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blockfreq: Remove BlockMass*BlockMass
Since `BlockMass` is an implementation detail and there are no current users of this, delete `BlockMass::operator*=(BlockMass)`. I might need this when I try to strip out `UnsignedFloat`, but I can pull it back in at that point. git-svn-id: https://llvm.org/svn/llvm-project/llvm/trunk@207546 91177308-0d34-0410-b5e6-96231b3b80d8
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@ -758,60 +758,6 @@ public:
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return *this;
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}
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/// \brief Scale by another mass.
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///
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/// The current implementation is a little imprecise, but it's relatively
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/// fast, never overflows, and maintains the property that 1.0*1.0==1.0
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/// (where isFull represents the number 1.0). It's an approximation of
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/// 128-bit multiply that gets right-shifted by 64-bits.
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///
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/// For a given digit size, multiplying two-digit numbers looks like:
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///
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/// U1 . L1
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/// * U2 . L2
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/// ============
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/// 0 . . L1*L2
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/// + 0 . U1*L2 . 0 // (shift left once by a digit-size)
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/// + 0 . U2*L1 . 0 // (shift left once by a digit-size)
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/// + U1*L2 . 0 . 0 // (shift left twice by a digit-size)
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///
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/// BlockMass has 64-bit numbers. Split each into two 32-bit digits, stored
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/// 64-bit. Add 1 to the lower digits, to model isFull as 1.0; this won't
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/// overflow, since we have 64-bit storage for each digit.
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///
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/// To do this accurately, (a) multiply into two 64-bit digits, incrementing
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/// the upper digit on overflows of the lower digit (carry), (b) subtract 1
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/// from the lower digit, decrementing the upper digit on underflow (carry),
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/// and (c) truncate the lower digit. For the 1.0*1.0 case, the upper digit
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/// will be 0 at the end of step (a), and then will underflow back to isFull
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/// (1.0) in step (b).
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///
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/// Instead, the implementation does something a little faster with a small
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/// loss of accuracy: ignore the lower 64-bit digit entirely. The loss of
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/// accuracy is small, since the sum of the unmodelled carries is 0 or 1
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/// (i.e., step (a) will overflow at most once, and step (b) will underflow
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/// only if step (a) overflows).
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///
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/// This is the formula we're calculating:
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///
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/// U1.L1 * U2.L2 == U1 * U2 + (U1 * (L2+1))>>32 + (U2 * (L1+1))>>32
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///
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/// As a demonstration of 1.0*1.0, consider two 4-bit numbers that are both
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/// full (1111).
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///
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/// U1.L1 * U2.L2 == U1 * U2 + (U1 * (L2+1))>>2 + (U2 * (L1+1))>>2
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/// 11.11 * 11.11 == 11 * 11 + (11 * (11+1))/4 + (11 * (11+1))/4
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/// == 1001 + (11 * 100)/4 + (11 * 100)/4
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/// == 1001 + 1100/4 + 1100/4
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/// == 1001 + 0011 + 0011
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/// == 1111
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BlockMass &operator*=(const BlockMass &X) {
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uint64_t U1 = Mass >> 32, L1 = Mass & UINT32_MAX, U2 = X.Mass >> 32,
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L2 = X.Mass & UINT32_MAX;
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Mass = U1 * U2 + (U1 * (L2 + 1) >> 32) + ((L1 + 1) * U2 >> 32);
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return *this;
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}
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/// \brief Multiply by a branch probability.
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///
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/// Multiply by P. Guarantees full precision.
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@ -861,9 +807,6 @@ inline BlockMass operator+(const BlockMass &L, const BlockMass &R) {
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inline BlockMass operator-(const BlockMass &L, const BlockMass &R) {
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return BlockMass(L) -= R;
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}
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inline BlockMass operator*(const BlockMass &L, const BlockMass &R) {
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return BlockMass(L) *= R;
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}
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inline BlockMass operator*(const BlockMass &L, const BranchProbability &R) {
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return BlockMass(L) *= R;
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}
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