SMTSolver
 data Symbolic a
 output :: SBV a > Symbolic (SBV a)
 class Ord a => SymWord a where
 module Data.Bits
 module Data.Word
 module Data.Int
Programming with symbolic values
The SBV library is really two things:
 A framework for writing bitprecise programs in Haskell
 A framework for proving properties of such programs using SMT solvers
In this first section we will look at the constructs that will let us construct such
programs in Haskell. The goal is to have a seamless experience, i.e., program in
the usual Haskell style without distractions of symbolic coding. While Haskell helps
in some aspects (the Num
and Bits
classes simplify coding), it makes life harder
in others. For instance, ifthenelse
only takes Bool
as a test in Haskell, and
comparisons (>
etc.) only return Bool
s. Clearly we would like these values to be
symbolic (i.e., SBool
), thus stopping us from using some native Haskell constructs.
When symbolic versions of operators are needed, they are typically obtained by prepending a dot,
for instance ==
becomes .==
. Care has been taken to make the transition painless. In
particular, any Haskell program you build out of symbolic components is fully concretely
executable within Haskell, without the need for any custom interpreters. (They are truly
Haskell programs, not AST's built out of pieces of syntax.) This provides for an integrated
feel of the system, one of the original design goals for SBV.
Symbolic types
Symbolic bit
Unsigned symbolic bitvectors
Signed symbolic bitvectors
Arrays of symbolic values
class SymArray array whereSource
Flat arrays of symbolic values
An array a b
is an array indexed by the type
, with elements of type SBV
a
If an initial value is not provided in SBV
bnewArray_
and newArray
methods, then the elements
are left unspecified, i.e., the solver is free to choose any value. This is the right thing
to do if arrays are used as inputs to functions to be verified, typically. Reading an
uninitilized entry is an error.
While it's certainly possible for user to create instances of SymArray
, the
SArray
and SFunArray
instances already provided should cover most use cases
in practice.
Minimal complete definition: All methods are required, no defaults.
newArray_ :: (HasSignAndSize a, HasSignAndSize b) => Maybe (SBV b) > Symbolic (array a b)Source
Create a new array, with an optional initial value
newArray :: (HasSignAndSize a, HasSignAndSize b) => String > Maybe (SBV b) > Symbolic (array a b)Source
Create a named new array with, with an optional initial value
readArray :: array a b > SBV a > SBV bSource
Read the array element at a
resetArray :: SymWord b => array a b > SBV b > array a bSource
Reset all the elements of the array to the value b
writeArray :: SymWord b => array a b > SBV a > SBV b > array a bSource
Update the element at a
to be b
mergeArrays :: SymWord b => SBV Bool > array a b > array a b > array a bSource
Merge two given arrays on the symbolic condition
Intuitively: mergeArrays cond a b = if cond then a else b
.
Merging pushes the ifthenelse choice down on to elements
Arrays implemented in terms of SMTarrays: http://goedel.cs.uiowa.edu/smtlib/theories/ArraysEx.smt2
Arrays implemented internally as functions, and rendered as SMTLib functions
Operations on symbolic words
Word level
lsb :: (Bits a, SymWord a) => SBV a > SBoolSource
Least significant bit of a word, always stored at index 0
msb :: (Bits a, SymWord a) => SBV a > SBoolSource
Most significant bit of a word, always stored at the last position
List level
allEqual :: (Eq a, SymWord a) => [SBV a] > SBoolSource
Returns (symbolic) true if all the elements of the given list are the same
allDifferent :: (Eq a, SymWord a) => [SBV a] > SBoolSource
Returns (symbolic) true if all the elements of the given list are different
Blasting/Unblasting
blastBE :: (Bits a, SymWord a) => SBV a > [SBool]Source
Bigendian blasting of a word into its bits. Also see the FromBits
class
blastLE :: (Bits a, SymWord a) => SBV a > [SBool]Source
Littleendian blasting of a word into its bits. Also see the FromBits
class
Unblasting a value from symbolicbits. The bits can be given littleendian or bigendian. For a signed number in littleendian, we assume the very last bit is the sign digit. This is a bit awkward, but it is more consistent with the reverse view of littlebigendian representations
Minimal complete definiton: fromBitsLE
fromBitsLE :: [SBool] > aSource
fromBitsBE :: [SBool] > aSource
Splitting, joining, and extending
class Splittable a b  b > a whereSource
Splitting an a
into two b
's and joining back.
