sbv-6.1: SMT Based Verification: Symbolic Haskell theorem prover using SMT solving.

Copyright(c) Brian Huffman
LicenseBSD3
Maintainererkokl@gmail.com
Stabilityexperimental
Safe HaskellNone
LanguageHaskell2010

Data.SBV.Dynamic

Contents

Description

Dynamically typed low-level API to the SBV library, for users who want to generate symbolic values at run-time. Note that with this API it is possible to create terms that are not type correct; use at your own risk!

Synopsis

Programming with symbolic values

Symbolic types

Abstract symbolic value type

data SVal Source #

The Symbolic value. Either a constant (Left) or a symbolic value (Right Cached). Note that caching is essential for making sure sharing is preserved.

Instances

Eq SVal Source #

Equality constraint on SBV values. Not desirable since we can't really compare two symbolic values, but will do.

Methods

(==) :: SVal -> SVal -> Bool #

(/=) :: SVal -> SVal -> Bool #

Show SVal Source #

Show instance for SVal. Not particularly "desirable", but will do if needed NB. We do not show the type info on constant KBool values, since there's no implicit "fromBoolean" applied to Booleans in Haskell; and thus a statement of the form "True :: SBool" is just meaningless. (There should be a fromBoolean!)

Methods

showsPrec :: Int -> SVal -> ShowS #

show :: SVal -> String #

showList :: [SVal] -> ShowS #

NFData SVal Source # 

Methods

rnf :: SVal -> () #

HasKind SVal Source # 

class HasKind a where Source #

A class for capturing values that have a sign and a size (finite or infinite) minimal complete definition: kindOf. This class can be automatically derived for data-types that have a Data instance; this is useful for creating uninterpreted sorts.

Instances

HasKind Bool Source # 
HasKind Double Source # 
HasKind Float Source # 
HasKind Int8 Source # 
HasKind Int16 Source # 
HasKind Int32 Source # 
HasKind Int64 Source # 
HasKind Integer Source # 
HasKind Word8 Source # 
HasKind Word16 Source # 
HasKind Word32 Source # 
HasKind Word64 Source # 
HasKind AlgReal Source # 
HasKind Kind Source # 
HasKind ExtCW Source #

Kind instance for Extended CW

HasKind GeneralizedCW Source #

Kind instance for generalized CW

HasKind CW Source #

Kind instance for CW

HasKind RoundingMode Source #

RoundingMode kind

HasKind SVal Source # 
HasKind SW Source # 
HasKind E Source # 
HasKind Word4 Source #

HasKind instance; simply returning the underlying kind for the type

HasKind Sport Source # 
HasKind Pet Source # 
HasKind Beverage Source # 
HasKind Nationality Source # 
HasKind Color Source # 
HasKind Location Source # 
HasKind U2Member Source # 
HasKind B Source # 
HasKind Q Source # 
HasKind L Source #

Similarly, HasKinds default implementation is sufficient.

HasKind (SBV a) Source # 

data Kind Source #

Kind of symbolic value

Instances

Eq Kind Source #

We want to equate user-sorts only by name

Methods

(==) :: Kind -> Kind -> Bool #

(/=) :: Kind -> Kind -> Bool #

Ord Kind Source #

We want to order user-sorts only by name

Methods

compare :: Kind -> Kind -> Ordering #

(<) :: Kind -> Kind -> Bool #

(<=) :: Kind -> Kind -> Bool #

(>) :: Kind -> Kind -> Bool #

(>=) :: Kind -> Kind -> Bool #

max :: Kind -> Kind -> Kind #

min :: Kind -> Kind -> Kind #

Show Kind Source # 

Methods

showsPrec :: Int -> Kind -> ShowS #

show :: Kind -> String #

showList :: [Kind] -> ShowS #

HasKind Kind Source # 

data CW Source #

CW represents a concrete word of a fixed size: Endianness is mostly irrelevant (see the FromBits class). For signed words, the most significant digit is considered to be the sign.

Constructors

CW 

Fields

Instances

Eq CW Source # 

Methods

(==) :: CW -> CW -> Bool #

(/=) :: CW -> CW -> Bool #

Ord CW Source # 

Methods

compare :: CW -> CW -> Ordering #

(<) :: CW -> CW -> Bool #

(<=) :: CW -> CW -> Bool #

(>) :: CW -> CW -> Bool #

(>=) :: CW -> CW -> Bool #

max :: CW -> CW -> CW #

min :: CW -> CW -> CW #

Show CW Source #

Show instance for CW.

