Jump to content

Flood fill

From Wikipedia, the free encyclopedia
(Redirected from Color-fill)
Recursive flood fill with 4 directions

Flood fill, also called seed fill, is a flooding algorithm that determines and alters the area connected to a given node in a multi-dimensional array with some matching attribute. It is used in the "bucket" fill tool of paint programs to fill connected, similarly colored areas with a different color, and in games such as Go and Minesweeper for determining which pieces are cleared. A variant called boundary fill uses the same algorithms but is defined as the area connected to a given node that does not have a particular attribute.[1]

Note that flood filling is not suitable for drawing filled polygons, as it will miss some pixels in more acute corners.[2] Instead, see Even-odd rule and Nonzero-rule.

The algorithm parameters

[edit]
Recursive flood fill with 8 directions

The traditional flood-fill algorithm takes three parameters: a start node, a target color, and a replacement color. The algorithm looks for all nodes in the array that are connected to the start node by a path of the target color and changes them to the replacement color. For a boundary-fill, in place of the target color, a border color would be supplied.

In order to generalize the algorithm in the common way, the following descriptions will instead have two routines available.[3] One called Inside which returns true for unfilled points that, by their color, would be inside the filled area, and one called Set which fills a pixel/node. Any node that has Set called on it must then no longer be Inside.

Depending on whether we consider nodes touching at the corners connected or not, we have two variations: eight-way and four-way respectively.

Stack-based recursive implementation (four-way)

[edit]

The earliest-known, implicitly stack-based, recursive, four-way flood-fill implementation goes as follows:[4][5][6][7]

Flood-fill (node):
 1. If node is not Inside return.
 2. Set the node
 3. Perform Flood-fill one step to the south of node.
 4. Perform Flood-fill one step to the north of node
 5. Perform Flood-fill one step to the west of node
 6. Perform Flood-fill one step to the east of node
 7. Return.

Though easy to understand, the implementation of the algorithm used above is impractical in languages and environments where stack space is severely constrained (e.g. Microcontrollers).

Moving the recursion into a data structure

[edit]
Four-way flood fill using a queue for storage
Four-way flood fill using a stack for storage

Moving the recursion into a data structure (either a stack or a queue) prevents a stack overflow. It is similar to the simple recursive solution, except that instead of making recursive calls, it pushes the nodes onto a stack or queue for consumption, with the choice of data structure affecting the proliferation pattern:

Flood-fill (node):
  1. Set Q to the empty queue or stack.
  2. Add node to the end of Q.
  3. While Q is not empty:
  4.   Set n equal to the first element of Q.
  5.   Remove first element from Q.
  6.   If n is Inside:
         Set the n
         Add the node to the west of n to the end of Q.
         Add the node to the east of n to the end of Q.
         Add the node to the north of n to the end of Q.
         Add the node to the south of n to the end of Q.
  7. Continue looping until Q is exhausted.
  8. Return.

Further potential optimizations

[edit]
  • Check and set each node's pixel color before adding it to the stack/queue, reducing stack/queue size.
  • Use a loop for the east–west directions, queuing pixels above/below as you go (making it similar to the span filling algorithms, below).
  • Interleave two or more copies of the code with extra stacks/queues, to allow out-of-order processors more opportunity to parallelize.
  • Use multiple threads (ideally with slightly different visiting orders, so they don't stay in the same area).[6]

Advantages

[edit]
  • Very simple algorithm - easy to make bug-free.[6]

Disadvantages

[edit]
  • Uses a lot of memory, particularly when using a stack.[6]
  • Tests most filled pixels a total of four times.
  • Not suitable for pattern filling, as it requires pixel test results to change.
  • Access pattern is not cache-friendly, for the queuing variant.
  • Cannot easily optimize for multi-pixel words or bitplanes.[2]

Span filling

[edit]
Scanline fill using a stack for storage

It's possible to optimize things further by working primarily with spans, a row with constant y. The first published complete example works on the following basic principle.[1]

  1. Starting with a seed point, fill left and right. Keep track of the leftmost filled point lx and rightmost filled point rx. This defines the span.
  2. Scan from lx to rx above and below the seed point, searching for new seed points to continue with.