Intuitively, a
is a larger bitsize word than b
, typically double.
The extend
operation captures embedding of a b
value into an a
without changing its semantic value.
Minimal complete definition: All, no defaults.
Polynomial arithmetic
class Bits a => Polynomial a whereSource
Implements polynomial addition, multiplication, division, and modulus operations
over GF(2^n). NB. Similar to bvQuotRem
, division by 0
is interpreted as follows:
x pDivMod
0 = (0, x)
for all x
(including 0
)
polynomial :: [Int] > aSource
Given bitpositions to be set, create a polynomial For instance
polynomial [0, 1, 3] :: SWord8
will evaluate to 11
, since it sets the bits 0
, 1
, and 3
. Mathematicans would write this polynomial
as x^3 + x + 1
. And in fact, showPoly
will show it like that.
Add two polynomials in GF(2^n)
pMult :: (a, a, [Int]) > aSource
Multiply two polynomials in GF(2^n), and reduce it by the irreducible specified by the polynomial as specified by coefficients of the third argument. Note that the third argument is specifically left in this form as it is usally in GF(2^(n+1)), which is not available in our formalism. (That is, we would need SWord9 for SWord8 multiplication, etc.) Also note that we do not support symbolic irreducibles, which is a minor shortcoming. (Most GF's will come with fixed irreducibles, so this should not be a problem in practice.)
Passing [] for the third argument will multiply the polynomials and then ignore the higher bits that won't fit into the resulting size.
Divide two polynomials in GF(2^n), see above note for division by 0
Compute modulus of two polynomials in GF(2^n), see above note for modulus by 0
pDivMod :: a > a > (a, a)Source
Division and modulus packed together
Display a polynomial like a mathematician would (over the monomial x
)
Conditionals: Mergeable values
Symbolic choice operator, parameterized via a class
select
is a totalindexing function, with the default.
Minimal complete definition: symbolicMerge
symbolicMerge :: SBool > a > a > aSource
Merge two values based on the condition
ite :: SBool > a > a > aSource
Choose one or the other element, based on the condition.
This is similar to symbolicMerge
, but it has a default
implementation that makes sure it's shortcut if the condition is concrete
select :: (Bits b, SymWord b, Integral b) => [a] > a > SBV b > aSource
Total indexing operation. select xs default index
is intuitively
the same as xs !! index
, except it evaluates to default
if index
overflows
Mergeable ()  
Mergeable Mostek  
Mergeable Status  
Mergeable a => Mergeable [a]  
Mergeable a => Mergeable (Maybe a)  
SymWord a => Mergeable (SBV a)  
Mergeable a => Mergeable (Move a)  
Mergeable b => Mergeable (a > b)  
(Mergeable a, Mergeable b) => Mergeable (Either a b)  
(Mergeable a, Mergeable b) => Mergeable (a, b)  
(Ix a, Mergeable b) => Mergeable (Array a b)  
SymWord b => Mergeable (SFunArray a b)  
SymWord b => Mergeable (SArray a b)  
(Mergeable a, Mergeable b, Mergeable c) => Mergeable (a, b, c)  
(Mergeable a, Mergeable b, Mergeable c, Mergeable d) => Mergeable (a, b, c, d)  
(Mergeable a, Mergeable b, Mergeable c, Mergeable d, Mergeable e) => Mergeable (a, b, c, d, e)  
(Mergeable a, Mergeable b, Mergeable c, Mergeable d, Mergeable e, Mergeable f) => Mergeable (a, b, c, d, e, f)  
(Mergeable a, Mergeable b, Mergeable c, Mergeable d, Mergeable e, Mergeable f, Mergeable g) => Mergeable (a, b, c, d, e, f, g) 
Symbolic equality
class EqSymbolic a whereSource
Symbolic Equality. Note that we can't use Haskell's Eq
class since Haskell insists on returning Bool
Comparing symbolic values will necessarily return a symbolic value.
