lib/Support/ConstantRange.cpp - llvm - Git at Google

 //===-- ConstantRange.cpp - ConstantRange implementation ------------------===//
 //
 //                     The LLVM Compiler Infrastructure
 //
 // This file was developed by the LLVM research group and is distributed under
 // the University of Illinois Open Source License. See LICENSE.TXT for details.
 //
 //===----------------------------------------------------------------------===//
 //
 // Represent a range of possible values that may occur when the program is run
 // for an integral value.  This keeps track of a lower and upper bound for the
 // constant, which MAY wrap around the end of the numeric range.  To do this, it
 // keeps track of a [lower, upper) bound, which specifies an interval just like
 // STL iterators.  When used with boolean values, the following are important
 // ranges (other integral ranges use min/max values for special range values):
 //
 //  [F, F) = {}     = Empty set
 //  [T, F) = {T}
 //  [F, T) = {F}
 //  [T, T) = {F, T} = Full set
 //
 //===----------------------------------------------------------------------===//

 #include "llvm/Support/ConstantRange.h"
 #include "llvm/Type.h"
 #include "llvm/Instruction.h"
 #include "llvm/ConstantHandling.h"

 /// Initialize a full (the default) or empty set for the specified type.
 ///
 ConstantRange::ConstantRange(const Type *Ty, bool Full) {
   assert(Ty->isIntegral() &&
          "Cannot make constant range of non-integral type!");
   if (Full)
     Lower = Upper = ConstantIntegral::getMaxValue(Ty);
   else
     Lower = Upper = ConstantIntegral::getMinValue(Ty);
 }

 /// Initialize a range of values explicitly... this will assert out if
 /// Lower==Upper and Lower != Min or Max for its type (or if the two constants
 /// have different types)
 ///
 ConstantRange::ConstantRange(ConstantIntegral *L,
                              ConstantIntegral *U) : Lower(L), Upper(U) {
   assert(Lower->getType() == Upper->getType() &&
          "Incompatible types for ConstantRange!");

   // Make sure that if L & U are equal that they are either Min or Max...
   assert((L != U || (L == ConstantIntegral::getMaxValue(L->getType()) ||
                      L == ConstantIntegral::getMinValue(L->getType()))) &&
          "Lower == Upper, but they aren't min or max for type!");
 }

 static ConstantIntegral *Next(ConstantIntegral *CI) {
   if (CI->getType() == Type::BoolTy)
     return CI == ConstantBool::True ? ConstantBool::False : ConstantBool::True;

   // Otherwise use operator+ in the ConstantHandling Library.
   Constant *Result = *ConstantInt::get(CI->getType(), 1) + *CI;
   assert(Result && "ConstantHandling not implemented for integral plus!?");
   return cast<ConstantIntegral>(Result);
 }

 /// Initialize a set of values that all satisfy the condition with C.
 ///
 ConstantRange::ConstantRange(unsigned SetCCOpcode, ConstantIntegral *C) {
   switch (SetCCOpcode) {
   default: assert(0 && "Invalid SetCC opcode to ConstantRange ctor!");
   case Instruction::SetEQ: Lower = C; Upper = Next(C); return;
   case Instruction::SetNE: Upper = C; Lower = Next(C); return;
   case Instruction::SetLT:
     Lower = ConstantIntegral::getMinValue(C->getType());
     Upper = C;
     return;
   case Instruction::SetGT:
     Lower = Next(C);
     Upper = ConstantIntegral::getMinValue(C->getType());  // Min = Next(Max)
     return;
   case Instruction::SetLE:
     Lower = ConstantIntegral::getMinValue(C->getType());
     Upper = Next(C);
     return;
   case Instruction::SetGE:
     Lower = C;
     Upper = ConstantIntegral::getMinValue(C->getType());  // Min = Next(Max)
     return;
   }
 }

 /// getType - Return the LLVM data type of this range.
 ///
 const Type *ConstantRange::getType() const { return Lower->getType(); }

 /// isFullSet - Return true if this set contains all of the elements possible
 /// for this data-type
 bool ConstantRange::isFullSet() const {
   return Lower == Upper && Lower == ConstantIntegral::getMaxValue(getType());
 }

 /// isEmptySet - Return true if this set contains no members.
 ///
 bool ConstantRange::isEmptySet() const {
   return Lower == Upper && Lower == ConstantIntegral::getMinValue(getType());
 }

 /// isWrappedSet - Return true if this set wraps around the top of the range,
 /// for example: [100, 8)
 ///
 bool ConstantRange::isWrappedSet() const {
   return (*(Constant*)Lower > *(Constant*)Upper)->getValue();
 }


