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|
//===-- MetaSMTBuilder.h ----------------------------------------*- C++ -*-===//
//
// The KLEE Symbolic Virtual Machine
//
// This file is distributed under the University of Illinois Open Source
// License. See LICENSE.TXT for details.
//
//===----------------------------------------------------------------------===//
#ifndef KLEE_METASMTBUILDER_H
#define KLEE_METASMTBUILDER_H
#include "ConstantDivision.h"
#include "klee/Config/config.h"
#include "klee/Expr/ArrayExprHash.h"
#include "klee/Expr/Expr.h"
#include "klee/Expr/ExprHashMap.h"
#include "klee/Expr/ExprPPrinter.h"
#ifdef ENABLE_METASMT
#include "llvm/Support/CommandLine.h"
#include <metaSMT/frontend/Logic.hpp>
#include <metaSMT/frontend/QF_BV.hpp>
#include <metaSMT/frontend/Array.hpp>
using namespace metaSMT;
using namespace metaSMT::logic::QF_BV;
#define DIRECT_CONTEXT
namespace {
llvm::cl::opt<bool> UseConstructHashMetaSMT(
"use-construct-hash-metasmt",
llvm::cl::desc("Use hash-consing during metaSMT query construction."),
llvm::cl::init(true));
}
namespace klee {
typedef metaSMT::logic::Predicate<proto::terminal<
metaSMT::logic::tag::true_tag>::type> const MetaSMTConstTrue;
typedef metaSMT::logic::Predicate<proto::terminal<
metaSMT::logic::tag::false_tag>::type> const MetaSMTConstFalse;
typedef metaSMT::logic::Array::array MetaSMTArray;
template <typename SolverContext> class MetaSMTBuilder;
template <typename SolverContext>
class MetaSMTArrayExprHash
: public ArrayExprHash<typename SolverContext::result_type> {
friend class MetaSMTBuilder<SolverContext>;
public:
MetaSMTArrayExprHash(){};
virtual ~MetaSMTArrayExprHash(){};
};
template <typename SolverContext> class MetaSMTBuilder {
public:
MetaSMTBuilder(SolverContext &solver, bool optimizeDivides)
: _solver(solver), _optimizeDivides(optimizeDivides){};
virtual ~MetaSMTBuilder(){};
typename SolverContext::result_type construct(ref<Expr> e);
typename SolverContext::result_type getInitialRead(const Array *root,
unsigned index);
typename SolverContext::result_type getTrue() {
return (evaluate(_solver, metaSMT::logic::True));
}
typename SolverContext::result_type getFalse() {
return (evaluate(_solver, metaSMT::logic::False));
}
typename SolverContext::result_type bvOne(unsigned width) {
return bvZExtConst(width, 1);
}
typename SolverContext::result_type bvZero(unsigned width) {
return bvZExtConst(width, 0);
}
typename SolverContext::result_type bvMinusOne(unsigned width) {
return bvSExtConst(width, (int64_t)-1);
}
typename SolverContext::result_type bvConst32(unsigned width,
uint32_t value) {
return (evaluate(_solver, bvuint(value, width)));
}
typename SolverContext::result_type bvConst64(unsigned width,
uint64_t value) {
return (evaluate(_solver, bvuint(value, width)));
}
typename SolverContext::result_type bvZExtConst(unsigned width,
uint64_t value);
typename SolverContext::result_type bvSExtConst(unsigned width,
uint64_t value);
// logical left and right shift (not arithmetic)
typename SolverContext::result_type
bvLeftShift(typename SolverContext::result_type expr, unsigned width,
unsigned shift);
typename SolverContext::result_type
bvRightShift(typename SolverContext::result_type expr, unsigned width,
unsigned shift);
typename SolverContext::result_type
bvVarLeftShift(typename SolverContext::result_type expr,
typename SolverContext::result_type shift, unsigned width);
typename SolverContext::result_type
bvVarRightShift(typename SolverContext::result_type expr,
typename SolverContext::result_type shift, unsigned width);
typename SolverContext::result_type
bvVarArithRightShift(typename SolverContext::result_type expr,
typename SolverContext::result_type shift,
unsigned width);
typename SolverContext::result_type getArrayForUpdate(const Array *root,
const UpdateNode *un);
typename SolverContext::result_type getInitialArray(const Array *root);
MetaSMTArray buildArray(unsigned elem_width, unsigned index_width);
private:
typedef ExprHashMap<std::pair<typename SolverContext::result_type, unsigned> >
MetaSMTExprHashMap;
typedef typename MetaSMTExprHashMap::iterator MetaSMTExprHashMapIter;
typedef typename MetaSMTExprHashMap::const_iterator
MetaSMTExprHashMapConstIter;
SolverContext &_solver;
bool _optimizeDivides;
