# Algorithm Challenge: Arbitrary in-place base conversion for lossless string compression

It might help to start out with a real world example. Say I'm writing a web app that's backed by MongoDB, so my records have a long hex primary key, making my url to view a record look like `/widget/55c460d8e2d6e59da89d08d0`. That seems excessively long. Urls can use many more characters than that. While there are just under `8 x 10^28` (`16^24`) possible values in a 24 digit hex number, just limiting yourself to the characters matched by a `[a-zA-Z0-9]` regex class (a YouTube video id uses more), 62 characters, you can get past `8 x 10^28` in only 17 characters.

I want an algorithm that will convert any string that is limited to a specific alphabet of characters to any other string with another alphabet of characters, where the value of each character `c` could be thought of as `alphabet.indexOf(c)`.

Something of the form:

``````convert(value, sourceAlphabet, destinationAlphabet)
``````

### Assumptions

• all parameters are strings
• every character in `value` exists in `sourceAlphabet`
• every character in `sourceAlphabet` and `destinationAlphabet` is unique

### Simplest example

``````var hex = "0123456789abcdef";
var base10 = "0123456789";
var result = convert("12245589", base10, hex); // result is "bada55";
``````

But I also want it to work to convert War & Peace from the Russian alphabet plus some punctuation to the entire unicode charset and back again losslessly.

## Is this possible?

The only way I was ever taught to do base conversions in Comp Sci 101 was to first convert to a base ten integer by summing `digit * base^position` and then doing the reverse to convert to the target base. Such a method is insufficient for the conversion of very long strings, because the integers get too big.

It certainly feels intuitively that a base conversion could be done in place, as you step through the string (probably backwards to maintain standard significant digit order), keeping track of a remainder somehow, but I'm not smart enough to work out how.

That's where you come in, StackOverflow. Are you smart enough?

Perhaps this is a solved problem, done on paper by some 18th century mathematician, implemented in LISP on punch cards in 1970 and the first homework assignment in Cryptography 101, but my searches have borne no fruit.

I'd prefer a solution in javascript with a functional style, but any language or style will do, as long as you're not cheating with some big integer library. Bonus points for efficiency, of course.

Please refrain from criticizing the original example. The general nerd cred of solving the problem is more important than any application of the solution.

• Title says "in-place". Not necessarily possible when moving to an alphabet with fewer characters than the original, I think. Commented Aug 20, 2015 at 14:13
• Not that it's really known to be possible anyway -- arithmetic decoding would be a lot easier otherwise. Commented Aug 20, 2015 at 14:15
• Sure. I'd think that's a fine simplification. Commented Aug 20, 2015 at 16:17
• Something like this is done in crypto already in one special form. A byte can have 2^8 or 256 different values, but less than half of those values represent a character that is both printable at all, and that doesn't look like a bad car accident when printed. So Base64 defines a character set of 64 "letters" and splits the bit string into 6 bit chunks instead of 8 bits like in a byte. You could manually do similar by splitting on the 5-bit chunk and using the letters a-z and the numbers 0 - 5 as one example. Your challenge is more general than these special forms, but I think it is possible.
– WDS
Commented Aug 20, 2015 at 22:45
• Looked at from another angle that captures every case, consider that the computer's native alphabet contains 2 "letters" which we usually refer to as 0 and 1. Any alphabet you can think of, if it can be represented on a computer, is completely convertible to and from this native alphabet. Then if you have 2 such alphabets, you always are able to convert one to the other by converting to 0s and 1s in between. In such a conversion, the last letter may be limited to a subset of the alphabet to which it belongs because there is not a whole letter's worth of bits for that position, though.
– WDS
Commented Aug 20, 2015 at 22:54