 /// getSingleElement - If this set contains a single element, return it,
 /// otherwise return null.
 ConstantIntegral *ConstantRange::getSingleElement() const {
   if (Upper == Next(Lower))  // Is it a single element range?
     return Lower;
   return 0;
 }

 /// getSetSize - Return the number of elements in this set.
 ///
 uint64_t ConstantRange::getSetSize() const {
   if (isEmptySet()) return 0;
   if (getType() == Type::BoolTy) {
     if (Lower != Upper)  // One of T or F in the set...
       return 1;
     return 2;            // Must be full set...
   }

   // Simply subtract the bounds...
   Constant *Result = *(Constant*)Upper - *(Constant*)Lower;
   assert(Result && "Subtraction of constant integers not implemented?");
   return cast<ConstantInt>(Result)->getRawValue();
 }


 // intersect1Wrapped - This helper function is used to intersect two ranges when
 // it is known that LHS is wrapped and RHS isn't.
 //
 static ConstantRange intersect1Wrapped(const ConstantRange &LHS,
                                        const ConstantRange &RHS) {
   assert(LHS.isWrappedSet() && !RHS.isWrappedSet());

   // Check to see if we overlap on the Left side of RHS...
   //
   if ((*(Constant*)RHS.getLower() < *(Constant*)LHS.getUpper())->getValue()) {
     // We do overlap on the left side of RHS, see if we overlap on the right of
     // RHS...
     if ((*(Constant*)RHS.getUpper() > *(Constant*)LHS.getLower())->getValue()) {
       // Ok, the result overlaps on both the left and right sides.  See if the
       // resultant interval will be smaller if we wrap or not...
       //
       if (LHS.getSetSize() < RHS.getSetSize())
         return LHS;
       else
         return RHS;

     } else {
       // No overlap on the right, just on the left.
       return ConstantRange(RHS.getLower(), LHS.getUpper());
     }

   } else {
     // We don't overlap on the left side of RHS, see if we overlap on the right
     // of RHS...
     if ((*(Constant*)RHS.getUpper() > *(Constant*)LHS.getLower())->getValue()) {
       // Simple overlap...
       return ConstantRange(LHS.getLower(), RHS.getUpper());
     } else {
       // No overlap...
       return ConstantRange(LHS.getType(), false);
     }
   }
 }

 static ConstantIntegral *Min(ConstantIntegral *A, ConstantIntegral *B) {
   if ((*(Constant*)A < *(Constant*)B)->getValue())
     return A;
   return B;
 }
 static ConstantIntegral *Max(ConstantIntegral *A, ConstantIntegral *B) {
   if ((*(Constant*)A > *(Constant*)B)->getValue())
     return A;
   return B;
 }


 /// intersect - Return the range that results from the intersection of this
 /// range with another range.
 ///
 ConstantRange ConstantRange::intersectWith(const ConstantRange &CR) const {
   assert(getType() == CR.getType() && "ConstantRange types don't agree!");
   // Handle common special cases
   if (isEmptySet() || CR.isFullSet())  return *this;
   if (isFullSet()  || CR.isEmptySet()) return CR;

   if (!isWrappedSet()) {
     if (!CR.isWrappedSet()) {
       ConstantIntegral *L = Max(Lower, CR.Lower);
       ConstantIntegral *U = Min(Upper, CR.Upper);

       if ((*L < *U)->getValue())  // If range isn't empty...
         return ConstantRange(L, U);
       else
         return ConstantRange(getType(), false);  // Otherwise, return empty set
     } else
       return intersect1Wrapped(CR, *this);
   } else {   // We know "this" is wrapped...
     if (!CR.isWrappedSet())
       return intersect1Wrapped(*this, CR);
     else {
       // Both ranges are wrapped...
       ConstantIntegral *L = Max(Lower, CR.Lower);
       ConstantIntegral *U = Min(Upper, CR.Upper);
       return ConstantRange(L, U);
     }
   }
   return *this;
 }

 /// union - Return the range that results from the union of this range with
 /// another range.  The resultant range is guaranteed to include the elements of
 /// both sets, but may contain more.  For example, [3, 9) union [12,15) is [3,
 /// 15), which includes 9, 10, and 11, which were not included in either set
 /// before.
 ///
 ConstantRange ConstantRange::unionWith(const ConstantRange &CR) const {
   assert(getType() == CR.getType() && "ConstantRange types don't agree!");

   assert(0 && "Range union not implemented yet!");

   return *this;
 }

 /// print - Print out the bounds to a stream...
 ///
 void ConstantRange::print(std::ostream &OS) const {
   OS << "[" << Lower << "," << Upper << " )";
 }