MetaSMTArrayExprHash<SolverContext> _arr_hash;
MetaSMTExprHashMap _constructed;
typename SolverContext::result_type constructActual(ref<Expr> e,
int *width_out);
typename SolverContext::result_type construct(ref<Expr> e, int *width_out);
typename SolverContext::result_type
bvBoolExtract(typename SolverContext::result_type expr, int bit);
typename SolverContext::result_type
bvExtract(typename SolverContext::result_type expr, unsigned top,
unsigned bottom);
typename SolverContext::result_type
eqExpr(typename SolverContext::result_type a,
typename SolverContext::result_type b);
typename SolverContext::result_type
constructAShrByConstant(typename SolverContext::result_type expr,
unsigned width, unsigned shift,
typename SolverContext::result_type isSigned);
typename SolverContext::result_type
constructMulByConstant(typename SolverContext::result_type expr,
unsigned width, uint64_t x);
typename SolverContext::result_type
constructUDivByConstant(typename SolverContext::result_type expr_n,
unsigned width, uint64_t d);
typename SolverContext::result_type
constructSDivByConstant(typename SolverContext::result_type expr_n,
unsigned width, uint64_t d);
};
template <typename SolverContext>
typename SolverContext::result_type
MetaSMTBuilder<SolverContext>::getArrayForUpdate(const Array *root,
const UpdateNode *un) {
if (!un) {
return (getInitialArray(root));
} else {
typename SolverContext::result_type un_expr;
bool hashed = _arr_hash.lookupUpdateNodeExpr(un, un_expr);
if (!hashed) {
un_expr = evaluate(_solver,
metaSMT::logic::Array::store(
getArrayForUpdate(root, un->next.get()),
construct(un->index, 0), construct(un->value, 0)));
_arr_hash.hashUpdateNodeExpr(un, un_expr);
}
return (un_expr);
}
}
template <typename SolverContext>
typename SolverContext::result_type
MetaSMTBuilder<SolverContext>::getInitialArray(const Array *root) {
assert(root);
typename SolverContext::result_type array_expr;
bool hashed = _arr_hash.lookupArrayExpr(root, array_expr);
if (!hashed) {
array_expr =
evaluate(_solver, buildArray(root->getRange(), root->getDomain()));
if (root->isConstantArray()) {
for (unsigned i = 0, e = root->size; i != e; ++i) {
typename SolverContext::result_type tmp = evaluate(
_solver,
metaSMT::logic::Array::store(
array_expr,
construct(ConstantExpr::alloc(i, root->getDomain()), 0),
construct(root->constantValues[i], 0)));
array_expr = tmp;
}
}
_arr_hash.hashArrayExpr(root, array_expr);
}
return (array_expr);
}
template <typename SolverContext>
MetaSMTArray MetaSMTBuilder<SolverContext>::buildArray(unsigned elem_width,
unsigned index_width) {
return (metaSMT::logic::Array::new_array(elem_width, index_width));
}
template <typename SolverContext>
typename SolverContext::result_type
MetaSMTBuilder<SolverContext>::getInitialRead(const Array *root,
unsigned index) {
assert(root);
assert(false);
typename SolverContext::result_type array_exp = getInitialArray(root);
typename SolverContext::result_type res =
evaluate(_solver, metaSMT::logic::Array::select(
array_exp, bvuint(index, root->getDomain())));
return (res);
}
template <typename SolverContext>
typename SolverContext::result_type
MetaSMTBuilder<SolverContext>::bvZExtConst(unsigned width, uint64_t value) {
typename SolverContext::result_type res;
if (width <= 64) {
res = bvConst64(width, value);
} else {
typename SolverContext::result_type expr = bvConst64(64, value);
typename SolverContext::result_type zero = bvConst64(64, 0);
for (width -= 64; width > 64; width -= 64) {
expr = evaluate(_solver, concat(zero, expr));
}
res = evaluate(_solver, concat(bvConst64(width, 0), expr));
}
return (res);
}
template <typename SolverContext>
typename SolverContext::result_type
MetaSMTBuilder<SolverContext>::bvSExtConst(unsigned width, uint64_t value) {
typename SolverContext::result_type res;
if (width <= 64) {
res = bvConst64(width, value);
} else {
// ToDo Reconsider -- note differences in STP and metaSMT for sign_extend
// arguments
res = evaluate(_solver, sign_extend(width - 64, bvConst64(64, value)));
}
return (res);
}
template <typename SolverContext>
typename SolverContext::result_type
MetaSMTBuilder<SolverContext>::bvBoolExtract(
typename SolverContext::result_type expr, int bit) {
return (evaluate(_solver,