Methods

showsPrec :: Int -> CW -> ShowS #

show :: CW -> String #

showList :: [CW] -> ShowS #

HasKind CW Source #

Kind instance for CW

PrettyNum CW Source # 
SatModel CW Source #

CW as extracted from a model; trivial definition

Methods

parseCWs :: [CW] -> Maybe (CW, [CW]) Source #

cvtModel :: (CW -> Maybe b) -> Maybe (CW, [CW]) -> Maybe (b, [CW]) Source #

SDivisible CW Source # 

Methods

sQuotRem :: CW -> CW -> (CW, CW) Source #

sDivMod :: CW -> CW -> (CW, CW) Source #

sQuot :: CW -> CW -> CW Source #

sRem :: CW -> CW -> CW Source #

sDiv :: CW -> CW -> CW Source #

sMod :: CW -> CW -> CW Source #

data CWVal Source #

A constant value

Constructors

CWAlgReal !AlgReal

algebraic real

CWInteger !Integer

bit-vector/unbounded integer

CWFloat !Float

float

CWDouble !Double

double

CWUserSort !(Maybe Int, String)

value of an uninterpreted/user kind. The Maybe Int shows index position for enumerations

Instances

Eq CWVal Source #

Eq instance for CWVal. Note that we cannot simply derive Eq/Ord, since CWAlgReal doesn't have proper instances for these when values are infinitely precise reals. However, we do need a structural eq/ord for Map indexes; so define custom ones here:

Methods

(==) :: CWVal -> CWVal -> Bool #

(/=) :: CWVal -> CWVal -> Bool #

Ord CWVal Source #

Ord instance for CWVal. Same comments as the Eq instance why this cannot be derived.

Methods

compare :: CWVal -> CWVal -> Ordering #

(<) :: CWVal -> CWVal -> Bool #

(<=) :: CWVal -> CWVal -> Bool #

(>) :: CWVal -> CWVal -> Bool #

(>=) :: CWVal -> CWVal -> Bool #

max :: CWVal -> CWVal -> CWVal #

min :: CWVal -> CWVal -> CWVal #

cwToBool :: CW -> Bool Source #

Convert a CW to a Haskell boolean (NB. Assumes input is well-kinded)

Arrays of symbolic values

data SArr Source #

Arrays implemented in terms of SMT-arrays: http://smtlib.cs.uiowa.edu/theories-ArraysEx.shtml

  • Maps directly to SMT-lib arrays
  • Reading from an unintialized value is OK and yields an unspecified result
  • Can check for equality of these arrays
  • Cannot quick-check theorems using SArr values
  • Typically slower as it heavily relies on SMT-solving for the array theory

readSArr :: SArr -> SVal -> SVal Source #

Read the array element at a

resetSArr :: SArr -> SVal -> SArr Source #

Reset all the elements of the array to the value b

writeSArr :: SArr -> SVal -> SVal -> SArr Source #

Update the element at a to be b

mergeSArr :: SVal -> SArr -> SArr -> SArr Source #

Merge two given arrays on the symbolic condition Intuitively: mergeArrays cond a b = if cond then a else b. Merging pushes the if-then-else choice down on to elements

newSArr :: (Kind, Kind) -> (Int -> String) -> Maybe SVal -> Symbolic SArr Source #

Create a named new array, with an optional initial value

eqSArr :: SArr -> SArr -> SVal Source #

Compare two arrays for equality

Creating a symbolic variable

data Symbolic a Source #

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.

data Quantifier Source #

Quantifiers: forall or exists. Note that we allow arbitrary nestings.

Constructors

ALL 
EX 

svMkSymVar :: Maybe Quantifier -> Kind -> Maybe String -> Symbolic SVal Source #

Create a symbolic value, based on the quantifier we have. If an explicit quantifier is given, we just use that. If not, then we pick existential for SAT calls and universal for everything else. randomCW is used for generating random values for this variable when used for quickCheck purposes.