 /// dump - Allow printing from a debugger easily...
 ///
 void ConstantRange::dump() const {
   print(std::cerr);
 }
	//===-- ConstantRange.cpp - ConstantRange implementation ------------------===//
	//
	// The LLVM Compiler Infrastructure
	//
	// This file was developed by the LLVM research group and is distributed under
	// the University of Illinois Open Source License. See LICENSE.TXT for details.
	//
	//===----------------------------------------------------------------------===//
	//
	// Represent a range of possible values that may occur when the program is run
	// for an integral value. This keeps track of a lower and upper bound for the
	// constant, which MAY wrap around the end of the numeric range. To do this, it
	// keeps track of a [lower, upper) bound, which specifies an interval just like
	// STL iterators. When used with boolean values, the following are important
	// ranges (other integral ranges use min/max values for special range values):
	//
	// [F, F) = {} = Empty set
	// [T, F) = {T}
	// [F, T) = {F}
	// [T, T) = {F, T} = Full set
	//
	//===----------------------------------------------------------------------===//

	#include "llvm/Support/ConstantRange.h"
	#include "llvm/Type.h"
	#include "llvm/Instruction.h"
	#include "llvm/ConstantHandling.h"

	/// Initialize a full (the default) or empty set for the specified type.
	///
	ConstantRange::ConstantRange(const Type *Ty, bool Full) {
	assert(Ty->isIntegral() &&
	"Cannot make constant range of non-integral type!");
	if (Full)
	Lower = Upper = ConstantIntegral::getMaxValue(Ty);
	else
	Lower = Upper = ConstantIntegral::getMinValue(Ty);
	}

	/// Initialize a range of values explicitly... this will assert out if
	/// Lower==Upper and Lower != Min or Max for its type (or if the two constants
	/// have different types)
	///
	ConstantRange::ConstantRange(ConstantIntegral *L,
	ConstantIntegral *U) : Lower(L), Upper(U) {
	assert(Lower->getType() == Upper->getType() &&
	"Incompatible types for ConstantRange!");

	// Make sure that if L & U are equal that they are either Min or Max...
	assert((L != U \|\| (L == ConstantIntegral::getMaxValue(L->getType()) \|\|
	L == ConstantIntegral::getMinValue(L->getType()))) &&
	"Lower == Upper, but they aren't min or max for type!");
	}

	static ConstantIntegral Next(ConstantIntegral CI) {
	if (CI->getType() == Type::BoolTy)
	return CI == ConstantBool::True ? ConstantBool::False : ConstantBool::True;

	// Otherwise use operator+ in the ConstantHandling Library.
	Constant Result = ConstantInt::get(CI->getType(), 1) + *CI;
	assert(Result && "ConstantHandling not implemented for integral plus!?");
	return cast<ConstantIntegral>(Result);
	}

	/// Initialize a set of values that all satisfy the condition with C.
	///
	ConstantRange::ConstantRange(unsigned SetCCOpcode, ConstantIntegral *C) {
	switch (SetCCOpcode) {
	default: assert(0 && "Invalid SetCC opcode to ConstantRange ctor!");
	case Instruction::SetEQ: Lower = C; Upper = Next(C); return;
	case Instruction::SetNE: Upper = C; Lower = Next(C); return;
	case Instruction::SetLT:
	Lower = ConstantIntegral::getMinValue(C->getType());
	Upper = C;
	return;
	case Instruction::SetGT:
	Lower = Next(C);
	Upper = ConstantIntegral::getMinValue(C->getType()); // Min = Next(Max)
	return;
	case Instruction::SetLE:
	Lower = ConstantIntegral::getMinValue(C->getType());
	Upper = Next(C);
	return;
	case Instruction::SetGE:
	Lower = C;
	Upper = ConstantIntegral::getMinValue(C->getType()); // Min = Next(Max)
	return;
	}
	}

	/// getType - Return the LLVM data type of this range.
	///
	const Type *ConstantRange::getType() const { return Lower->getType(); }

	/// isFullSet - Return true if this set contains all of the elements possible
	/// for this data-type
	bool ConstantRange::isFullSet() const {
	return Lower == Upper && Lower == ConstantIntegral::getMaxValue(getType());
	}

	/// isEmptySet - Return true if this set contains no members.
	///
	bool ConstantRange::isEmptySet() const {
	return Lower == Upper && Lower == ConstantIntegral::getMinValue(getType());
	}

	/// isWrappedSet - Return true if this set wraps around the top of the range,
	/// for example: [100, 8)
	///
	bool ConstantRange::isWrappedSet() const {
	return ((Constant)Lower > (Constant)Upper)->getValue();
	}