metaSMT::logic::equal(extract(bit, bit, expr), bvOne(1))));
}
template <typename SolverContext>
typename SolverContext::result_type MetaSMTBuilder<SolverContext>::bvExtract(
typename SolverContext::result_type expr, unsigned top, unsigned bottom) {
return (evaluate(_solver, extract(top, bottom, expr)));
}
template <typename SolverContext>
typename SolverContext::result_type
MetaSMTBuilder<SolverContext>::eqExpr(typename SolverContext::result_type a,
typename SolverContext::result_type b) {
return (evaluate(_solver, metaSMT::logic::equal(a, b)));
}
template <typename SolverContext>
typename SolverContext::result_type
MetaSMTBuilder<SolverContext>::constructAShrByConstant(
typename SolverContext::result_type expr, unsigned width, unsigned shift,
typename SolverContext::result_type isSigned) {
typename SolverContext::result_type res;
if (shift == 0) {
res = expr;
} else if (shift >= width) {
res = bvZero(width);
} else {
res = evaluate(
_solver,
metaSMT::logic::Ite(isSigned, concat(bvMinusOne(shift),
bvExtract(expr, width - 1, shift)),
bvRightShift(expr, width, shift)));
}
return (res);
}
// width is the width of expr; x -- number of bits to shift with
template <typename SolverContext>
typename SolverContext::result_type
MetaSMTBuilder<SolverContext>::constructMulByConstant(
typename SolverContext::result_type expr, unsigned width, uint64_t x) {
uint64_t add, sub;
typename SolverContext::result_type res;
bool first = true;
// expr*x == expr*(add-sub) == expr*add - expr*sub
ComputeMultConstants64(x, add, sub);
// legal, these would overflow completely
add = bits64::truncateToNBits(add, width);
sub = bits64::truncateToNBits(sub, width);
for (int j = 63; j >= 0; j--) {
uint64_t bit = 1LL << j;
if ((add & bit) || (sub & bit)) {
assert(!((add & bit) && (sub & bit)) && "invalid mult constants");
typename SolverContext::result_type op = bvLeftShift(expr, width, j);
if (add & bit) {
if (!first) {
res = evaluate(_solver, bvadd(res, op));
} else {
res = op;
first = false;
}
} else {
if (!first) {
res = evaluate(_solver, bvsub(res, op));
} else {
// To reconsider: vc_bvUMinusExpr in STP
res = evaluate(_solver, bvsub(bvZero(width), op));
first = false;
}
}
}
}
if (first) {
res = bvZero(width);
}
return (res);
}
/*
* Compute the 32-bit unsigned integer division of n by a divisor d based on
* the constants derived from the constant divisor d.
*
* Returns n/d without doing explicit division. The cost is 2 adds, 3 shifts,
* and a (64-bit) multiply.
*
* @param expr_n numerator (dividend) n as an expression
* @param width number of bits used to represent the value
* @param d the divisor
*
* @return n/d without doing explicit division
*/
template <typename SolverContext>
typename SolverContext::result_type
MetaSMTBuilder<SolverContext>::constructUDivByConstant(
typename SolverContext::result_type expr_n, unsigned width, uint64_t d) {
assert(width == 32 && "can only compute udiv constants for 32-bit division");
// Compute the constants needed to compute n/d for constant d without division
// by d.
uint32_t mprime, sh1, sh2;
ComputeUDivConstants32(d, mprime, sh1, sh2);
typename SolverContext::result_type expr_sh1 = bvConst32(32, sh1);
typename SolverContext::result_type expr_sh2 = bvConst32(32, sh2);
// t1 = MULUH(mprime, n) = ( (uint64_t)mprime * (uint64_t)n ) >> 32
typename SolverContext::result_type expr_n_64 =
evaluate(_solver, concat(bvZero(32), expr_n)); // extend to 64 bits
typename SolverContext::result_type t1_64bits =
constructMulByConstant(expr_n_64, 64, (uint64_t)mprime);
typename SolverContext::result_type t1 =
bvExtract(t1_64bits, 63, 32); // upper 32 bits
// n/d = (((n - t1) >> sh1) + t1) >> sh2;
typename SolverContext::result_type n_minus_t1 =
evaluate(_solver, bvsub(expr_n, t1));
typename SolverContext::result_type shift_sh1 =
bvVarRightShift(n_minus_t1, expr_sh1, 32);
typename SolverContext::result_type plus_t1 =
evaluate(_solver, bvadd(shift_sh1, t1));
typename SolverContext::result_type res =
bvVarRightShift(plus_t1, expr_sh2, 32);
return (res);
}
/*
* Compute the 32-bitnsigned integer division of n by a divisor d based on
* the constants derived from the constant divisor d.
*
* Returns n/d without doing explicit division. The cost is 3 adds, 3 shifts,
* a (64-bit) multiply, and an XOR.
