# Looking for an efficient integer square root algorithm for ARM Thumb2

I am looking for a fast, integer only algorithm to find the square root (integer part thereof) of an unsigned integer. The code must have excellent performance on ARM Thumb 2 processors. It could be assembly language or C code.

Any hints welcome.

-

Here are a whole bunch of them. I remember looking at them when I was thinking of doing Nintendo DS programming.

-
This really is impressive code; total of 51 cycles to find the square root of a 32bit int. Unfortunately it is less efficient on a Thumb2 processor, since it uses some conditional insns which require more code. Still a good solution. –  Ber Jul 9 '09 at 8:57

Integer Square Roots by Jack W. Crenshaw could be useful as another reference.

The C Snippets Archive also has an integer square root implementation. That one goes beyond just the integer result, and calculates extra fractional (fixed-point) bits of the answer. (Update: unfortunately, the C snippets archive is now defunct. I have updated the link to point to the web archive of the page.)

I settled on the following code. It's essentially from the Wikipedia article on square-root computing methods. But it has been changed to use `stdint.h` types `uint32_t` etc. Strictly speaking, the return type could be changed to `uint16_t`.

``````/**
* \brief    Fast Square root algorithm
*
* Fractional parts of the answer are discarded. That is:
*      - SquareRoot(3) --> 1
*      - SquareRoot(4) --> 2
*      - SquareRoot(5) --> 2
*      - SquareRoot(8) --> 2
*      - SquareRoot(9) --> 3
*
* \param[in] a_nInput - unsigned integer for which to find the square root
*
* \return Integer square root of the input value.
*/
uint32_t SquareRoot(uint32_t a_nInput)
{
uint32_t op  = a_nInput;
uint32_t res = 0;
uint32_t one = 1uL << 30; // The second-to-top bit is set: use 1u << 14 for uint16_t type; use 1uL<<30 for uint32_t type

// "one" starts at the highest power of four <= than the argument.
while (one > op)
{
one >>= 2;
}

while (one != 0)
{
if (op >= res + one)
{
op = op - (res + one);
res = res +  2 * one;
}
res >>= 1;
one >>= 2;
}
return res;
}
``````

The nice thing, I discovered, is that a fairly simple modification can return the "rounded" answer. I found this useful in a certain application for greater accuracy. Note that in this case, the return type must be `uint32_t` because the rounded square root of 232 - 1 is 216.

``````/**
* \brief    Fast Square root algorithm, with rounding
*
* This does arithmetic rounding of the result. That is, if the real answer
* would have a fractional part of 0.5 or greater, the result is rounded up to
* the next integer.
*      - SquareRootRounded(2) --> 1
*      - SquareRootRounded(3) --> 2
*      - SquareRootRounded(4) --> 2
*      - SquareRootRounded(6) --> 2
*      - SquareRootRounded(7) --> 3
*      - SquareRootRounded(8) --> 3
*      - SquareRootRounded(9) --> 3
*
* \param[in] a_nInput - unsigned integer for which to find the square root
*
* \return Integer square root of the input value.
*/
uint32_t SquareRootRounded(uint32_t a_nInput)
{
uint32_t op  = a_nInput;
uint32_t res = 0;
uint32_t one = 1uL << 30; // The second-to-top bit is set: use 1u << 14 for uint16_t type; use 1uL<<30 for uint32_t type

// "one" starts at the highest power of four <= than the argument.
while (one > op)
{
one >>= 2;
}

while (one != 0)
{
if (op >= res + one)
{
op = op - (res + one);
res = res +  2 * one;
}
res >>= 1;
one >>= 2;
}

/* Do arithmetic rounding to nearest integer */
if (op > res)
{
res++;
}

return res;
}
``````
-
Out of curiosity I benchmarked a 64-bit conversion of this against the static_casting the C library sqrt function to get an integer result, I found this to be 8.2x slower. YMMV. More data at onemanmmo.com/?sqrt –  Robert Basler Mar 29 '12 at 20:18
@RobertBasler: It's good that you've measured it. This sort of thing is very hardware-specific; in your case (on a processor with floating-point hardware) it was certainly worth doing a comparison. I expect these integer square-root algorithms would be more useful for embedded systems without floating-point hardware. –  Craig McQueen Mar 29 '12 at 22:39