	/// getSingleElement - If this set contains a single element, return it,
	/// otherwise return null.
	ConstantIntegral *ConstantRange::getSingleElement() const {
	if (Upper == Next(Lower)) // Is it a single element range?
	return Lower;
	return 0;
	}

	/// getSetSize - Return the number of elements in this set.
	///
	uint64_t ConstantRange::getSetSize() const {
	if (isEmptySet()) return 0;
	if (getType() == Type::BoolTy) {
	if (Lower != Upper) // One of T or F in the set...
	return 1;
	return 2; // Must be full set...
	}

	// Simply subtract the bounds...
	Constant Result = (Constant)Upper - (Constant*)Lower;
	assert(Result && "Subtraction of constant integers not implemented?");
	return cast<ConstantInt>(Result)->getRawValue();
	}




	// intersect1Wrapped - This helper function is used to intersect two ranges when
	// it is known that LHS is wrapped and RHS isn't.
	//
	static ConstantRange intersect1Wrapped(const ConstantRange &LHS,
	const ConstantRange &RHS) {
	assert(LHS.isWrappedSet() && !RHS.isWrappedSet());

	// Check to see if we overlap on the Left side of RHS...
	//
	if (((Constant)RHS.getLower() < (Constant)LHS.getUpper())->getValue()) {
	// We do overlap on the left side of RHS, see if we overlap on the right of
	// RHS...
	if (((Constant)RHS.getUpper() > (Constant)LHS.getLower())->getValue()) {
	// Ok, the result overlaps on both the left and right sides. See if the
	// resultant interval will be smaller if we wrap or not...
	//
	if (LHS.getSetSize() < RHS.getSetSize())
	return LHS;
	else
	return RHS;

	} else {
	// No overlap on the right, just on the left.
	return ConstantRange(RHS.getLower(), LHS.getUpper());
	}

	} else {
	// We don't overlap on the left side of RHS, see if we overlap on the right
	// of RHS...
	if (((Constant)RHS.getUpper() > (Constant)LHS.getLower())->getValue()) {
	// Simple overlap...
	return ConstantRange(LHS.getLower(), RHS.getUpper());
	} else {
	// No overlap...
	return ConstantRange(LHS.getType(), false);
	}
	}
	}

	static ConstantIntegral Min(ConstantIntegral A, ConstantIntegral *B) {
	if (((Constant)A < (Constant)B)->getValue())
	return A;
	return B;
	}
	static ConstantIntegral Max(ConstantIntegral A, ConstantIntegral *B) {
	if (((Constant)A > (Constant)B)->getValue())
	return A;
	return B;
	}


	/// intersect - Return the range that results from the intersection of this
	/// range with another range.
	///
	ConstantRange ConstantRange::intersectWith(const ConstantRange &CR) const {
	assert(getType() == CR.getType() && "ConstantRange types don't agree!");
	// Handle common special cases
	if (isEmptySet() \|\| CR.isFullSet()) return *this;
	if (isFullSet() \|\| CR.isEmptySet()) return CR;

	if (!isWrappedSet()) {
	if (!CR.isWrappedSet()) {
	ConstantIntegral *L = Max(Lower, CR.Lower);
	ConstantIntegral *U = Min(Upper, CR.Upper);

	if ((L < U)->getValue()) // If range isn't empty...
	return ConstantRange(L, U);
	else
	return ConstantRange(getType(), false); // Otherwise, return empty set
	} else
	return intersect1Wrapped(CR, *this);
	} else { // We know "this" is wrapped...
	if (!CR.isWrappedSet())
	return intersect1Wrapped(*this, CR);
	else {
	// Both ranges are wrapped...
	ConstantIntegral *L = Max(Lower, CR.Lower);
	ConstantIntegral *U = Min(Upper, CR.Upper);
	return ConstantRange(L, U);
	}
	}
	return *this;
	}

	/// union - Return the range that results from the union of this range with
	/// another range. The resultant range is guaranteed to include the elements of
	/// both sets, but may contain more. For example, [3, 9) union [12,15) is [3,
	/// 15), which includes 9, 10, and 11, which were not included in either set
	/// before.
	///
	ConstantRange ConstantRange::unionWith(const ConstantRange &CR) const {
	assert(getType() == CR.getType() && "ConstantRange types don't agree!");

	assert(0 && "Range union not implemented yet!");

	return *this;
	}

	/// print - Print out the bounds to a stream...
	///
	void ConstantRange::print(std::ostream &OS) const {
	OS << "[" << Lower << "," << Upper << " )";
	}

	/// dump - Allow printing from a debugger easily...
	///
	void ConstantRange::dump() const {
	print(std::cerr);
	}