*
* @param n numerator (dividend) as an expression
* @param width number of bits used to represent the value
* @param d the divisor
*
* @return n/d without doing explicit division
*/
template <typename SolverContext>
typename SolverContext::result_type
MetaSMTBuilder<SolverContext>::constructSDivByConstant(
typename SolverContext::result_type expr_n, unsigned width, uint64_t d) {
assert(width == 32 && "can only compute udiv constants for 32-bit division");
// Compute the constants needed to compute n/d for constant d w/o division by
// d.
int32_t mprime, dsign, shpost;
ComputeSDivConstants32(d, mprime, dsign, shpost);
typename SolverContext::result_type expr_dsign = bvConst32(32, dsign);
typename SolverContext::result_type expr_shpost = bvConst32(64, shpost);
// q0 = n + MULSH( mprime, n ) = n + (( (int64_t)mprime * (int64_t)n ) >> 32)
int64_t mprime_64 = (int64_t)mprime;
// ToDo Reconsider -- note differences in STP and metaSMT for sign_extend
// arguments
typename SolverContext::result_type expr_n_64 =
evaluate(_solver, sign_extend(64 - width, expr_n));
typename SolverContext::result_type mult_64 =
constructMulByConstant(expr_n_64, 64, mprime_64);
typename SolverContext::result_type mulsh =
bvExtract(mult_64, 63, 32); // upper 32-bits
typename SolverContext::result_type n_plus_mulsh =
evaluate(_solver, bvadd(expr_n, mulsh));
// Improved variable arithmetic right shift: sign extend, shift, extract.
typename SolverContext::result_type extend_npm =
evaluate(_solver, sign_extend(64 - width, n_plus_mulsh));
typename SolverContext::result_type shift_npm =
bvVarRightShift(extend_npm, expr_shpost, 64);
typename SolverContext::result_type shift_shpost =
bvExtract(shift_npm, 31, 0); // lower 32-bits
/////////////
// XSIGN(n) is -1 if n is negative, positive one otherwise
typename SolverContext::result_type is_signed = bvBoolExtract(expr_n, 31);
typename SolverContext::result_type neg_one = bvMinusOne(32);
typename SolverContext::result_type xsign_of_n =
evaluate(_solver, metaSMT::logic::Ite(is_signed, neg_one, bvZero(32)));
// q0 = (n_plus_mulsh >> shpost) - XSIGN(n)
typename SolverContext::result_type q0 =
evaluate(_solver, bvsub(shift_shpost, xsign_of_n));
// n/d = (q0 ^ dsign) - dsign
typename SolverContext::result_type q0_xor_dsign =
evaluate(_solver, bvxor(q0, expr_dsign));
typename SolverContext::result_type res =
evaluate(_solver, bvsub(q0_xor_dsign, expr_dsign));
return (res);
}
template <typename SolverContext>
typename SolverContext::result_type MetaSMTBuilder<SolverContext>::bvLeftShift(
typename SolverContext::result_type expr, unsigned width, unsigned shift) {
typename SolverContext::result_type res;
if (shift == 0) {
res = expr;
} else if (shift >= width) {
res = bvZero(width);
} else {
// stp shift does "expr @ [0 x s]" which we then have to extract,
// rolling our own gives slightly smaller exprs
res = evaluate(_solver,
concat(extract(width - shift - 1, 0, expr), bvZero(shift)));
}
return (res);
}
template <typename SolverContext>
typename SolverContext::result_type MetaSMTBuilder<SolverContext>::bvRightShift(
typename SolverContext::result_type expr, unsigned width, unsigned shift) {
typename SolverContext::result_type res;
if (shift == 0) {
res = expr;
} else if (shift >= width) {
res = bvZero(width);
} else {
res = evaluate(_solver,
concat(bvZero(shift), extract(width - 1, shift, expr)));
}
return (res);
}
// left shift by a variable amount on an expression of the specified width
template <typename SolverContext>
typename SolverContext::result_type
MetaSMTBuilder<SolverContext>::bvVarLeftShift(
typename SolverContext::result_type expr,
typename SolverContext::result_type shift, unsigned width) {
assert(_solver.get_bv_width(expr) == width);
assert(_solver.get_bv_width(shift) == width);
// If overshifting, shift to zero
return evaluate(_solver,
metaSMT::logic::Ite(bvult(shift, bvConst32(width, width)),
bvshl(expr, shift), bvZero(width)));
}
// logical right shift by a variable amount on an expression of the specified
// width
template <typename SolverContext>
typename SolverContext::result_type
MetaSMTBuilder<SolverContext>::bvVarRightShift(
