I'm trying to solve distance transform problem (using Manhattan's distance). Basically, giving matrix with 0's and 1's, program must assign distances of every position to nearest 1. For example, for this one

```
0000
0100
0000
0000
```

distance transform matrix is

```
2123
1012
2123
3234
```

Possible solutions from my head are:

**Slowest ones (slowest because I have tried to implement them - they were lagging on very big matrices):**

Brute-force - for every 1 that program reads, change distances accordingly from beginning till end.

Breadth-first search from 0's - for every 0, program looks for nearest 1 inside out.

Same as 2 but starting from 1's mark every distance inside out.

**Much faster (read from other people's code)**Breadth-first search from 1's

`1. Assign all values in the distance matrix to -1 or very big value. 2. While reading matrix, put all positions of 1's into queue. 3. While queue is not empty a. Dequeue position - let it be x b. For each position around x (that has distance 1 from it) if position is valid (does not exceed matrix dimensions) then if distance is not initialized or is greater than (distance of x) + 1 then I. distance = (distance of x) + 1 II. enqueue position into queue`

I wanted to ask if there is faster solution to that problem. I tried to search algorithms for distance transform but most of them are dealing with Euclidean distances.

Thanks in advance.

`1`

s – CodesInChaos May 6 '13 at 16:15