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// Base conversion routine due to Schoenhage
// This is a recursive divide-and-conquer algorithm which divides the number
// into approximately equal-sized halves and concatenates the parts together.
// See Knuth, Vol. 2, Answers to Exercises (4.4) Question 14.
// This was the prototype for speeding up base conversions in Frink for
// platforms that have only ridiculously slow base conversion routines for
// large numbers (like any of Sun's JVMs.) The internal implementation in
// Frink detects the JVM being used, and if it's Sun's, uses this algorithm
// instead of their native algorithm for large numbers.
// JVMs like Kaffe, which use the horribly fast GMP libraries, don't need this.
// This algorithm must be close to GMP's, because it doesn't slow down their
// base conversion *too* much.
// This sample omits two important points which are needed to make it work:
// 1.) The lower half of the number needs to be zero-padded when concatenating.
//
// 2.) You don't want to recurse all the way down into single digits. The
// final implementation should choose a lower size for numbers
// (say, the size of an int or long) and use the system's built-in base
// conversion algorithms on numbers smaller than that.
baseconv[U] :=
{
b = bitLength[U] // Find length of number in binary digits
n = bitLength[b] // Find length *of length* in binary digits
// (this is like taking approx log2, but fast)
V = 10^2^(n-3) // Find a value of V that splits this in approx. half.
// such that V is a power of 10^(2^k) and k is a
// well-chosen integer that splits the number in about
// half.
//
// The method for finding k here was found to work
// empirically well and only requires knowing the bit
// lengths of a number (which is easy given that we
// store in base 2)
U0 = U mod V // Divide the number into 2 approximately equal-sized
// halves (this is lower half)
U1 = U div V // Truncating divide, leaves upper half of number
println[baseconv[U0] + baseconv[U1]] // Concatenate halves recursively
// (leading zero padding is needed in
// practice.)
}
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This is a program written in the programming language Frink.
For more information, view the Frink
Documentation or see More Sample Frink Programs.
Alan Eliasen was born 20217 days, 23 hours, 59 minutes ago.