typename SolverContext::result_type expr,
typename SolverContext::result_type shift, unsigned width) {
assert(_solver.get_bv_width(expr) == width);
assert(_solver.get_bv_width(shift) == width);
// If overshifting, shift to zero
return evaluate(_solver,
metaSMT::logic::Ite(bvult(shift, bvConst32(width, width)),
bvshr(expr, shift), bvZero(width)));
}
// arithmetic right shift by a variable amount on an expression of the specified
// width
template <typename SolverContext>
typename SolverContext::result_type
MetaSMTBuilder<SolverContext>::bvVarArithRightShift(
typename SolverContext::result_type expr,
typename SolverContext::result_type shift, unsigned width) {
assert(_solver.get_bv_width(expr) == width);
assert(_solver.get_bv_width(shift) == width);
// If overshifting, shift to zero
return evaluate(_solver,
metaSMT::logic::Ite(bvult(shift, bvConst32(width, width)),
bvashr(expr, shift), bvZero(width)));
}
template <typename SolverContext>
typename SolverContext::result_type
MetaSMTBuilder<SolverContext>::construct(ref<Expr> e) {
typename SolverContext::result_type res = construct(e, 0);
_constructed.clear();
return res;
}
/** if *width_out!=1 then result is a bitvector,
otherwise it is a bool */
template <typename SolverContext>
typename SolverContext::result_type
MetaSMTBuilder<SolverContext>::construct(ref<Expr> e, int *width_out) {
if (!UseConstructHashMetaSMT || isa<ConstantExpr>(e)) {
return (constructActual(e, width_out));
} else {
MetaSMTExprHashMapIter it = _constructed.find(e);
if (it != _constructed.end()) {
if (width_out) {
*width_out = it->second.second;
}
return it->second.first;
} else {
int width = 0;
if (!width_out) {
width_out = &width;
}
typename SolverContext::result_type res = constructActual(e, width_out);
_constructed.insert(std::make_pair(e, std::make_pair(res, *width_out)));
return res;
}
}
}
template <typename SolverContext>
typename SolverContext::result_type
MetaSMTBuilder<SolverContext>::constructActual(ref<Expr> e, int *width_out) {
typename SolverContext::result_type res;
int width = 0;
if (!width_out) {
// assert(false);
width_out = &width;
}
++stats::queryConstructs;
// llvm::errs() << "Constructing expression ";
// ExprPPrinter::printSingleExpr(llvm::errs(), e);
// llvm::errs() << "\n";
switch (e->getKind()) {
case Expr::Constant: {
ConstantExpr *coe = cast<ConstantExpr>(e);
assert(coe);
unsigned coe_width = coe->getWidth();
*width_out = coe_width;
// Coerce to bool if necessary.
if (coe_width == 1) {
res = (coe->isTrue()) ? getTrue() : getFalse();
} else if (coe_width <= 32) {
res = bvConst32(coe_width, coe->getZExtValue(32));
} else if (coe_width <= 64) {
res = bvConst64(coe_width, coe->getZExtValue());
} else {
ref<ConstantExpr> tmp = coe;
res = bvConst64(64, tmp->Extract(0, 64)->getZExtValue());
while (tmp->getWidth() > 64) {
tmp = tmp->Extract(64, tmp->getWidth() - 64);
unsigned min_width = std::min(64U, tmp->getWidth());
res = evaluate(_solver,
concat(bvConst64(min_width, tmp->Extract(0, min_width)
->getZExtValue()),
res));
}
}
break;
}
case Expr::NotOptimized: {
NotOptimizedExpr *noe = cast<NotOptimizedExpr>(e);
assert(noe);
res = construct(noe->src, width_out);
break;
}
case Expr::Select: {
SelectExpr *se = cast<SelectExpr>(e);
assert(se);
res = evaluate(_solver,
metaSMT::logic::Ite(construct(se->cond, 0),
construct(se->trueExpr, width_out),
construct(se->falseExpr, width_out)));
break;
}
case Expr::Read: {
ReadExpr *re = cast<ReadExpr>(e);
assert(re && re->updates.root);
*width_out = re->updates.root->getRange();
// FixMe call method of Array
res = evaluate(_solver, metaSMT::logic::Array::select(
getArrayForUpdate(re->updates.root,
re->updates.head.get()),
construct(re->index, 0)));
break;
}
case Expr::Concat: {
ConcatExpr *ce = cast<ConcatExpr>(e);
assert(ce);
*width_out = ce->getWidth();
unsigned numKids = ce->getNumKids();
if (numKids > 0) {
res = evaluate(_solver, construct(ce->getKid(numKids - 1), 0));
for (int i = numKids - 2; i >= 0; i--) {
res = evaluate(_solver, concat(construct(ce->getKid(i), 0), res));
}
}
break;
}
case Expr::Extract: {
ExtractExpr *ee = cast<ExtractExpr>(e);
assert(ee);
// ToDo spare evaluate?