If exact accuracy isn't required, I have a fast approximation for you, that uses 260bytes of ram (you could halve that, but don't).

``````int ftbl[33]={0,1,1,2,2,4,5,8,11,16,22,32,45,64,90,128,181,256,362,512,724,1024,1448,2048,2896,4096,5792,8192,11585,16384,23170,32768,46340};
int ftbl2[32]={ 32768,33276,33776,34269,34755,35235,35708,36174,36635,37090,37540,37984,38423,38858,39287,39712,40132,40548,40960,41367,41771,42170,42566,42959,43347,43733,44115,44493,44869,45241,45611,45977};

int fisqrt(int val)
{
int cnt=0;
int t=val;
while (t) {cnt++;t>>=1;}
if (6>=cnt)    t=(val<<(6-cnt));
else           t=(val>>(cnt-6));

return (ftbl[cnt]*ftbl2[t&31])>>15;
}
``````

Here's the code to generate the tables:

``````ftbl[0]=0;
for (int i=0;i<32;i++) ftbl[i+1]=sqrt(pow(2.0,i));
printf("int ftbl[33]={0");
for (int i=0;i<32;i++) printf(",%d",ftbl[i+1]);
printf("};\n");

for (int i=0;i<32;i++) ftbl2[i]=sqrt(1.0+i/32.0)*32768;
printf("int ftbl2[32]={");
for (int i=0;i<32;i++) printf("%c%d",(i)?',':' ',ftbl2[i]);
printf("};\n");
``````

Over the range 1->2^20, the maximum error is 11, and over the range 1->2^30, it's about 256. You could use larger tables and minimise this. It's worth mentioning that the error will always be negative - i.e. when it's wrong, the value will be LESS than the correct value.

You might do well to follow this with a refining stage.

The idea is simple enough: (ab)^0.5 = a^0.b * b^0.5.

So, we take the input X = A*B where A=2^N and 1<=B<2 Then we have a lookuptable for sqrt(2^N), and a lookuptable for sqrt(1<=B<2). We store the lookuptable for sqrt(2^N) as integer, which might be a mistake (testing shows no ill effects), and we store the lookuptable for sqrt(1<=B<2) at 15bits of fixed-point.

We know that 1<=sqrt(2^N)<65536, so that's 16bit, and we know that we can really only multiply 16bitx15bit on an ARM, without fear of reprisal, so that's what we do.

In terms of implementation, the while(t) {cnt++;t>>=1;} is effectively a count-leading-bits instruction (CLB), so if your version of the chipset has that, you're winning! Also, the shift instruction would be easy to implement with a bidirectional shifter, if you have one? There's a Lg[N] algorithm for counting the highest set bit here.

In terms of magic numbers, for changing table sizes, THE magic number for ftbl2 is 32, though note that 6 (Lg[32]+1) is used for the shifting.

-
FWIW, though I don't really recommend this, you can quarter your overall error, with some biasing, viz: int v1=fisqrt(val); v1+=fisqrt(val-v1*v1)/16; 16 is the power of two that works best, over the range 1->2^24. –  Dave Gamble Jul 8 '09 at 22:17

One common approach is bisection.

``````hi = number
lo = 0
mid = ( hi + lo ) / 2
mid2 = mid*mid
while( lo < hi-1 and mid2 != number ) {
if( mid2 < number ) {
lo = mid
else
hi = mid
mid = ( hi + lo ) / 2
mid2 = mid*mid
``````

Something like that should work reasonably well. It makes log2(number) tests, doing log2(number) multiplies and divides. Since the divide is a divide by 2, you can replace it with a `>>`.

The terminating condition may not be spot on, so be sure to test a variety of integers to be sure that the division by 2 doesn't incorrectly oscillate between two even values; they would differ by more than 1.

