# How to choose a (valid) random adjacent point in an array of integers in C?

Assume that we have an array of integers (3x3) depicted as follows:

``````+-+-+-+
| |1| |
+-+-+-+
|0|x|1|
+-+-+-+
| |0| |
+-+-+-+
``````

(0,1) above is set to 1 and (1,0) is 0 etc.

Now assume that I find myself at (1,1) (at x), what would be the easiest method for me to come up with all the directions I can take (say all that have the value 0) and then among those choose one?

What I'm having trouble with is actually the step between choosing all valid directions and then choosing among those. I can do the two steps seperately fairly easily but I don't have a solution that feels elegant which combines the two.

E.g. I can multiply the value of each cell by a value representing 1,2,4 and 8 and or them all together. this would give me what directions I can take, but how to choose between them? Also I can easily randomize a number between 1 and 4 to choose a direction but if that direction is "taken" then I have to randomize again but excluding the direction that failed.

Any ideas?

-

The fastest solution is likely the last one you posted -- choose directions randomly, repeating until you get a valid one. That will take at most four tries (the worst case is when there is only one valid neighbor). Something more elegant is to iterate through all possible directions, updating a variable randomly at each valid neighbor, such as this pseudocode:

``````c = 1
r = invalid
for i in neighbors:
if (valid[i]):
if (rand() <= 1. / c): r = i
++c
``````

and then `r` is the answer (`c` is the number of valid neighbors found so far).

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Thank you for a quick answer :) –  Mazen Harake Jan 21 '11 at 13:29
technically the random direction method could take an unbounded number of tries with only one valid direction.... you could be very unlucky! –  mikera Jan 21 '11 at 13:31
Yes, I agree it can take an unbounded number of tries (it can as long as there are any invalid directions), but the average number is four and it is unlikely that the number of tries would be extremely high. –  Jeremiah Willcock Jan 21 '11 at 13:33
@mikera - the unbounded number of tries is not a practical concern. If you have only 1 valid choice out of 4, that means you have a 1/4 chance of hitting it randomly. The chance of missing it after N iterations is (1 - 1/4)^N = (3/4)^N, so the chances of missing it after 48 iterations is slightly higher than one in a million. –  EmeryBerger Jan 21 '11 at 14:30

Here's a very neat trick in pseudocode

1. Initialise your "current result" to nil
2. Initialise a "number found" to 0
3. Loop through all the possible directions. If it is valid then:
• increment "number found"
• set "current result" to the direction with probability 1/"number found"

At the end of this, you will have a valid direction (or nil if not found). If there are multiple valid directions, they will all be chosen with equal probability.

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Thank you. basically you described what Jeremiah implemented (If I understood you correctly). –  Mazen Harake Jan 21 '11 at 13:31

Assumed:

Each location has a set number of valid target locations (some location may have fewer valid targets, a chess-knight has fewer valid targets when placed in a corner than when in the middle of the board.)

You want to pick a random target from all available, valid moves.

Algorithm:

Create a bit-array with one one bit representing each valid target. (In the original example you would create a four bit array.)

For each valid target determine if the location is empty; set the corresponding bit in the bit-array to 1 if empty.

If bit-array > 0 then number_of_targets = SUM(bit-array), else return(No Valid Moves).

Pick random number between 1 and number_of_targets.

return(the location associated with the nth set bit in the bit-array)

Example using the the original question:

X has four valid moves. We create a 4-bit array and fill it in with '1' for each empty location; starting with the cell directly above and moving in a clockwise direction we end up with :0:0:1:1:

The sum of bits tells us we have two places we can move. Our random selection will choose either '1' or '2'. We move through the bit-array until we find the nth set bit and move to that location.

This algorithm will work for any system with any number of valid targets (not limited to 2-D). You can replace the Random number selector with a function that recursively returns the best move (MIN-MAX algorithm.)