typename SolverContext::result_type child =
evaluate(_solver, construct(ee->expr, width_out));
unsigned ee_width = ee->getWidth();
*width_out = ee_width;
if (ee_width == 1) {
res = bvBoolExtract(child, ee->offset);
} else {
res = evaluate(_solver,
extract(ee->offset + ee_width - 1, ee->offset, child));
}
break;
}
case Expr::ZExt: {
CastExpr *ce = cast<CastExpr>(e);
assert(ce);
int child_width = 0;
typename SolverContext::result_type child =
evaluate(_solver, construct(ce->src, &child_width));
unsigned ce_width = ce->getWidth();
*width_out = ce_width;
if (child_width == 1) {
res = evaluate(_solver, metaSMT::logic::Ite(child, bvOne(ce_width),
bvZero(ce_width)));
} else {
res = evaluate(_solver, zero_extend(ce_width - child_width, child));
}
// ToDo calculate how many zeros to add
// Note: STP and metaSMT differ in the prototype arguments;
// STP requires the width of the resulting bv;
// whereas metaSMT (and Z3) require the width of the zero vector that is to
// be appended
// res = evaluate(_solver, zero_extend(ce_width, construct(ce->src)));
break;
}
case Expr::SExt: {
CastExpr *ce = cast<CastExpr>(e);
assert(ce);
int child_width = 0;
typename SolverContext::result_type child =
evaluate(_solver, construct(ce->src, &child_width));
unsigned ce_width = ce->getWidth();
*width_out = ce_width;
if (child_width == 1) {
res = evaluate(_solver, metaSMT::logic::Ite(child, bvMinusOne(ce_width),
bvZero(ce_width)));
} else {
// ToDo ce_width - child_width? It is only ce_width in STPBuilder
res = evaluate(_solver, sign_extend(ce_width - child_width, child));
}
break;
}
case Expr::Add: {
AddExpr *ae = cast<AddExpr>(e);
assert(ae);
res = evaluate(_solver, bvadd(construct(ae->left, width_out),
construct(ae->right, width_out)));
assert(*width_out != 1 && "uncanonicalized add");
break;
}
case Expr::Sub: {
SubExpr *se = cast<SubExpr>(e);
assert(se);
res = evaluate(_solver, bvsub(construct(se->left, width_out),
construct(se->right, width_out)));
assert(*width_out != 1 && "uncanonicalized sub");
break;
}
case Expr::Mul: {
MulExpr *me = cast<MulExpr>(e);
assert(me);
typename SolverContext::result_type right_expr =
evaluate(_solver, construct(me->right, width_out));
assert(*width_out != 1 && "uncanonicalized mul");
ConstantExpr *CE = dyn_cast<ConstantExpr>(me->left);
if (CE && (CE->getWidth() <= 64)) {
res = constructMulByConstant(right_expr, *width_out, CE->getZExtValue());
} else {
res =
evaluate(_solver, bvmul(construct(me->left, width_out), right_expr));
}
break;
}
case Expr::UDiv: {
UDivExpr *de = cast<UDivExpr>(e);
assert(de);
typename SolverContext::result_type left_expr =
construct(de->left, width_out);
assert(*width_out != 1 && "uncanonicalized udiv");
bool construct_both = true;
ConstantExpr *CE = dyn_cast<ConstantExpr>(de->right);
if (CE && (CE->getWidth() <= 64)) {
uint64_t divisor = CE->getZExtValue();
if (bits64::isPowerOfTwo(divisor)) {
res = bvRightShift(left_expr, *width_out,
bits64::indexOfSingleBit(divisor));
construct_both = false;
} else if (_optimizeDivides) {
if (*width_out == 32) { // only works for 32-bit division
res =
constructUDivByConstant(left_expr, *width_out, (uint32_t)divisor);
construct_both = false;
}
}
}
if (construct_both) {
res =
evaluate(_solver, bvudiv(left_expr, construct(de->right, width_out)));
}
break;
}
case Expr::SDiv: {
SDivExpr *de = cast<SDivExpr>(e);
assert(de);
typename SolverContext::result_type left_expr =
construct(de->left, width_out);
assert(*width_out != 1 && "uncanonicalized sdiv");
bool optimized = false;
ConstantExpr *CE = dyn_cast<ConstantExpr>(de->right);
if (CE && _optimizeDivides && (*width_out == 32)) {
llvm::APInt divisor = CE->getAPValue();
if (divisor != llvm::APInt(CE->getWidth(), 1, false /*unsigned*/) &&
divisor != llvm::APInt(CE->getWidth(), -1, true /*signed*/)) {
res = constructSDivByConstant(left_expr, *width_out,
CE->getZExtValue(32));
optimized = true;
}
}
if (!optimized) {
res =
evaluate(_solver, bvsdiv(left_expr, construct(de->right, width_out)));
}
break;
}
case Expr::URem: {
URemExpr *de = cast<URemExpr>(e);
assert(de);
typename SolverContext::result_type left_expr =
construct(de->left, width_out);
assert(*width_out != 1 && "uncanonicalized urem");
bool construct_both = true;
ConstantExpr *CE = dyn_cast<ConstantExpr>(de->right);
if (CE && (CE->getWidth() <= 64)) {
uint64_t divisor = CE->getZExtValue();
if (bits64::isPowerOfTwo(divisor)) {
unsigned bits = bits64::indexOfSingleBit(divisor);
// special case for modding by 1 or else we bvExtract -1:0
if (bits == 0) {
res = bvZero(*width_out);
construct_both = false;
} else {
res = evaluate(_solver, concat(bvZero(*width_out - bits),
bvExtract(left_expr, bits - 1, 0)));
construct_both = false;
}
}
// Use fast division to compute modulo without explicit division for
// constant divisor.