Minimal complete definition: .==
EqSymbolic Bool  
EqSymbolic SWord11  
EqSymbolic a => EqSymbolic [a]  
EqSymbolic a => EqSymbolic (Maybe a)  
EqSymbolic (SBV a)  
(EqSymbolic a, EqSymbolic b) => EqSymbolic (Either a b)  
(EqSymbolic a, EqSymbolic b) => EqSymbolic (a, b)  
EqSymbolic (SArray a b)  
(EqSymbolic a, EqSymbolic b, EqSymbolic c) => EqSymbolic (a, b, c)  
(EqSymbolic a, EqSymbolic b, EqSymbolic c, EqSymbolic d) => EqSymbolic (a, b, c, d)  
(EqSymbolic a, EqSymbolic b, EqSymbolic c, EqSymbolic d, EqSymbolic e) => EqSymbolic (a, b, c, d, e)  
(EqSymbolic a, EqSymbolic b, EqSymbolic c, EqSymbolic d, EqSymbolic e, EqSymbolic f) => EqSymbolic (a, b, c, d, e, f)  
(EqSymbolic a, EqSymbolic b, EqSymbolic c, EqSymbolic d, EqSymbolic e, EqSymbolic f, EqSymbolic g) => EqSymbolic (a, b, c, d, e, f, g) 
Symbolic ordering
class (Mergeable a, EqSymbolic a) => OrdSymbolic a whereSource
Symbolic Comparisons. Similar to Eq
, we cannot implement Haskell's Ord
class
since there is no way to return an Ordering
value from a symbolic comparison.
Furthermore, OrdSymbolic
requires Mergeable
to implement ifthenelse, for the
benefit of implementing symbolic versions of max
and min
functions.
Minimal complete definition: .<
OrdSymbolic a => OrdSymbolic [a]  
OrdSymbolic a => OrdSymbolic (Maybe a)  
SymWord a => OrdSymbolic (SBV a)  
(OrdSymbolic a, OrdSymbolic b) => OrdSymbolic (Either a b)  
(OrdSymbolic a, OrdSymbolic b) => OrdSymbolic (a, b)  
(OrdSymbolic a, OrdSymbolic b, OrdSymbolic c) => OrdSymbolic (a, b, c)  
(OrdSymbolic a, OrdSymbolic b, OrdSymbolic c, OrdSymbolic d) => OrdSymbolic (a, b, c, d)  
(OrdSymbolic a, OrdSymbolic b, OrdSymbolic c, OrdSymbolic d, OrdSymbolic e) => OrdSymbolic (a, b, c, d, e)  
(OrdSymbolic a, OrdSymbolic b, OrdSymbolic c, OrdSymbolic d, OrdSymbolic e, OrdSymbolic f) => OrdSymbolic (a, b, c, d, e, f)  
(OrdSymbolic a, OrdSymbolic b, OrdSymbolic c, OrdSymbolic d, OrdSymbolic e, OrdSymbolic f, OrdSymbolic g) => OrdSymbolic (a, b, c, d, e, f, g) 
Division
class BVDivisible a whereSource
The BVDivisible
class captures the essence of division of words.
Unfortunately we cannot use Haskell's Integral
class since the Real
and Enum
superclasses are not implementable for symbolic bitvectors.