Operations on symbolic values

Boolean literals

svTrue :: SVal Source #

Boolean True.

svFalse :: SVal Source #

Boolean False.

svBool :: Bool -> SVal Source #

Convert from a Boolean.

svAsBool :: SVal -> Maybe Bool Source #

Extract a bool, by properly interpreting the integer stored.

Integer literals

svInteger :: Kind -> Integer -> SVal Source #

Convert from an Integer.

svAsInteger :: SVal -> Maybe Integer Source #

Extract an integer from a concrete value.

Float literals

svFloat :: Float -> SVal Source #

Convert from a Float

svDouble :: Double -> SVal Source #

Convert from a Float

Algebraic reals (only from rationals)

svReal :: Rational -> SVal Source #

Convert from a Rational

svNumerator :: SVal -> Maybe Integer Source #

Grab the numerator of an SReal, if available

svDenominator :: SVal -> Maybe Integer Source #

Grab the denominator of an SReal, if available

Symbolic equality

svEqual :: SVal -> SVal -> SVal Source #

Equality.

svNotEqual :: SVal -> SVal -> SVal Source #

Inequality.

Constructing concrete lists

svEnumFromThenTo :: SVal -> Maybe SVal -> SVal -> Maybe [SVal] Source #

Constructing [x, y, .. z] and [x .. y]. Only works when all arguments are concrete and integral and the result is guaranteed finite Note that the it isn't "obviously" clear why the following works; after all we're doing the construction over Integer's and mapping it back to other types such as SIntN/SWordN. The reason is that the values we receive are guaranteed to be in their domains; and thus the lifting to Integers preserves the bounds; and then going back is just fine. So, things like [1, 5 .. 200] :: [SInt8] work just fine (end evaluate to empty list), since we see [1, 5 .. -56] in the Integer domain. Also note the explicit check for s /= f below to make sure we don't stutter and produce an infinite list.

Symbolic ordering

svLessThan :: SVal -> SVal -> SVal Source #

Less than.

svGreaterThan :: SVal -> SVal -> SVal Source #

Greater than.

svLessEq :: SVal -> SVal -> SVal Source #

Less than or equal to.

svGreaterEq :: SVal -> SVal -> SVal Source #

Greater than or equal to.

Arithmetic operations

svPlus :: SVal -> SVal -> SVal Source #

Addition.

svTimes :: SVal -> SVal -> SVal Source #

Multiplication.

svMinus :: SVal -> SVal -> SVal Source #

Subtraction.

svUNeg :: SVal -> SVal Source #

Unary minus.

svAbs :: SVal -> SVal Source #

Absolute value.

svDivide :: SVal -> SVal -> SVal Source #

Division.

svQuot :: SVal -> SVal -> SVal Source #

Quotient: Overloaded operation whose meaning depends on the kind at which it is used: For unbounded integers, it corresponds to the SMT-Lib "div" operator (Euclidean division, which always has a non-negative remainder). For unsigned bitvectors, it is "bvudiv"; and for signed bitvectors it is "bvsdiv", which rounds toward zero. All operations have unspecified semantics in case y = 0.

svRem :: SVal -> SVal -> SVal Source #

Remainder: Overloaded operation whose meaning depends on the kind at which it is used: For unbounded integers, it corresponds to the SMT-Lib "mod" operator (always non-negative). For unsigned bitvectors, it is "bvurem"; and for signed bitvectors it is "bvsrem", which rounds toward zero (sign of remainder matches that of x). All operations have unspecified semantics in case y = 0.

svExp :: SVal -> SVal -> SVal Source #

Exponentiation.

svAddConstant :: Integral a => SVal -> a -> SVal Source #

Add a constant value:

svIncrement :: SVal -> SVal Source #

Increment:

svDecrement :: SVal -> SVal Source #

Decrement:

Logical operations

svAnd :: SVal -> SVal -> SVal Source #

Bitwise and.

svOr :: SVal -> SVal -> SVal Source #

Bitwise or.

svXOr :: SVal -> SVal -> SVal Source #

Bitwise xor.

svNot :: SVal -> SVal Source #

Bitwise complement.

svShl :: SVal -> Int -> SVal Source #

Shift left by a constant amount. Translates to the "bvshl" operation in SMT-Lib.

svShr :: SVal -> Int -> SVal Source #

Shift right by a constant amount. Translates to either "bvlshr" (logical shift right) or "bvashr" (arithmetic shift right) in SMT-Lib, depending on whether x is a signed bitvector.

svRol :: SVal -> Int -> SVal Source #

Rotate-left, by a constant

svRor :: SVal -> Int -> SVal Source #

Rotate-right, by a constant

Splitting, joining, and extending

svExtract :: Int -> Int -> SVal -> SVal Source #

Extract bit-sequences.

svJoin :: SVal -> SVal -> SVal Source #

Join two words, by concataneting

Sign-casting

svSign :: SVal -> SVal Source #

Convert a symbolic bitvector from unsigned to signed.

svUnsign :: SVal -> SVal Source #

Convert a symbolic bitvector from signed to unsigned.