Here is a solution in C that is very fast, using bit shift operations. It assumes that you know what the length of the decoded string should be. The strings are vectors of integers in the range 0..maximum for each alphabet. It is up to the user to convert to and from strings with restricted ranges of characters. As for the "in-place" in the question title, the source and destination vectors can overlap, but only if the source alphabet is not larger than the destination alphabet.

``````/*
recode version 1.0, 22 August 2015

This software is provided 'as-is', without any express or implied
warranty.  In no event will the authors be held liable for any damages
arising from the use of this software.

Permission is granted to anyone to use this software for any purpose,
including commercial applications, and to alter it and redistribute it
freely, subject to the following restrictions:

1. The origin of this software must not be misrepresented; you must not
claim that you wrote the original software. If you use this software
in a product, an acknowledgment in the product documentation would be
appreciated but is not required.
2. Altered source versions must be plainly marked as such, and must not be
misrepresented as being the original software.
3. This notice may not be removed or altered from any source distribution.

[email protected]
*/

/* Recode a vector from one alphabet to another using intermediate
variable-length bit codes. */

/* The approach is to use a Huffman code over equiprobable alphabets in two
directions.  First to encode the source alphabet to a string of bits, and
second to encode the string of bits to the destination alphabet. This will
be reasonably close to the efficiency of base-encoding with arbitrary
precision arithmetic. */

#include <stddef.h>     // size_t
#include <limits.h>     // UINT_MAX, ULLONG_MAX

#if UINT_MAX == ULLONG_MAX
#  error recode() assumes that long long has more bits than int
#endif

/* Take a list of integers source[0..slen-1], all in the range 0..smax, and
code them into dest[0..*dlen-1], where each value is in the range 0..dmax.
*dlen returns the length of the result, which will not exceed the value of
*dlen when called.  If the original *dlen is not large enough to hold the
full result, then recode() will return non-zero to indicate failure.
Otherwise recode() will return 0.  recode() will also return non-zero if
either of the smax or dmax parameters are less than one.  The non-zero
return codes are 1 if *dlen is not long enough, 2 for invalid parameters,
and 3 if any of the elements of source are greater than smax.

Using this same operation on the result with smax and dmax reversed reverses
the operation, restoring the original vector.  However there may be more
symbols returned than the original, so the number of symbols expected needs
to be known for decoding.  (An end symbol could be appended to the source
alphabet to include the length in the coding, but then encoding and decoding
would no longer be symmetric, and the coding efficiency would be reduced.
This is left as an exercise for the reader if that is desired.) */
int recode(unsigned *dest, size_t *dlen, unsigned dmax,
const unsigned *source, size_t slen, unsigned smax)
{
// compute sbits and scut, with which we will recode the source with
// sbits-1 bits for symbols < scut, otherwise with sbits bits (adding scut)
if (smax < 1)
return 2;
unsigned sbits = 0;
unsigned scut = 1;          // 2**sbits
while (scut && scut <= smax) {
scut <<= 1;
sbits++;
}
scut -= smax + 1;

// same thing for dbits and dcut
if (dmax < 1)
return 2;
unsigned dbits = 0;
unsigned dcut = 1;          // 2**dbits
while (dcut && dcut <= dmax) {
dcut <<= 1;
dbits++;
}
dcut -= dmax + 1;

// recode a base smax+1 vector to a base dmax+1 vector using an
// intermediate bit vector (a sliding window of that bit vector is kept in
// a bit buffer)
unsigned long long buf = 0;     // bit buffer
unsigned have = 0;              // number of bits in bit buffer
size_t i = 0, n = 0;            // source and dest indices
unsigned sym;                   // symbol being encoded
for (;;) {
// encode enough of source into bits to encode that to dest
while (have < dbits && i < slen) {
sym = source[i++];
if (sym > smax) {
*dlen = n;
return 3;
}
if (sym < scut) {
buf = (buf << (sbits - 1)) + sym;
have += sbits - 1;
}
else {
buf = (buf << sbits) + sym + scut;
have += sbits;
}
}

// if not enough bits to assure one symbol, then break out to a special
// case for coding the final symbol
if (have < dbits)
break;

// encode one symbol to dest
if (n == *dlen)
return 1;
sym = buf >> (have - dbits + 1);
if (sym < dcut) {
dest[n++] = sym;
have -= dbits - 1;
}
else {
sym = buf >> (have - dbits);
dest[n++] = sym - dcut;
have -= dbits;
}
buf &= ((unsigned long long)1 << have) - 1;
}

// if any bits are left in the bit buffer, encode one last symbol to dest
if (have) {
if (n == *dlen)
return 1;
sym = buf;
sym <<= dbits - 1 - have;
if (sym >= dcut)