However, quotRem
makes perfect sense, and the BVDivisible
class captures
this operation. One issue is how division by 0 behaves. The verification
technology requires total functions, and there are several design choices
here. We follow Isabelle/HOL approach of assigning the value 0 for division
by 0. Therefore, we impose the following law:
x bvQuotRem
0 = (0, x)
Note that our instances implement this law even when x
is 0
itself.
Minimal complete definition: bvQuotRem
The Boolean class
The Boolean
class: a generalization of Haskell's Bool
type
Haskell Bool
and SBV's SBool
are instances of this class, unifying the treatment of boolean values.
Minimal complete definition: true
, bnot
, &&&
However, it's advisable to define false
, and 
as well (typically), for clarity.
logical true
logical false
complement
and
or
nand
nor
xor
implies
equivalence
cast from Bool
Generalizations of boolean operations
Prettyprinting and reading numbers in Hex & Binary
PrettyNum class captures printing of numbers in hex and binary formats; also supporting negative numbers.
readBin :: Num a => String > aSource
A more convenient interface for reading binary numbers, also supports negative numbers
Uninterpreted constants and functions
class Uninterpreted a whereSource
Uninterpreted constants and functions. An uninterpreted constant is a value that is indexed by its name. The only property the prover assumes about these values are that they are equivalent to themselves; i.e., (for functions) they return the same results when applied to same arguments. We support uninterpretedfunctions as a general means of blackbox'ing operations that are irrelevant for the purposes of the proof; i.e., when the proofs can be performed without any knowledge about the function itself.
Minimal complete definition: uninterpret
. However, most instances in
practice are already provided by SBV, so endusers should not need to define their
own instances.
uninterpret :: String > aSource
HasSignAndSize a => Uninterpreted (SBV a)  
(HasSignAndSize c, HasSignAndSize b, HasSignAndSize a) => Uninterpreted ((SBV c, SBV b) > SBV a)  
(HasSignAndSize d, HasSignAndSize c, HasSignAndSize b, HasSignAndSize a) => Uninterpreted ((SBV d, SBV c, SBV b) > SBV a)  
(HasSignAndSize e, HasSignAndSize d, HasSignAndSize c, HasSignAndSize b, HasSignAndSize a) => Uninterpreted ((SBV e, SBV d, SBV c, SBV b) > SBV a)  
(HasSignAndSize f, HasSignAndSize e, HasSignAndSize d, HasSignAndSize c, HasSignAndSize b, HasSignAndSize a) => Uninterpreted ((SBV f, SBV e, SBV d, SBV c, SBV b) > SBV a)  
(HasSignAndSize g, HasSignAndSize f, HasSignAndSize e, HasSignAndSize d, HasSignAndSize c, HasSignAndSize b, HasSignAndSize a) => Uninterpreted ((SBV g, SBV f, SBV e, SBV d, SBV c, SBV b) > SBV a)  
(HasSignAndSize h, HasSignAndSize g, HasSignAndSize f, HasSignAndSize e, HasSignAndSize d, HasSignAndSize c, HasSignAndSize b, HasSignAndSize a) => Uninterpreted ((SBV h, SBV g, SBV f, SBV e, SBV d, SBV c, SBV b) > SBV a)  
(HasSignAndSize h, HasSignAndSize g, HasSignAndSize f, HasSignAndSize e, HasSignAndSize d, HasSignAndSize c, HasSignAndSize b, HasSignAndSize a) => Uninterpreted (SBV h > SBV g > SBV f > SBV e > SBV d > SBV c > SBV b > SBV a)  
(HasSignAndSize g, HasSignAndSize f, HasSignAndSize e, HasSignAndSize d, HasSignAndSize c, HasSignAndSize b, HasSignAndSize a) => Uninterpreted (SBV g > SBV f > SBV e > SBV d > SBV c > SBV b > SBV a)  
(HasSignAndSize f, HasSignAndSize e, HasSignAndSize d, HasSignAndSize c, HasSignAndSize b, HasSignAndSize a) => Uninterpreted (SBV f > SBV e > SBV d > SBV c > SBV b > SBV a)  
(HasSignAndSize e, HasSignAndSize d, HasSignAndSize c, HasSignAndSize b, HasSignAndSize a) => Uninterpreted (SBV e > SBV d > SBV c > SBV b > SBV a)  
(HasSignAndSize d, HasSignAndSize c, HasSignAndSize b, HasSignAndSize a) => Uninterpreted (SBV d > SBV c > SBV b > SBV a)  