-

I find that most algorithms are based on simple ideas, but are implemented in a way more complicated manner than necessary. I've taken the idea from here: http://ww1.microchip.com/downloads/en/AppNotes/91040a.pdf (by Ross M. Fosler) and made it into a very short C-function:

``````uint16_t int_sqrt32(uint32_t x)
{
uint16_t res=0;
int i;
for(i=0;i<16;i++)
{
uint16_t temp=res | add;
uint32_t g2=temp*temp;
if (x>=g2)
{
res=temp;
}
}
return res;
}
``````

This compiles to 5 cycles/bit on my blackfin. I believe your compiled code will in general be faster if you use for loops instead of while loops, and you get the added benefit of deterministic time (although that to some extent depends on how your compiler optimizes the if statement.)

-
Sorry, that should be 5 cycles/bit of the output, which is half as many bits as the input. So 2.5 cycles/bit of the input. –  Gutskalk Apr 26 '12 at 9:50
There's a small bug here. In the expression "temp*temp" you need to cast either of the operands to uint32_t to make sure the multiplication is done in 32-bit arithmetic not 16-bit. The code as-is doesn't work on AVR because of this (but it seems to on platforms where int is 32-bit, due to defaut promotion, but it may still cause integer overflow there). –  Ambroz Bizjak Jun 1 '13 at 17:00
Another thing: "uint16_t add= 0x8000;" should be changed to "uint16_t add= UINT16_C(0x8000);". –  Ambroz Bizjak Jun 1 '13 at 17:00

I have settled to something similar to the binary digit-by-digit algorithm described in this Wikipedia article.

-

It's not fast but it's small and simple:

``````int isqrt(int n)
{
int b = 0;

while(n >= 0)
{
n = n - b;
b = b + 1;
n = n - b;
}

return b - 1;
}
``````
-

It depends about the usage of the sqrt function. I often use some approx to make fast versions. For example, when I need to compute the module of vector :

``````Module = SQRT( x^2 + y^2)
``````

I use :

``````Module = MAX( x,y) + Min(x,y)/2
``````

Which can be coded in 3 or 4 instructions as:

``````If (x > y )
Module  = x + y >> 1;
Else
Module  = y + x >> 1;
``````
-

This method is similar to long division: you construct a guess for the next digit of the root, do a subtraction, and enter the digit if the difference meets certain criteria. With a the binary version, your only choice for the next digit is 0 or 1, so you always guess 1, do the subtraction, and enter a 1 unless the difference is negative.

http://www.realitypixels.com/turk/opensource/index.html#FractSqrt

-

Here is a solution in Java that combines integer log_2 and Newton's method to create a loop free algorithm. As a downside, it needs division. The commented lines are required to upconvert to a 64 bit algorithm.

``````private static final int debruijn= 0x07C4ACDD;
//private static final long debruijn= ( ~0x0218A392CD3D5DBFL)>>>6;

static
{
for(int x= 0; x<32; ++x)
{
final long v= ~( -2L<<(x));
DeBruijnArray[(v*debruijn)>>>27]= x; //>>>58
}
for(int x= 0; x<32; ++x)
SQRT[x]= (int) (Math.sqrt((1L<<DeBruijnArray[x])*Math.sqrt(2)));
}

public static int sqrt(final int num)
{
int y;
if(num==0)
return num;
{
int v= num;
v|= v>>>1; // first round up to one less than a power of 2
v|= v>>>2;
v|= v>>>4;
v|= v>>>8;
v|= v>>>16;
//v|= v>>>32;
y= SQRT[(v*debruijn)>>>27]; //>>>58
}
//y= (y+num/y)>>>1;
y= (y+num/y)>>>1;
y= (y+num/y)>>>1;
y= (y+num/y)>>>1;
return y*y>num?y-1:y;
}
``````

How this works: The first part produces a square root accurate to about three bits. The line [y= (y+num/y)>>1;] doubles the accuracy in bits. The last line eliminates the roof roots that can be generated.

-