First a little background:
- I'm a first time poster, a student in university (not in programming).
- This is not a homework question, I'm only doing this for fun.
- My programming experience consists of one semester (3 months) of C++, and some QBasic in high school.
- Yes I have looked at the GMP and Bignum libraries; it's very difficult to learn stuff from raw codes, especially without understanding of the programmers' intent. Besides I want to learn how to do it for myself.

I'm coding a multiplication function for arbitrarily large integers. I'm using character arrays to represent these numbers, with a + or - at the end to serve as sentinel (eg. "12345+", "31415-").

I'm currently implementing the Karatsuba algorithm. The problem is that with the recursion and dynamic memory assignments, the function is 5 times slower than the naive method.
I could use some hints on how to reduce the running time.

char* dam(char* one, char* two){            // Karatsuba method

    char* zero = intochar(0, 0);
    int size_a = char_size(one) - 1;
    int size_b = char_size(two) - 1;

    if(compare(one, zero) == 0 || compare(two, zero) == 0)
        return zero;                        // if either array is zero, product is zero
    delete[] zero;

    if(size_a < 4 && size_b < 4)            // if both numbers are 3 digits or less, just return their product
        return multiplication(one, two);
                                            // is the product negative?
    bool negative = one[size_a] == two[size_b]? false : true;
    int digits = size_a > size_b ? size_a : size_b;
    digits += digits & 1;                   // add one if digits is odd
    int size = digits / 2 + 1;              // half the digits plus sentinel

    char* a, *b;                            // a and b represent one and two but with even digits
    if(size_a != digits)
        a = pad_char(one, digits - size_a); // pad the numbers with leading zeros so they have even digits
        a = copy_char(one);
    if(size_b != digits)
        b = pad_char(two, digits - size_b);
        b = copy_char(two);

    char* a_left = new char[size];          // left half of number a
    char* a_rite = new char[size];          // right half of number a
    char* b_left = new char[size];
    char* b_rite = new char[size];
    memcpy(a_left, a, size - 1);
    a_left[size - 1] = a[digits];
    memcpy(a_rite, a + size - 1, size);
    memcpy(b_left, b, size - 1);
    b_left[size - 1] = b[digits];
    memcpy(b_rite, b + size - 1, size);
    delete[] a;
    delete[] b;

    char* p0 = dam(a_left, b_left);         // Karatsuba product = p1*10^n + (p0+p2-p1)*10^(n/2) + p2
    char* p2 = dam(a_rite, b_rite);
    deduct(a_left, a_rite);
    deduct(b_left, b_rite);
    char* p1 = dam(a_left, b_left);
    char* p3 = intochar(0, digits - 1);     // p3 = p0 + p2 - p1
    append(p3, p0);                         // append does naive addition
    append(p3, p2);
    deduct(p3, p1);
    delete[] a_left;
    delete[] a_rite;
    delete[] b_left;
    delete[] b_rite;

    int sum_size = 2 * digits;              // product of two numbers can have a maximum of n1 + n2 digits
    char* sum = new char[sum_size + 1];
    memset(sum, 0, sum_size);
        sum[sum_size] = '-';
        sum[sum_size] = '+';

    char* left = extend_char(p0, digits, false);        // extend returns a new array with trailing zeros
    char* mid = extend_char(p3, size - 1, false);
    append(sum, left);
    append(sum, mid);
    append(sum, p2);
    delete[] p0;
    delete[] p1;
    delete[] p2;
    delete[] p3;
    delete[] left;
    delete[] mid;

    return sum;}

Karatsuba is a nice algorithm, and not too hard to program. If you're only doing it for fun, it's even not a bad idea to work in base 10 -- it slows you down terribly, but it slows down the naive implementation too, so you still have a basis for comparing the two methods.

However, you absolutely must abandon the idea of allocating and freeing your workspace dynamically at every node of the recursion tree. You just can't afford it. You must allocate the required workspace at the start of the computation, and handle your pointers intelligently so that every level of the tree gets the workspace it needs without having to allocate it.

Also, it makes no sense to test for negative products at every level. Just do that at the top level, and work exclusively with positive numbers during the calculation.

Not that it's relevant to your question, but whenever I see something like

bool negative = one[size_a] == two[size_b]? false : true;

my heart shrinks a little. Think of all those wasted pixels! I respectfully suggest:

bool negative = one[size_a] != two[size_b] ;
  • Thanks for the suggestion. Though I have no idea how to actually implement that... The intro to prog. class I took ended just short of dynamic memory. I pretty much have to learn the whole concept by myself, hence the crazy allocations everywhere (hey at least I remembered to free them LOL). I will change the negative flag accordingly. – sth128 Nov 2 '11 at 20:04
  • @sth128: Self taught dynamic memory? Gutsy! That deserves a good job on doing it right! You'll want to find a tutorial on structs/classes, and then one on using std::string/std::vector – Mooing Duck Nov 3 '11 at 20:45
  • @Mooing: You don't need all that. You just need to increment/decrement a global pointer by the right amount when you enter/leave a recusrive call. No structs/classes needed, no std::whatever. – TonyK Nov 3 '11 at 20:52
  • No, but they'd be incredibly handy for what he's doing. Technically he doesn't even need the heap. – Mooing Duck Nov 3 '11 at 20:55

Your use of spelled-out decimal values is imposing a great deal of overhead. Karatsuba multiplication is only going to beat long multiplication for numbers that are huge relative to the machine register size, and you really want each primitive multiply to be doing as much work as possible.