(HasSignAndSize c, HasSignAndSize b, HasSignAndSize a) => Uninterpreted (SBV c > SBV b > SBV a)  
(HasSignAndSize b, HasSignAndSize a) => Uninterpreted (SBV b > SBV a) 
Proving properties
The SBV library provides a pushbutton verification system via automated SMT solving. The design goal is to let SMT solvers be used without any knowledge of how SMT solvers work or how different logics operate. The details are hidden behind the SBV framework, providing Haskell programmers with a clean API that is unencumbered by the details of individual solvers. To that end, we use the SMTLib standard (http://goedel.cs.uiowa.edu/smtlib/) to communicate with arbitrary SMT solvers. Unfortunately, the SMTLib version 1.X does not standardize how models are communicated back from solvers, so there is some work in parsing individual SMT solver output. The 2.X version of the SMTLib standard (not yet implemented by SMT solvers widely, unfortunately) will bring new standard features for getting models; at which time the SBV framework can be modified into a truly plugandplay system where arbitrary SMT solvers can be used.
Predicates
type Predicate = Symbolic SBoolSource
A predicate is a symbolic program that returns a (symbolic) boolean value. For all intents and
purposes, it can be treated as an nary function from symbolicvalues to a boolean. The Symbolic
monad captures the underlying representation, and can/should be ignored by the users of the library,
unless you are building further utilities on top of SBV itself. Instead, simply use the Predicate
type when necessary.
A type a
is provable if we can turn it into a predicate.
Note that a predicate can be made from a curried function of arbitrary arity, where
each element is either a symbolic type or upto a 7tuple of symbolictypes. So
predicates can be constructed from almost arbitrary Haskell functions that have arbitrary
shapes. (See the instance declarations below.)
forAll_ :: a > PredicateSource
Turns a value into a predicate, internally naming the inputs.
In this case the sbv library will use names of the form s1, s2
, etc. to name these variables
Example:
forAll_ $ \(x::SWord8) y > x `shiftL` 2 .== y
is a predicate with two arguments, captured using an ordinary Haskell function. Internally,
x
will be named s0
and y
will be named s1
.
forAll :: [String] > a > PredicateSource
Turns a value into a predicate, allowing users to provide names for the inputs. If the user does not provide enough number of names for the free variables, the remaining ones will be internally generated. Note that the names are only used for printing models and has no other significance; in particular, we do not check that they are unique. Example:
forAll ["x", "y"] $ \(x::SWord8) y > x `shiftL` 2 .== y
This is the same as above, except the variables will be named x
and y
respectively,
simplifying the counterexamples when they are printed.
Provable SBool  
Provable Predicate  
(SymWord a, SymWord b, Provable p) => Provable ((SBV a, SBV b) > p)  
(SymWord a, SymWord b, SymWord c, Provable p) => Provable ((SBV a, SBV b, SBV c) > p)  
(SymWord a, SymWord b, SymWord c, SymWord d, Provable p) => Provable ((SBV a, SBV b, SBV c, SBV d) > p)  
(SymWord a, SymWord b, SymWord c, SymWord d, SymWord e, Provable p) => Provable ((SBV a, SBV b, SBV c, SBV d, SBV e) > p)  
(SymWord a, SymWord b, SymWord c, SymWord d, SymWord e, SymWord f, Provable p) => Provable ((SBV a, SBV b, SBV c, SBV d, SBV e, SBV f) > p)  
(SymWord a, SymWord b, SymWord c, SymWord d, SymWord e, SymWord f, SymWord g, Provable p) => Provable ((SBV a, SBV b, SBV c, SBV d, SBV e, SBV f, SBV g) > p)  
(HasSignAndSize a, HasSignAndSize b, SymArray array, Provable p) => Provable (array a b > p)  
(SymWord a, Provable p) => Provable (SBV a > p) 
Equality as a proof method. Allows for very concise construction of equivalence proofs, which is very typical in bitprecise proofs.