Numeric conversions

svFromIntegral :: Kind -> SVal -> SVal Source #

Convert a symbolic bitvector from one integral kind to another.

Indexed lookups

svSelect :: [SVal] -> SVal -> SVal -> SVal Source #

Total indexing operation. svSelect xs default index is intuitively the same as xs !! index, except it evaluates to default if index overflows. Translates to SMT-Lib tables.

Word-level operations

svToWord1 :: SVal -> SVal Source #

Convert an SVal from kind Bool to an unsigned bitvector of size 1.

svFromWord1 :: SVal -> SVal Source #

Convert an SVal from a bitvector of size 1 (signed or unsigned) to kind Bool.

svTestBit :: SVal -> Int -> SVal Source #

Test the value of a bit. Note that we do an extract here as opposed to masking and checking against zero, as we found extraction to be much faster with large bit-vectors.

svSetBit :: SVal -> Int -> SVal Source #

Set a given bit at index

svShiftLeft :: SVal -> SVal -> SVal Source #

Generalization of svShl, where the shift-amount is symbolic. The first argument should be a bounded quantity.

svShiftRight :: SVal -> SVal -> SVal Source #

Generalization of svShr, where the shift-amount is symbolic. The first argument should be a bounded quantity.

NB. If the shiftee is signed, then this is an arithmetic shift; otherwise it's logical.

svRotateLeft :: SVal -> SVal -> SVal Source #

Generalization of svRol, where the rotation amount is symbolic. The first argument should be a bounded quantity.

svRotateRight :: SVal -> SVal -> SVal Source #

Generalization of svRor, where the rotation amount is symbolic. The first argument should be a bounded quantity.

svWordFromBE :: [SVal] -> SVal Source #

Un-bit-blast from little-endian representation to a word of the right size. The input is assumed to be unsigned.

svWordFromLE :: [SVal] -> SVal Source #

Un-bit-blast from big-endian representation to a word of the right size. The input is assumed to be unsigned.

svBlastLE :: SVal -> [SVal] Source #

Bit-blast: Little-endian. Assumes the input is a bit-vector.

svBlastBE :: SVal -> [SVal] Source #

Bit-blast: Big-endian. Assumes the input is a bit-vector.

Conditionals: Mergeable values

svIte :: SVal -> SVal -> SVal -> SVal Source #

If-then-else. This one will force branches.

svLazyIte :: Kind -> SVal -> SVal -> SVal -> SVal Source #

Lazy If-then-else. This one will delay forcing the branches unless it's really necessary.

svSymbolicMerge :: Kind -> Bool -> SVal -> SVal -> SVal -> SVal Source #

Merge two symbolic values, at kind k, possibly force'ing the branches to make sure they do not evaluate to the same result.

svIsSatisfiableInCurrentPath :: SVal -> Symbolic (Maybe SatResult) Source #

Reduce a condition (i.e., try to concretize it) under the given path

Uninterpreted sorts, constants, and functions

svUninterpreted :: Kind -> String -> Maybe [String] -> [SVal] -> SVal Source #

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 uninterpreted-functions as a general means of black-box'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.

