(a * b) / c MulDiv and dealing with overflow from intermediate multiplication
I've been tinkering with an approach that (1) multiplies a and b with the school algorithm on 21-bit limbs (2) proceeds to do long division by c, with an unusual representation of the residual a*b - c*q that uses a double to store the high-order bits and a long to store the low-order bits. I don't know if it can be made to be competitive with standard long division, but for your enjoyment,
public class MulDiv {
public static void main(String[] args) {
java.util.Random r = new java.util.Random();
for (long i = 0; true; i++) {
if (i % 1000000 == 0) {
System.err.println(i);
}
long a = r.nextLong() >> (r.nextInt(8) * 8);
long b = r.nextLong() >> (r.nextInt(8) * 8);
long c = r.nextLong() >> (r.nextInt(8) * 8);
if (c == 0) {
continue;
}
long x = mulDiv(a, b, c);
java.math.BigInteger aa = java.math.BigInteger.valueOf(a);
java.math.BigInteger bb = java.math.BigInteger.valueOf(b);
java.math.BigInteger cc = java.math.BigInteger.valueOf(c);
java.math.BigInteger xx = aa.multiply(bb).divide(cc);
if (java.math.BigInteger.valueOf(xx.longValue()).equals(xx) && x != xx.longValue()) {
System.out.printf("a=%d b=%d c=%d: %d != %s\n", a, b, c, x, xx);
}
}
}
// Returns truncate(a b/c), subject to the precondition that the result is
// defined and can be represented as a long.
private static long mulDiv(long a, long b, long c) {
// Decompose a.
long a2 = a >> 42;
long a10 = a - (a2 << 42);
long a1 = a10 >> 21;
long a0 = a10 - (a1 << 21);
assert a == (((a2 << 21) + a1) << 21) + a0;
// Decompose b.
long b2 = b >> 42;
long b10 = b - (b2 << 42);
long b1 = b10 >> 21;
long b0 = b10 - (b1 << 21);
assert b == (((b2 << 21) + b1) << 21) + b0;
// Compute a b.
long ab4 = a2 * b2;
long ab3 = a2 * b1 + a1 * b2;
long ab2 = a2 * b0 + a1 * b1 + a0 * b2;
long ab1 = a1 * b0 + a0 * b1;
long ab0 = a0 * b0;
// Compute a b/c.
DivBy d = new DivBy(c);
d.shift21Add(ab4);
d.shift21Add(ab3);
d.shift21Add(ab2);
d.shift21Add(ab1);
d.shift21Add(ab0);
return d.getQuotient();
}
}
public strictfp class DivBy {
// Initializes n <- 0.
public DivBy(long d) {
di = d;
df = (double) d;
oneOverD = 1.0 / df;
}
// Updates n <- 2^21 n + i. Assumes |i| <= 3 (2^42).
public void shift21Add(long i) {
// Update the quotient and remainder.
q <<= 21;
ri = (ri << 21) + i;
rf = rf * (double) (1 << 21) + (double) i;
reduce();
}
// Returns truncate(n/d).
public long getQuotient() {
while (rf != (double) ri) {
reduce();
}
// Round toward zero.
if (q > 0) {
if ((di > 0 && ri < 0) || (di < 0 && ri > 0)) {
return q - 1;
}
} else if (q < 0) {
if ((di > 0 && ri > 0) || (di < 0 && ri < 0)) {
return q + 1;
}
}
return q;
}
private void reduce() {
// x is approximately r/d.
long x = Math.round(rf * oneOverD);
q += x;
ri -= di * x;
rf = repairLowOrderBits(rf - df * (double) x, ri);
}
private static double repairLowOrderBits(double f, long i) {
int e = Math.getExponent(f);
if (e < 64) {
return (double) i;
}
long rawBits = Double.doubleToRawLongBits(f);
long lowOrderBits = (rawBits >> 63) ^ (rawBits << (e - 52));
return f + (double) (i - lowOrderBits);
}
private final long di;
private final double df;
private final double oneOverD;
private long q = 0;
private long ri = 0;
private double rf = 0;
}