I recommend you redesign your data structure such that this:

if(size_a < 4 && size_b < 4)
    return multiplication(one, two);

can become something like this:

if(size_a == 1 && size_b == 1)
    return box(int64_t(one[0]) * two[0]);

where the type of one[0] is int32_t, perhaps. This is what GMP is doing with its mp_limb_t arrays.

  • I hoped that that's what the multiplication(one, two); was doing under the covers. If not, his "nieve" method is probably using the "multiplication" function as well (for the entire thing), which means this doesn't explain the slowness. – Mooing Duck Nov 2 '11 at 19:45
  • I'm afraid I don't know what int32_t is... How it is different from regular (32bit) signed int? Also, in your case would one[0] be more than 9? Currently I'm representing a single digit with each byte of the char array. – sth128 Nov 2 '11 at 19:48
  • @Mooing Duck: My naive function "Multiplication" does single digit shift and add. Basically, find a[i] * b[j] then add to the sum. Naive method means "what would a 5 year old do"... – sth128 Nov 2 '11 at 19:51
  • 1
    @sth128: int32_t is the same as a signed int on your computer. However, signed int is not guaranteed to be 32 bits on all computers. int32_t is. – Mooing Duck Nov 2 '11 at 20:01
  • 1
    @sth128: Zach is recommending using an array of int/int64_t instead of characters representing decimal digits. You're doing everything in base 10. He's recommending using base 4294967296 or higher. He's right that it's MUCH faster. Though for newer coders I would recommend base 1000000000 instead. – Mooing Duck Nov 2 '11 at 20:04

I would imagine the slowdown might actually be the allocations. Replace these with local fixed size buffers and I'd imagine you'll see a decent speed increase. Or using a custom pool allocator. But I think that if you're crafty, much of this can be done in place.

Also, if you pass the length of the strings to the functions, you save yourself an iteration to find the length each time.

(also it's spelled "right").

  • I cannot use fixed size (do you mean static?) arrays. The K method dictates splitting of these numbers into two halves with each iteration. Also using a static array would arbitrarily limit the size of numbers I can multiply. As for "right", I chose "rite" because it has the same # of letters as "left" so the code looks nicer... – sth128 Nov 2 '11 at 19:19
  • You could try using variable-size stack arrays, e.g. "char a_left[size];" I don't remember if this is technically valid C++98 but it works with a lot of compilers. – zwol Nov 2 '11 at 19:25
  • C++ cannot declare a static array with a variable integer unless it's constant. But C++ cannot change the value of a constant variable. In any case MS visual C++ compiler (what I'm using) won't do it... – sth128 Nov 2 '11 at 19:38
  • @sth128: MSVC will do it with the _alloca function. – Mooing Duck Nov 2 '11 at 19:43
  • @sth128: I just programmed a karatsuba algorithm for my bignum object, and did some quick math, and by estimate, it's only faster than the nieve when I have more than 2000ish decimal digits. The problem with the big-O notation is it leaves out the constants, making algorithmic comparisons tricky. – Mooing Duck Nov 4 '11 at 23:00

What do you mean writing "the function is 5 times slower"? Karatsuba is asymptotically faster, not just faster. This means that even a toy implementation of Karatsuba will eventually get faster than the naive multiplication. Did you test speed with 10000-digits numbers?

I know GMP code is not easy to read... but look at this table extracted from the code. It gives (for different CPUs) the threshold value for Toom-2,2 (Karatsuba). In short terms, the implementation of Karatsuba in GMP is NOT faster than naive implementation for operands smaller than 320 bits (10 x 32-bit registers).

Some questions about your code:

  • do you really need char *a, *b ? You delete them before starting computation! ;-)
  • are you sure you need to copy the sign to {a,b}_{left,rite}? Did you check if the result is correct with negative operands?
  • consider very unbalanced operands... what should you do if size_a * 2 < size_b (or viceversa)?

Next step will be Toom, right?

  • I tested speeds with a factorial function. The slow down is due to the memory allocation, not so much the number of digits. *a & *b' aren't really necessary, I am just too lazy to figure out the padding. The size_a * 2 < size_b situation is being handled by the if(compare(a, zero) == 0 statement. Right now I'm just looking for a way to allocate all the memory I need at the beginning instead of doing it on the fly. I don't think I'll be doing Toom implementation any time soon until I've figured out a) how to optimize memory, and b) how to actually use FFT. – sth128 Nov 3 '11 at 17:38

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