Properties, proofs, and satisfiability

Proving properties

proveWith :: SMTConfig -> Symbolic SVal -> IO ThmResult Source #

Proves the predicate using the given SMT-solver

Checking satisfiability

satWith :: SMTConfig -> Symbolic SVal -> IO SatResult Source #

Find a satisfying assignment using the given SMT-solver

allSatWith :: SMTConfig -> Symbolic SVal -> IO AllSatResult Source #

Find all satisfying assignments using the given SMT-solver

Checking safety

safeWith :: SMTConfig -> Symbolic SVal -> IO [SafeResult] Source #

Check safety using the given SMT-solver

Proving properties using multiple solvers

proveWithAll :: [SMTConfig] -> Symbolic SVal -> IO [(Solver, ThmResult)] Source #

Prove a property with multiple solvers, running them in separate threads. The results will be returned in the order produced.

proveWithAny :: [SMTConfig] -> Symbolic SVal -> IO (Solver, ThmResult) Source #

Prove a property with multiple solvers, running them in separate threads. Only the result of the first one to finish will be returned, remaining threads will be killed.

satWithAll :: [SMTConfig] -> Symbolic SVal -> IO [(Solver, SatResult)] Source #

Find a satisfying assignment to a property with multiple solvers, running them in separate threads. The results will be returned in the order produced.

satWithAny :: [SMTConfig] -> Symbolic SVal -> IO (Solver, SatResult) Source #

Find a satisfying assignment to a property with multiple solvers, running them in separate threads. Only the result of the first one to finish will be returned, remaining threads will be killed.

Quick-check

svQuickCheck :: Symbolic SVal -> IO Bool Source #

Dynamic variant of quick-check

Model extraction

Inspecting proof results

newtype AllSatResult Source #

An allSat call results in a AllSatResult. The boolean says whether we should warn the user about prefix-existentials.

Constructors

AllSatResult (Bool, [SMTResult]) 

Instances

Show AllSatResult Source #

The Show instance of AllSatResults. Note that we have to be careful in being lazy enough as the typical use case is to pull results out as they become available.

newtype SafeResult Source #

A safe call results in a SafeResult

Instances

Show SafeResult Source #

User friendly way of printing safety results

data OptimizeResult Source #

An optimize call results in a OptimizeResult

Instances

Show OptimizeResult Source #

Show instance for optimization results

data SMTResult Source #

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.)

Constructors

Unsatisfiable SMTConfig (Maybe [String])

Unsatisfiable, with unsat-core if requested

Satisfiable SMTConfig SMTModel

Satisfiable with model

SatExtField SMTConfig SMTModel

Prover returned a model, but in an extension field containing Infinite/epsilon

Unknown SMTConfig SMTModel

Prover returned unknown, with a potential (possibly bogus) model

ProofError SMTConfig [String]

Prover errored out

TimeOut SMTConfig

Computation timed out (see the timeout combinator)

Programmable model extraction

genParse :: Integral a => Kind -> [CW] -> Maybe (a, [CW]) Source #

Parse a signed/sized value from a sequence of CWs

getModel :: SMTResult -> Either String (Bool, [CW]) Source #

Extract a model, the result is a tuple where the first argument (if True) indicates whether the model was "probable". (i.e., if the solver returned unknown.)

getModelDictionary :: SMTResult -> Map String CW Source #

Extract a model dictionary. Extract a dictionary mapping the variables to their respective values as returned by the SMT solver. Also see getModelDictionaries.

SMT Interface: Configurations and solvers

data SMTConfig Source #

Solver configuration. See also z3, yices, cvc4, boolector, mathSAT, etc. which are instantiations of this type for those solvers, with reasonable defaults. In particular, custom configuration can be created by varying those values. (Such as z3{verbose=True}.)

Most fields are self explanatory. The notion of precision for printing algebraic reals stems from the fact that such values does not necessarily have finite decimal representations, and hence we have to stop printing at some depth. It is important to emphasize that such values always have infinite precision internally. The issue is merely with how we print such an infinite precision value on the screen. The field printRealPrec controls the printing precision, by specifying the number of digits after the decimal point. The default value is 16, but it can be set to any positive integer.

When printing, SBV will add the suffix ... at the and of a real-value, if the given bound is not sufficient to represent the real-value exactly. Otherwise, the number will be written out in standard decimal notation. Note that SBV will always print the whole value if it is precise (i.e., if it fits in a finite number of digits), regardless of the precision limit. The limit only applies if the representation of the real value is not finite, i.e., if it is not rational.

The printBase field can be used to print numbers in base 2, 10, or 16. If base 2 or 16 is used, then floating-point values will be printed in their internal memory-layout format as well, which can come in handy for bit-precise analysis.

Constructors

SMTConfig 

Fields

  • verbose :: Bool

    Debug mode

  • timing :: Timing

    Print timing information on how long different phases took (construction, solving, etc.)