if (_optimizeDivides &&
*width_out == 32) { // only works for 32-bit division
typename SolverContext::result_type quotient =
constructUDivByConstant(left_expr, *width_out, (uint32_t)divisor);
typename SolverContext::result_type quot_times_divisor =
constructMulByConstant(quotient, *width_out, divisor);
res = evaluate(_solver, bvsub(left_expr, quot_times_divisor));
construct_both = false;
}
}
if (construct_both) {
res =
evaluate(_solver, bvurem(left_expr, construct(de->right, width_out)));
}
break;
}
case Expr::SRem: {
SRemExpr *de = cast<SRemExpr>(e);
assert(de);
typename SolverContext::result_type left_expr =
evaluate(_solver, construct(de->left, width_out));
typename SolverContext::result_type right_expr =
evaluate(_solver, construct(de->right, width_out));
assert(*width_out != 1 && "uncanonicalized srem");
bool construct_both = true;
#if 0 // not faster per first benchmark
if (_optimizeDivides) {
if (ConstantExpr *cre = de->right->asConstant()) {
uint64_t divisor = cre->asUInt64;
//use fast division to compute modulo without explicit division for constant divisor
if( *width_out == 32 ) { //only works for 32-bit division
typename SolverContext::result_type quotient = constructSDivByConstant(left, *width_out, divisor);
typename SolverContext::result_type quot_times_divisor = constructMulByConstant(quotient, *width_out, divisor);
res = vc_bvMinusExpr( vc, *width_out, left, quot_times_divisor );
construct_both = false;
}
}
}
#endif
if (construct_both) {
res = evaluate(_solver, bvsrem(left_expr, right_expr));
}
break;
}
case Expr::Not: {
NotExpr *ne = cast<NotExpr>(e);
assert(ne);
typename SolverContext::result_type child =
evaluate(_solver, construct(ne->expr, width_out));
if (*width_out == 1) {
res = evaluate(_solver, metaSMT::logic::Not(child));
} else {
res = evaluate(_solver, bvnot(child));
}
break;
}
case Expr::And: {
AndExpr *ae = cast<AndExpr>(e);
assert(ae);
typename SolverContext::result_type left_expr =
evaluate(_solver, construct(ae->left, width_out));
typename SolverContext::result_type right_expr =
evaluate(_solver, construct(ae->right, width_out));
if (*width_out == 1) {
res = evaluate(_solver, metaSMT::logic::And(left_expr, right_expr));
} else {
res = evaluate(_solver, bvand(left_expr, right_expr));
}
break;
}
case Expr::Or: {
OrExpr *oe = cast<OrExpr>(e);
assert(oe);
typename SolverContext::result_type left_expr =
evaluate(_solver, construct(oe->left, width_out));
typename SolverContext::result_type right_expr =
evaluate(_solver, construct(oe->right, width_out));
if (*width_out == 1) {
res = evaluate(_solver, metaSMT::logic::Or(left_expr, right_expr));
} else {
res = evaluate(_solver, bvor(left_expr, right_expr));
}
break;
}
case Expr::Xor: {
XorExpr *xe = cast<XorExpr>(e);
assert(xe);
typename SolverContext::result_type left_expr =
evaluate(_solver, construct(xe->left, width_out));
typename SolverContext::result_type right_expr =
evaluate(_solver, construct(xe->right, width_out));
if (*width_out == 1) {
res = evaluate(_solver, metaSMT::logic::Xor(left_expr, right_expr));
} else {
res = evaluate(_solver, bvxor(left_expr, right_expr));
}
break;
}
case Expr::Shl: {
ShlExpr *se = cast<ShlExpr>(e);
assert(se);
typename SolverContext::result_type left_expr =
evaluate(_solver, construct(se->left, width_out));
assert(*width_out != 1 && "uncanonicalized shl");
if (ConstantExpr *CE = dyn_cast<ConstantExpr>(se->right)) {
res = bvLeftShift(left_expr, *width_out, (unsigned)CE->getLimitedValue());
} else {
int shiftWidth = 0;
typename SolverContext::result_type right_expr =
evaluate(_solver, construct(se->right, &shiftWidth));
res = bvVarLeftShift(left_expr, right_expr, *width_out);
}
break;
}
case Expr::LShr: {
LShrExpr *lse = cast<LShrExpr>(e);
assert(lse);