Proving properties
prove :: Provable a => a > IO ThmResultSource
Prove a predicate, equivalent to proveWith
defaultSMTCfg
proveWith :: Provable a => SMTConfig > a > IO ThmResultSource
Proves the predicate using the given SMTsolver
isTheoremWithin :: Provable a => Int > a > IO (Maybe Bool)Source
Checks theoremhood within the given time limit of i
seconds.
Returns Nothing
if times out, or the result wrapped in a Just
otherwise.
Checking satisfiability
sat :: Provable a => a > IO SatResultSource
Find a satisfying assignment for a predicate, equivalent to satWith
defaultSMTCfg
satWith :: Provable a => SMTConfig > a > IO SatResultSource
Find a satisfying assignment using the given SMTsolver
isSatisfiable :: Provable a => a > IO BoolSource
Checks satisfiability
isSatisfiableWithin :: Provable a => Int > a > IO (Maybe Bool)Source
Checks satisfiability within the given time limit of i
seconds.
Returns Nothing
if times out, or the result wrapped in a Just
otherwise.
Finding all satisfying assignments
allSat :: Provable a => a > IO AllSatResultSource
Return all satisfying assignments for a predicate, equivalent to
.
Satisfying assignments are constructed lazily, so they will be available as returned by the solver
and on demand.
allSatWith
defaultSMTCfg
allSatWith :: Provable a => SMTConfig > a > IO AllSatResultSource
Find all satisfying assignments using the given SMTsolver
numberOfModels :: Provable a => a > IO IntSource
Returns the number of models that satisfy the predicate, as it would
be returned by allSat
. Note that the number of models is always a
finite number, and hence this will always return a result. Of course,
computing it might take quite long, as it literally generates and counts
the number of satisfying models.
Model extraction
The default Show
instances for prover calls provide all the counterexample information in a
humanreadable form and should be sufficient for most casual uses of sbv. However, tools built
on top of sbv will inevitably need to look into the constructed models more deeply, programmatically
extracting their results and performing actions based on them. The API provided in this section
aims at simplifying this task.
Inspecting proof results
ThmResult
, SatResult
, and AllSatResult
are simple newtype wrappers over SMTResult
. Their
main purpose is so that we can provide custom Show
instances to print results accordingly.
newtype AllSatResult Source
An allSat
call results in a AllSatResult
The result of an SMT solver call. Each constructor is tagged with
the SMTConfig
that created it so that further tools can inspect it
and build layers of results, if needed. For ordinary uses of the library,
this type should not be needed, instead use the accessor functions on
it. (Custom Show instances and model extractors.)
Unsatisfiable SMTConfig  Unsatisfiable 
Satisfiable SMTConfig [(String, CW)]  Satisfiable with model 
Unknown SMTConfig [(String, CW)]  Prover returned unknown, with a potential (possibly bogus) model 
ProofError SMTConfig [String]  Prover errored out 
TimeOut SMTConfig  Computation timed out (see the 
Programmable model extraction
While default Show
instances are sufficient for most use cases, it is sometimes desirable (especially
for library construction) that the SMTmodels are reinterpreted in terms of domain types. Programmable
extraction allows getting arbitrarily typed models out of SMT models.
Instances of SatModel
can be automatically extracted from models returned by the
solvers. The idea is that the sbv infrastructure provides a stream of CW'
s (constantwords)
coming from the solver, and the type a
is interpreted based on these constants. Many typical
instances are already provided, so new instances can be declared with relative ease.