sym = (sym << 1) - dcut;
dest[n++] = sym;
}

// return recoded vector
*dlen = n;
return 0;
}

/* Test recode(). */

#include <stdio.h>
#include <stdlib.h>
#include <string.h>
#include <math.h>
#include <assert.h>

// Return a random vector of len unsigned values in the range 0..max.
static void ranvec(unsigned *vec, size_t len, unsigned max) {
unsigned bits = 0;
unsigned long long mask = 1;
bits++;
}
unsigned long long ran = 0;
unsigned have = 0;
size_t n = 0;
while (n < len) {
while (have < bits) {
ran = (ran << 31) + random();
have += 31;
}
if ((ran & mask) <= max)
ran >>= bits;
have -= bits;
}
}

// Get a valid number from str and assign it to var
#define NUM(var, str) \
do { \
char *end; \
unsigned long val = strtoul(str, &end, 0); \
var = val; \
if (*end || var != val) { \
fprintf(stderr, \
"invalid or out of range numeric argument: %s\n", str); \
return 1; \
} \
} while (0)

/* "bet n m len count" generates count test vectors of length len, where each
entry is in the range 0..n.  Each vector is recoded to another vector using
only symbols in the range 0..m.  That vector is recoded back to a vector
using only symbols in 0..n, and that result is compared with the original
random vector.  Report on the average ratio of input and output symbols, as
compared to the optimal ratio for arbitrary precision base encoding. */
int main(int argc, char **argv)
{
// get sizes of alphabets and length of test vector, compute maximum sizes
// of recoded vectors
unsigned smax, dmax, runs;
size_t slen, dsize, bsize;
if (argc != 5) { fputs("need four arguments\n", stderr); return 1; }
NUM(smax, argv[1]);
NUM(dmax, argv[2]);
NUM(slen, argv[3]);
NUM(runs, argv[4]);
dsize = ceil(slen * ceil(log2(smax + 1.)) / floor(log2(dmax + 1.)));
bsize = ceil(dsize * ceil(log2(dmax + 1.)) / floor(log2(smax + 1.)));

// generate random test vectors, encode, decode, and compare
srandomdev();
unsigned source[slen], dest[dsize], back[bsize];
unsigned mis = 0, i;
unsigned long long dtot = 0;
int ret;
for (i = 0; i < runs; i++) {
ranvec(source, slen, smax);
size_t dlen = dsize;
ret = recode(dest, &dlen, dmax, source, slen, smax);
if (ret) {
fprintf(stderr, "encode error %d\n", ret);
break;
}
dtot += dlen;
size_t blen = bsize;
ret = recode(back, &blen, smax, dest, dlen, dmax);
if (ret) {
fprintf(stderr, "decode error %d\n", ret);
break;
}
if (blen < slen || memcmp(source, back, slen))  // blen > slen is ok
mis++;
}
if (mis)
fprintf(stderr, "%u/%u mismatches!\n", mis, i);
if (ret == 0)
printf("mean dest/source symbols = %.4f (optimal = %.4f)\n",
dtot / (i * (double)slen), log(smax + 1.) / log(dmax + 1.));
return 0;
}
``````
• Could you please describe an example in words of how your algorithm works for something really simple, like converting a three-digit string in base 3 to base 4? Commented Aug 23, 2015 at 3:55
• In base 3 the symbols are coded to the bit strings 0, 10, and 11. Then for example, the vector 0, 1, 2, 1 becomes 0101110. Base 4 simply takes off two bits at a time, encoding to 1, 1, 3, 0. The last one is a special case since there is only one bit, so it gets shifted up to make it two bits. For this short case, you still ended up with four symbols. For long vectors going from 3 to 4 the output symbols are 83.3% of the number of input symbols. If this were done with infinite precision arithmetic, the ratio would be 79.3%. Commented Aug 23, 2015 at 4:37

As has been pointed out in other StackOverflow answers, try not to think of summing `digit * base^position` as converting it to base ten; rather, think of it as directing the computer to generate a representation of the quantity represented by the number in its own terms (for most computers probably closer to our concept of base 2). Once the computer has its own representation of the quantity, we can direct it to output the number in any way we like.

By rejecting "big integer" implementations and asking for letter-by-letter conversion you are at the same time arguing that the numerical/alphabetical representation of quantity is not actually what it is, namely that each position represents a quantity of `digit * base^position`. If the nine-millionth character of War and Peace does represent what you are asking to convert it from, then the computer at some point will need to generate a representation for `Д * 33^9000000`.

I don't think any solution can work generally because if ne != m for some integer e and some MAX_INT because there's no way to calculate the value of the target base in a certain place p if np > MAX_INT.

You can get away with this for the case where ne == m for some e because the problem is recursively doable (the first e digits of n can be summed and converted into the first digit of M, and then chopped off and repeated.

If you don't have this useful property, then eventually you're going to have to try to take some part of the original base and try to perform modulus in np and np is going to be greater than MAX_INT, which means it's impossible.