typename SolverContext::result_type left_expr =
evaluate(_solver, construct(lse->left, width_out));
assert(*width_out != 1 && "uncanonicalized lshr");
if (ConstantExpr *CE = dyn_cast<ConstantExpr>(lse->right)) {
res =
bvRightShift(left_expr, *width_out, (unsigned)CE->getLimitedValue());
} else {
int shiftWidth = 0;
typename SolverContext::result_type right_expr =
evaluate(_solver, construct(lse->right, &shiftWidth));
res = bvVarRightShift(left_expr, right_expr, *width_out);
}
break;
}
case Expr::AShr: {
AShrExpr *ase = cast<AShrExpr>(e);
assert(ase);
typename SolverContext::result_type left_expr =
evaluate(_solver, construct(ase->left, width_out));
assert(*width_out != 1 && "uncanonicalized ashr");
if (ConstantExpr *CE = dyn_cast<ConstantExpr>(ase->right)) {
unsigned shift = (unsigned)CE->getLimitedValue();
typename SolverContext::result_type signedBool =
bvBoolExtract(left_expr, *width_out - 1);
res = constructAShrByConstant(left_expr, *width_out, shift, signedBool);
} else {
int shiftWidth = 0;
typename SolverContext::result_type right_expr =
evaluate(_solver, construct(ase->right, &shiftWidth));
res = bvVarArithRightShift(left_expr, right_expr, *width_out);
}
break;
}
case Expr::Eq: {
EqExpr *ee = cast<EqExpr>(e);
assert(ee);
typename SolverContext::result_type left_expr =
evaluate(_solver, construct(ee->left, width_out));
typename SolverContext::result_type right_expr =
evaluate(_solver, construct(ee->right, width_out));
if (*width_out == 1) {
if (ConstantExpr *CE = dyn_cast<ConstantExpr>(ee->left)) {
if (CE->isTrue()) {
res = right_expr;
} else {
res = evaluate(_solver, metaSMT::logic::Not(right_expr));
}
} else {
res = evaluate(_solver, metaSMT::logic::equal(left_expr, right_expr));
}
} // end of *width_out == 1
else {
*width_out = 1;
res = evaluate(_solver, metaSMT::logic::equal(left_expr, right_expr));
}
break;
}
case Expr::Ult: {
UltExpr *ue = cast<UltExpr>(e);
assert(ue);
typename SolverContext::result_type left_expr =
evaluate(_solver, construct(ue->left, width_out));
typename SolverContext::result_type right_expr =
evaluate(_solver, construct(ue->right, width_out));
assert(*width_out != 1 && "uncanonicalized ult");
*width_out = 1;
res = evaluate(_solver, bvult(left_expr, right_expr));
break;
}
case Expr::Ule: {
UleExpr *ue = cast<UleExpr>(e);
assert(ue);
typename SolverContext::result_type left_expr =
evaluate(_solver, construct(ue->left, width_out));
typename SolverContext::result_type right_expr =
evaluate(_solver, construct(ue->right, width_out));
assert(*width_out != 1 && "uncanonicalized ule");
*width_out = 1;
res = evaluate(_solver, bvule(left_expr, right_expr));
break;
}
case Expr::Slt: {
SltExpr *se = cast<SltExpr>(e);
assert(se);
typename SolverContext::result_type left_expr =
evaluate(_solver, construct(se->left, width_out));
typename SolverContext::result_type right_expr =
evaluate(_solver, construct(se->right, width_out));
assert(*width_out != 1 && "uncanonicalized slt");
*width_out = 1;
res = evaluate(_solver, bvslt(left_expr, right_expr));
break;
}
case Expr::Sle: {
SleExpr *se = cast<SleExpr>(e);
assert(se);
typename SolverContext::result_type left_expr =
evaluate(_solver, construct(se->left, width_out));
typename SolverContext::result_type right_expr =
evaluate(_solver, construct(se->right, width_out));
assert(*width_out != 1 && "uncanonicalized sle");
*width_out = 1;
res = evaluate(_solver, bvsle(left_expr, right_expr));
break;
}
// unused due to canonicalization
#if 0
case Expr::Ne:
case Expr::Ugt:
case Expr::Uge:
case Expr::Sgt:
case Expr::Sge:
#endif
default:
assert(false);
break;
};
return res;
}
} /* end of namespace klee */
#endif /* ENABLE_METASMT */
#endif /* KLEE_METASMTBUILDER_H */
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