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Ah! this was actually the missing step in my algorithm! Thank you! I will however go with the answer I have accepted as I think it was short and concise. But thank you for writing this! –  Mazen Harake Jan 21 '11 at 21:50

A slighly contrived way might be this (pseudo-code):

1. Build the bit-mask as you describe, based on which neighbors are open.
2. Use that bit-mask as the index into an array of:

``` struct RandomData { size_t num_directions; struct { signed int dx, dy; } deltas[4]; } random_data[16];```

where num_directions is the number of open neighbors, and `deltas[]` tells you how to get to each neighbor.

This has a lot of fiddly data, but it does away with the looping and branching.

UPDATE: Okay, for some reason I had problems letting this idea go. I blame a certain amount of indoctrination about "data-driven programming" at work, since this very simple problem made me "get" the thought of data-driven-ness a bit better. Which is always nice.

Anyway, here's a complete, tested and working implementation of the random-stepping function using the above ideas:

``````/* Directions are ordered from north and going clockwise, and assigned to bits:
*
*  3       2       1      0
* WEST | SOUTH | EAST | NORTH
*  8       4       2      1
*/
static void random_walk(unsigned int *px, unsigned int *py, unsigned max_x, unsigned int max_y)
{
const unsigned int  x = *px, y = *py;
const unsigned int  dirs = ((x > 0) << 3) | ((y < max_y) << 2) |
((x < max_x) << 1) | (y > 0);
static const struct
{
size_t  num_dirs;
struct { int dx, dy; } deltas[4];
} step_info[] = {
#define STEP_NORTH  { 0, -1 }
#define STEP_EAST   { 1, 0 }
#define STEP_SOUTH  { 0, 1 }
#define STEP_WEST   { -1, 0 }
{ 0 },
{ 1, { STEP_NORTH } },
{ 1, { STEP_EAST } },
{ 2, { STEP_NORTH, STEP_EAST } },
{ 1, { STEP_SOUTH } },
{ 2, { STEP_NORTH, STEP_SOUTH } },
{ 2, { STEP_EAST, STEP_SOUTH } },
{ 3, { STEP_NORTH, STEP_EAST, STEP_SOUTH } },
{ 1, { STEP_WEST } },
{ 2, { STEP_NORTH, STEP_WEST } },
{ 2, { STEP_EAST, STEP_WEST } },
{ 3, { STEP_NORTH, STEP_EAST, STEP_WEST } },
{ 2, { STEP_SOUTH, STEP_WEST } },
{ 3, { STEP_NORTH, STEP_SOUTH, STEP_WEST } },
{ 3, { STEP_EAST, STEP_SOUTH, STEP_WEST } },
{ 4, { STEP_NORTH, STEP_EAST, STEP_SOUTH, STEP_WEST } }
};
const unsigned int  step = rand() % step_info[dirs].num_dirs;

*px = x + step_info[dirs].deltas[step].dx;
*py = y + step_info[dirs].deltas[step].dy;
}

int main(void)
{
unsigned int    w = 16, h = 16, x = w / 2, y = h / 2, i;
struct timeval  t1, t2;
double      seconds;

srand(time(NULL));
gettimeofday(&t1, NULL);
for(i = 0; i < 100000000; i++)
{
random_walk(&x, &y, w - 1, h - 1);
}
gettimeofday(&t2, NULL);
seconds = (t2.tv_sec - t1.tv_sec) + 1e-6 * (t2.tv_usec - t1.tv_usec);
printf("Took %u steps, final position is (%u,%u) after %.2g seconds => %.1f Msteps/second\n", i, x, y, seconds, (i / 1e6) / seconds);

return EXIT_SUCCESS;
}
``````

Some explanations might be in order, the above is pretty opaque until you "get" it, I guess:

• The interface to the function itself should be clear. Note that width and height of the grid are represented as "`max_x`" and "`max_y`", to save on some constant-subtractions when checking if the current position is on the border or not.
• The variable `dirs` is set to a bit-mask of the "open" directions to walk in. For an empty grid, this is always 0x0f unless you're on a border. This could be made to handle walls by testing the map, of course.
• The `step_info` array collects information about which steps are available to take from each of the 16 possible combinations of open directions. When reading the initializations (one per line) of each `struct`, think of that struct's index in binary, and convert that to bits in `dirs`.
• The `STEP_NORTH` macro (and friends) cut down on the typing, and make it way clearer what's going on.
• I like how the "meat" of `random_walk()` is just four almost-clear expressions, it's refreshing to not see a single `if` in there.

When compiled with gcc (Ubuntu/Linaro 4.4.4-14ubuntu5) 4.4.5 on my 2.4 GHz x86_64 system, using optimization level -O3, the performance seems to be just short of 36 million steps per second. Reading the assembly the core logic is branch-free. Of course there's a call to `rand()`, I didn't feel like going all the way and implementing a local random number generator to have inlined.

NOTE: This doesn't solve the exact question asked, but I felt the technique was worth expanding on.

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Yeah it looks fiddly. Not sure I want to get into that :) Nice idea though thank you for taking the time :) –  Mazen Harake Jan 21 '11 at 21:53