  • sBranchTimeOut :: Maybe Int

    How much time to give to the solver for each call of sBranch check. (In seconds. Default: No limit.)

  • timeOut :: Maybe Int

    How much time to give to the solver. (In seconds. Default: No limit.)

  • printBase :: Int

    Print integral literals in this base (2, 10, and 16 are supported.)

  • printRealPrec :: Int

    Print algebraic real values with this precision. (SReal, default: 16)

  • solverTweaks :: [String]

    Additional lines of script to give to the solver (user specified)

  • optimizeArgs :: [String]

    Additional commands to pass before check-sat is issued

  • satCmd :: String

    Usually "(check-sat)". However, users might tweak it based on solver characteristics.

  • isNonModelVar :: String -> Bool

    When constructing a model, ignore variables whose name satisfy this predicate. (Default: (const False), i.e., don't ignore anything)

  • smtFile :: Maybe FilePath

    If Just, the generated SMT script will be put in this file (for debugging purposes mostly)

  • smtLibVersion :: SMTLibVersion

    What version of SMT-lib we use for the tool

  • solver :: SMTSolver

    The actual SMT solver.

  • roundingMode :: RoundingMode

    Rounding mode to use for floating-point conversions

  • useLogic :: Maybe Logic

    If Nothing, pick automatically. Otherwise, either use the given one, or use the custom string.

  • getUnsatCore :: Bool

    Should we query unsat-core?

data SMTLibVersion Source #

Representation of SMTLib Program versions. As of June 2015, we're dropping support for SMTLib1, and supporting SMTLib2 only. We keep this data-type around in case SMTLib3 comes along and we want to support 2 and 3 simultaneously.

Constructors

SMTLib2 

data SMTLibLogic Source #

SMT-Lib logics. If left unspecified SBV will pick the logic based on what it determines is needed. However, the user can override this choice using the useLogic parameter to the configuration. This is especially handy if one is experimenting with custom logics that might be supported on new solvers. See http://smtlib.cs.uiowa.edu/logics.shtml for the official list.

Constructors

AUFLIA

Formulas over the theory of linear integer arithmetic and arrays extended with free sort and function symbols but restricted to arrays with integer indices and values.

AUFLIRA

Linear formulas with free sort and function symbols over one- and two-dimentional arrays of integer index and real value.

AUFNIRA

Formulas with free function and predicate symbols over a theory of arrays of arrays of integer index and real value.

LRA

Linear formulas in linear real arithmetic.

QF_ABV

Quantifier-free formulas over the theory of bitvectors and bitvector arrays.

QF_AUFBV

Quantifier-free formulas over the theory of bitvectors and bitvector arrays extended with free sort and function symbols.

QF_AUFLIA

Quantifier-free linear formulas over the theory of integer arrays extended with free sort and function symbols.

QF_AX

Quantifier-free formulas over the theory of arrays with extensionality.

QF_BV

Quantifier-free formulas over the theory of fixed-size bitvectors.

QF_IDL

Difference Logic over the integers. Boolean combinations of inequations of the form x - y < b where x and y are integer variables and b is an integer constant.

QF_LIA

Unquantified linear integer arithmetic. In essence, Boolean combinations of inequations between linear polynomials over integer variables.

QF_LRA

Unquantified linear real arithmetic. In essence, Boolean combinations of inequations between linear polynomials over real variables.

QF_NIA

Quantifier-free integer arithmetic.

QF_NRA

Quantifier-free real arithmetic.

QF_RDL

Difference Logic over the reals. In essence, Boolean combinations of inequations of the form x - y < b where x and y are real variables and b is a rational constant.

QF_UF

Unquantified formulas built over a signature of uninterpreted (i.e., free) sort and function symbols.

QF_UFBV

Unquantified formulas over bitvectors with uninterpreted sort function and symbols.

QF_UFIDL

Difference Logic over the integers (in essence) but with uninterpreted sort and function symbols.

QF_UFLIA

Unquantified linear integer arithmetic with uninterpreted sort and function symbols.

QF_UFLRA

Unquantified linear real arithmetic with uninterpreted sort and function symbols.

QF_UFNRA

Unquantified non-linear real arithmetic with uninterpreted sort and function symbols.

QF_UFNIRA

Unquantified non-linear real integer arithmetic with uninterpreted sort and function symbols.

