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docs/distributed/DESIGN.md
1024 drives. In this scenario 16 becomes the erasure set size. This is decided based on the greatest common divisor (GCD) of acceptable erasure set sizes ranging from *4 to 16*. - *If total drives has many common divisors the algorithm chooses the minimum amounts of erasure sets possible for a erasure set size of any N*. In the example with 1024 drives - 4, 8, 16 are GCD factors. With 16 drives we get a total of 64 possible sets, with 8 drives we get a total of 128 possible sets, with 4...
Registered: Sun Nov 03 19:28:11 UTC 2024 - Last Modified: Tue Aug 15 23:04:20 UTC 2023 - 8K bytes - Viewed (0) -
android/guava-tests/test/com/google/common/math/IntMathTest.java
for (int b : POSITIVE_INTEGER_CANDIDATES) { assertEquals(valueOf(a).gcd(valueOf(b)), valueOf(IntMath.gcd(a, b))); } } } public void testGCDZero() { for (int a : POSITIVE_INTEGER_CANDIDATES) { assertEquals(a, IntMath.gcd(a, 0)); assertEquals(a, IntMath.gcd(0, a)); } assertEquals(0, IntMath.gcd(0, 0)); } public void testGCDNegativePositiveThrows() {
Registered: Fri Nov 01 12:43:10 UTC 2024 - Last Modified: Sat Oct 19 00:26:48 UTC 2024 - 23.1K bytes - Viewed (0) -
guava-tests/test/com/google/common/math/IntMathTest.java
for (int b : POSITIVE_INTEGER_CANDIDATES) { assertEquals(valueOf(a).gcd(valueOf(b)), valueOf(IntMath.gcd(a, b))); } } } public void testGCDZero() { for (int a : POSITIVE_INTEGER_CANDIDATES) { assertEquals(a, IntMath.gcd(a, 0)); assertEquals(a, IntMath.gcd(0, a)); } assertEquals(0, IntMath.gcd(0, 0)); } public void testGCDNegativePositiveThrows() {
Registered: Fri Nov 01 12:43:10 UTC 2024 - Last Modified: Sat Oct 19 00:26:48 UTC 2024 - 23.1K bytes - Viewed (0) -
guava-tests/test/com/google/common/math/LongMathTest.java
assertEquals(valueOf(a).gcd(valueOf(b)), valueOf(LongMath.gcd(a, b))); } } } @GwtIncompatible // TODO public void testGCDZero() { for (long a : POSITIVE_LONG_CANDIDATES) { assertEquals(a, LongMath.gcd(a, 0)); assertEquals(a, LongMath.gcd(0, a)); } assertEquals(0, LongMath.gcd(0, 0)); } @GwtIncompatible // TODO
Registered: Fri Nov 01 12:43:10 UTC 2024 - Last Modified: Fri Oct 18 15:00:32 UTC 2024 - 30.6K bytes - Viewed (0) -
android/guava/src/com/google/common/math/LongMath.java
int bTwos = Long.numberOfTrailingZeros(b); b >>= bTwos; // divide out all 2s while (a != b) { // both a, b are odd // The key to the binary GCD algorithm is as follows: // Both a and b are odd. Assume a > b; then gcd(a - b, b) = gcd(a, b). // But in gcd(a - b, b), a - b is even and b is odd, so we can divide out powers of two. // We bend over backwards to avoid branching, adapting a technique from
Registered: Fri Nov 01 12:43:10 UTC 2024 - Last Modified: Wed Oct 09 16:39:37 UTC 2024 - 45.2K bytes - Viewed (0) -
android/guava-tests/benchmark/com/google/common/math/ApacheBenchmark.java
return DoubleMath.factorial(n); } @Override public int gcdInt(int a, int b) { return IntMath.gcd(a, b); } @Override public long gcdLong(long a, long b) { return LongMath.gcd(a, b); } @Override public long binomialCoefficient(int n, int k) { return LongMath.binomial(n, k); } @Override
Registered: Fri Nov 01 12:43:10 UTC 2024 - Last Modified: Mon Dec 04 17:37:03 UTC 2017 - 6.9K bytes - Viewed (0) -
guava-tests/benchmark/com/google/common/math/IntMathBenchmark.java
Registered: Fri Nov 01 12:43:10 UTC 2024 - Last Modified: Mon Dec 04 17:37:03 UTC 2017 - 3.2K bytes - Viewed (0) -
android/guava-tests/benchmark/com/google/common/math/LongMathBenchmark.java
int mod(int reps) { int tmp = 0; for (int i = 0; i < reps; i++) { int j = i & ARRAY_MASK; tmp += LongMath.mod(longs[j], positive[j]); } return tmp; } @Benchmark int gCD(int reps) { int tmp = 0; for (int i = 0; i < reps; i++) { int j = i & ARRAY_MASK; tmp += LongMath.mod(nonnegative[j], positive[j]); } return tmp; } @Benchmark
Registered: Fri Nov 01 12:43:10 UTC 2024 - Last Modified: Mon Dec 04 17:37:03 UTC 2017 - 3.5K bytes - Viewed (0) -
guava/src/com/google/common/math/LongMath.java
int bTwos = Long.numberOfTrailingZeros(b); b >>= bTwos; // divide out all 2s while (a != b) { // both a, b are odd // The key to the binary GCD algorithm is as follows: // Both a and b are odd. Assume a > b; then gcd(a - b, b) = gcd(a, b). // But in gcd(a - b, b), a - b is even and b is odd, so we can divide out powers of two. // We bend over backwards to avoid branching, adapting a technique from
Registered: Fri Nov 01 12:43:10 UTC 2024 - Last Modified: Wed Oct 09 16:39:37 UTC 2024 - 45.2K bytes - Viewed (0) -
guava-tests/benchmark/com/google/common/math/LongMathBenchmark.java
int mod(int reps) { int tmp = 0; for (int i = 0; i < reps; i++) { int j = i & ARRAY_MASK; tmp += LongMath.mod(longs[j], positive[j]); } return tmp; } @Benchmark int gCD(int reps) { int tmp = 0; for (int i = 0; i < reps; i++) { int j = i & ARRAY_MASK; tmp += LongMath.mod(nonnegative[j], positive[j]); } return tmp; } @Benchmark
Registered: Fri Nov 01 12:43:10 UTC 2024 - Last Modified: Mon Dec 04 17:37:03 UTC 2017 - 3.5K bytes - Viewed (0)