Minimum complete definition: parseCWs
parseCWs :: [CW] > Maybe (a, [CW])Source
Given a sequence of constantwords, extract one instance of the type a
, returning
the remaining elements untouched. If the next element is not what's expected for this
type you should return Nothing
cvtModel :: (a > Maybe b) > Maybe (a, [CW]) > Maybe (b, [CW])Source
Given a parsed model instance, transform it using f
, and return the result.
The default definition for this method should be sufficient in most use cases.
SatModel Bool  
SatModel Int8  
SatModel Int16  
SatModel Int32  
SatModel Int64  
SatModel Word8  
SatModel Word16  
SatModel Word32  
SatModel Word64  
SatModel U2Member  
SatModel a => SatModel [a]  
(SatModel a, SatModel b) => SatModel (a, b)  
(SatModel a, SatModel b, SatModel c) => SatModel (a, b, c)  
(SatModel a, SatModel b, SatModel c, SatModel d) => SatModel (a, b, c, d)  
(SatModel a, SatModel b, SatModel c, SatModel d, SatModel e) => SatModel (a, b, c, d, e)  
(SatModel a, SatModel b, SatModel c, SatModel d, SatModel e, SatModel f) => SatModel (a, b, c, d, e, f)  
(SatModel a, SatModel b, SatModel c, SatModel d, SatModel e, SatModel f, SatModel g) => SatModel (a, b, c, d, e, f, g) 
displayModels :: SatModel a => (Int > a > IO ()) > AllSatResult > IO IntSource
Given an allSat
call, we typically want to iterate over it and print the results in sequence. The
displayModels
function automates this task by calling disp
on each result, consecutively. The first
Int
argument to disp
'is the current model number.
SMT Interface: Configurations and solvers
Solver configuration
An SMT solver
defaultSMTCfg :: SMTConfigSource
Default configuration for the SMT solver. Nonverbose, nontiming, prints results in base 10, and uses the Yices SMT solver.
verboseSMTCfg :: SMTConfigSource
Same as defaultSMTCfg
, except verbose
timingSMTCfg :: SMTConfigSource
Same as defaultSMTCfg
, except prints timing info
verboseTimingSMTCfg :: SMTConfigSource
Same as defaultSMTCfg
, except both verbose and timing info
timeout :: Int > SMTConfig > SMTConfigSource
Adds a time out of n
seconds to a given solver configuration
The description of the Yices SMT solver
The default executable is "yices"
, which must be in your path. You can use the SBV_YICES
environment variable to point to the executable on your system.
The default options are "m f"
, which is valid for Yices 2 series. You can use the SBV_YICES_OPTIONS
environment variable to override the options.
Symbolic computations
A Symbolic computation. Represented by a reader monad carrying the state of the computation, layered on top of IO for creating unique references to hold onto intermediate results.
output :: SBV a > Symbolic (SBV a)Source
Mark an interim result as an output. Useful when constructing Symbolic programs that return multiple values, or when the result is programmatically computed.
class Ord a => SymWord a whereSource
A SymWord
is a potential symbolic bitvector that can be created instances of
to be fed to a symbolic program. Note that these methods are typically not needed
in casual uses with prove
, sat
, allSat
etc, as default instances automatically
provide the necessary bits.
free :: String > Symbolic (SBV a)Source
Create a user named input
free_ :: Symbolic (SBV a)Source
Create an automatically named input
Turn a literal constant to symbolic
unliteral :: SBV a > Maybe aSource
Extract a literal, if the value is concrete
Extract a literal, from a CW representation
isConcrete :: SBV a > BoolSource
Is the symbolic word concrete?
isSymbolic :: SBV a > BoolSource
Is the symbolic word really symbolic?
Module exports
The SBV library exports the following modules wholesale, as user programs will have to import these three modules to make any sensible use of the SBV functionality.
module Data.Bits
module Data.Word
module Data.Int