UFLRA

Linear real arithmetic with uninterpreted sort and function symbols.

UFNIA

Non-linear integer arithmetic with uninterpreted sort and function symbols.

QF_FPBV

Quantifier-free formulas over the theory of floating point numbers, arrays, and bit-vectors.

QF_FP

Quantifier-free formulas over the theory of floating point numbers.

QF_FD

Quantifier-free finite domains

Instances

Show SMTLibLogic Source # 
NFData SMTLibLogic Source #

NFData instance for SMTLibLogic

Methods

rnf :: SMTLibLogic -> () #

data Logic Source #

Chosen logic for the solver

Constructors

PredefinedLogic SMTLibLogic

Use one of the logics as defined by the standard

CustomLogic String

Use this name for the logic

Instances

Show Logic Source # 

Methods

showsPrec :: Int -> Logic -> ShowS #

show :: Logic -> String #

showList :: [Logic] -> ShowS #

NFData Logic Source #

NFData instance for Logic

Methods

rnf :: Logic -> () #

data SMTSolver Source #

An SMT solver

Constructors

SMTSolver 

Fields

boolector :: SMTConfig Source #

Default configuration for the Boolector SMT solver

cvc4 :: SMTConfig Source #

Default configuration for the CVC4 SMT Solver.

yices :: SMTConfig Source #

Default configuration for the Yices SMT Solver.

z3 :: SMTConfig Source #

Default configuration for the Z3 SMT solver

mathSAT :: SMTConfig Source #

Default configuration for the MathSAT SMT solver

abc :: SMTConfig Source #

Default configuration for the ABC synthesis and verification tool.

defaultSolverConfig :: Solver -> SMTConfig Source #

The default configs corresponding to supported SMT solvers

sbvCurrentSolver :: SMTConfig Source #

The currently active solver, obtained by importing Data.SBV. To have other solvers current, import one of the bridge modules Data.SBV.Bridge.ABC, Data.SBV.Bridge.Boolector, Data.SBV.Bridge.CVC4, Data.SBV.Bridge.Yices, or Data.SBV.Bridge.Z3 directly.

defaultSMTCfg :: SMTConfig Source #

The default solver used by SBV. This is currently set to z3.

sbvCheckSolverInstallation :: SMTConfig -> IO Bool Source #

Check whether the given solver is installed and is ready to go. This call does a simple call to the solver to ensure all is well.

sbvAvailableSolvers :: IO [SMTConfig] Source #

Return the known available solver configs, installed on your machine.

Symbolic computations

outputSVal :: SVal -> Symbolic () Source #

Mark an interim result as an output. Useful when constructing Symbolic programs that return multiple values, or when the result is programmatically computed.

Code generation from symbolic programs

data SBVCodeGen a Source #

The code-generation monad. Allows for precise layout of input values reference parameters (for returning composite values in languages such as C), and return values.

Setting code-generation options

cgPerformRTCs :: Bool -> SBVCodeGen () Source #

Sets RTC (run-time-checks) for index-out-of-bounds, shift-with-large value etc. on/off. Default: False.

cgSetDriverValues :: [Integer] -> SBVCodeGen () Source #

Sets driver program run time values, useful for generating programs with fixed drivers for testing. Default: None, i.e., use random values.

cgGenerateDriver :: Bool -> SBVCodeGen () Source #

Should we generate a driver program? Default: True. When a library is generated, it will have a driver if any of the contituent functions has a driver. (See compileToCLib.)

cgGenerateMakefile :: Bool -> SBVCodeGen () Source #

Should we generate a Makefile? Default: True.

Designating inputs

svCgInput :: Kind -> String -> SBVCodeGen SVal Source #

Creates an atomic input in the generated code.

svCgInputArr :: Kind -> Int -> String -> SBVCodeGen [SVal] Source #

Creates an array input in the generated code.

Designating outputs

svCgOutput :: String -> SVal -> SBVCodeGen () Source #

Creates an atomic output in the generated code.

svCgOutputArr :: String -> [SVal] -> SBVCodeGen () Source #

Creates an array output in the generated code.

Designating return values

svCgReturn :: SVal -> SBVCodeGen () Source #

Creates a returned (unnamed) value in the generated code.

svCgReturnArr :: [SVal] -> SBVCodeGen () Source #

Creates a returned (unnamed) array value in the generated code.

Code generation with uninterpreted functions

cgAddPrototype :: [String] -> SBVCodeGen () Source #

Adds the given lines to the header file generated, useful for generating programs with uninterpreted functions.

cgAddDecl :: [String] -> SBVCodeGen () Source #

Adds the given lines to the program file generated, useful for generating programs with uninterpreted functions.

cgAddLDFlags :: [String] -> SBVCodeGen () Source #

Adds the given words to the compiler options in the generated Makefile, useful for linking extra stuff in.

cgIgnoreSAssert :: Bool -> SBVCodeGen () Source #

Ignore assertions (those generated by sAssert calls) in the generated C code

Code generation with SInteger and SReal types

cgIntegerSize :: Int -> SBVCodeGen () Source #

Sets number of bits to be used for representing the SInteger type in the generated C code. The argument must be one of 8, 16, 32, or 64. Note that this is essentially unsafe as the semantics of unbounded Haskell integers becomes reduced to the corresponding bit size, as typical in most C implementations.

cgSRealType :: CgSRealType -> SBVCodeGen () Source #

Sets the C type to be used for representing the SReal type in the generated C code. The setting can be one of C's "float", "double", or "long double", types, depending on the precision needed. Note that this is essentially unsafe as the semantics of infinite precision SReal values becomes reduced to the corresponding floating point type in C, and hence it is subject to rounding errors.

data CgSRealType Source #

Possible mappings for the SReal type when translated to C. Used in conjunction with the function cgSRealType. Note that the particular characteristics of the mapped types depend on the platform and the compiler used for compiling the generated C program. See http://en.wikipedia.org/wiki/C_data_types for details.

Constructors

CgFloat
float
CgDouble
double
CgLongDouble
long double

Instances

Eq CgSRealType Source # 
Show CgSRealType Source #

Show instance for cgSRealType displays values as they would be used in a C program

Compilation to C

compileToC :: Maybe FilePath -> String -> SBVCodeGen () -> IO () Source #

Given a symbolic computation, render it as an equivalent collection of files that make up a C program:

  • The first argument is the directory name under which the files will be saved. To save files in the current directory pass Just ".". Use Nothing for printing to stdout.
  • The second argument is the name of the C function to generate.
  • The final argument is the function to be compiled.

Compilation will also generate a Makefile, a header file, and a driver (test) program, etc.

compileToCLib :: Maybe FilePath -> String -> [(String, SBVCodeGen ())] -> IO () Source #

Create code to generate a library archive (.a) from given symbolic functions. Useful when generating code from multiple functions that work together as a library.

  • The first argument is the directory name under which the files will be saved. To save files in the current directory pass Just ".". Use Nothing for printing to stdout.
  • The second argument is the name of the archive to generate.
  • The third argument is the list of functions to include, in the form of function-name/code pairs, similar to the second and third arguments of compileToC, except in a list.

Compilation to SMTLib

compileToSMTLib Source #

Arguments

:: SMTLibVersion

If True, output SMT-Lib2, otherwise SMT-Lib1

-> Bool

If True, translate directly, otherwise negate the goal. (Use True for SAT queries, False for PROVE queries.)

-> Symbolic SVal 
-> IO String 

Compiles to SMT-Lib and returns the resulting program as a string. Useful for saving the result to a file for off-line analysis, for instance if you have an SMT solver that's not natively supported out-of-the box by the SBV library. It takes two arguments:

  • version: The SMTLib-version to produce. Note that we currently only support SMTLib2.
  • isSat : If True, will translate it as a SAT query, i.e., in the positive. If False, will translate as a PROVE query, i.e., it will negate the result. (In this case, the check-sat call to the SMT solver will produce UNSAT if the input is a theorem, as usual.)

generateSMTBenchmarks :: Bool -> FilePath -> Symbolic SVal -> IO () Source #

Create both SMT-Lib1 and SMT-Lib2 benchmarks. The first argument is the basename of the file, SMT-Lib1 version will be written with suffix ".smt1" and SMT-Lib2 version will be written with suffix ".smt2". The Bool argument controls whether this is a SAT instance, i.e., translate the query directly, or a PROVE instance, i.e., translate the negated query. (See the second boolean argument to compileToSMTLib for details.)