As an optimisation, the scan algorithm does not need restart from every seed point, but only those at the start of the next span. Using a stack explores spans depth first, whilst a queue explores spans breadth first.

fn fill(x, y):
    if not Inside(x, y) then return
    let s = new empty stack or queue
    Add (x, y) to s
    while s is not empty:
        Remove an (x, y) from s
        let lx = x
        while Inside(lx - 1, y):
            Set(lx - 1, y)
            lx = lx - 1
        while Inside(x, y):
            Set(x, y)
            x = x + 1
      scan(lx, x - 1, y + 1, s)
      scan(lx, x - 1, y - 1, s)

fn scan(lx, rx, y, s):
    let span_added = false
    for x in lx .. rx:
        if not Inside(x, y):
            span_added = false
        else if not span_added:
            Add (x, y) to s
            span_added = true

Over time, the following optimizations were realized:

  • When a new scan would be entirely within a grandparent span, it would certainly only find filled pixels, and so wouldn't need queueing.[1][6][3]
  • Further, when a new scan overlaps a grandparent span, only the overhangs (U-turns and W-turns) need to be scanned.[3]
  • It's possible to fill while scanning for seeds [6]

The final, combined-scan-and-fill span filler was then published in 1990. In pseudo-code form:[8]

fn fill(x, y):
    if not Inside(x, y) then return
    let s = new empty queue or stack
    Add (x, x, y, 1) to s
    Add (x, x, y - 1, -1) to s
    while s is not empty:
        Remove an (x1, x2, y, dy) from s
        let x = x1
        if Inside(x, y):
            while Inside(x - 1, y):
                Set(x - 1, y)
                x = x - 1
            if x < x1:
                Add (x, x1 - 1, y - dy, -dy) to s
        while x1 <= x2:
            while Inside(x1, y):
                Set(x1, y)
                x1 = x1 + 1
            if x1 > x:
                Add (x, x1 - 1, y + dy, dy) to s
            if x1 - 1 > x2:
                Add (x2 + 1, x1 - 1, y - dy, -dy) to s
            x1 = x1 + 1
            while x1 < x2 and not Inside(x1, y):
                x1 = x1 + 1
            x = x1

Advantages

[edit]
  • 2–8x faster than the pixel-recursive algorithm.
  • Access pattern is cache and bitplane-friendly.[6]
  • Can draw a horizontal line rather than setting individual pixels.[6]

Disadvantages

[edit]
  • Still visits pixels it has already filled. (For the popular algorithm, 3 scans of most pixels. For the final one, only doing extra scans of pixels where there are holes in the filled area.)[3]
  • Not suitable for pattern filling, as it requires pixel test results to change.

Adding pattern filling support

[edit]

Two common ways to make the span and pixel-based algorithms support pattern filling are either to use a unique color as a plain fill and then replace that with a pattern or to keep track (in a 2d boolean array or as regions) of which pixels have been visited, using it to indicate pixels are no longer fillable. Inside must then return false for such visited pixels.[3]

Graph-theoretic filling

[edit]

Some theorists applied explicit graph theory to the problem, treating spans of pixels, or aggregates of such, as nodes and studying their connectivity. The first published graph theory algorithm worked similarly to the span filling, above, but had a way to detect when it would duplicate filling of spans.[9] Unfortunately, it had bugs that made it not complete some fills.[10] A corrected algorithm was later published with a similar basis in graph theory; however, it alters the image as it goes along, to temporarily block off potential loops, complicating the programmatic interface.[10] A later published algorithm depended on the boundary being distinct from everything else in the image and so isn't suitable for most uses;[11][3] it also requires an extra bit per pixel for bookkeeping.[3]

Advantages

[edit]
  • Suitable for pattern filling, directly, as it never retests filled pixels.[9][10][11]
  • Double the speed of the original span algorithm, for uncomplicated fills.[3]
  • Access pattern is cache and bitplane-friendly.[6][3]

Disadvantages

[edit]
  • Regularly, a span has to be compared to every other 'front' in the queue, which significantly slows down complicated fills.[3]
  • Switching back and forth between graph theoretic and pixel domains complicates understanding.
  • The code is fairly complicated, increasing the chances of bugs.

Walk-based filling (Fixed-memory method)

[edit]

A method exists that uses essentially no memory for four-connected regions by pretending to be a painter trying to paint the region without painting themselves into a corner. This is also a method for solving mazes. The four pixels making the primary boundary are examined to see what action should be taken. The painter could find themselves in one of several conditions:

  1. All four boundary pixels are filled.
  2. Three of the boundary pixels are filled.
  3. Two of the boundary pixels are filled.
  4. One boundary pixel is filled.
  5. Zero boundary pixels are filled.

Where a path or boundary is to be followed, the right-hand rule is used. The painter follows the region by placing their right-hand on the wall (the boundary of the region) and progressing around the edge of the region without removing their hand.

For case #1, the painter paints (fills) the pixel the painter is standing upon and stops the algorithm.

For case #2, a path leading out of the area exists. Paint the pixel the painter is standing upon and move in the direction of the open path.

For case #3, the two boundary pixels define a path which, if we painted the current pixel, may block us from ever getting back to the other side of the path. We need a "mark" to define where we are and which direction we are heading to see if we ever get back to exactly the same pixel. If we already created such a "mark", then we preserve our previous mark and move to the next pixel following the right-hand rule.

A mark is used for the first 2-pixel boundary that is encountered to remember where the passage started and in what direction the painter was moving. If the mark is encountered again and the painter is traveling in the same direction, then the painter knows that it is safe to paint the square with the mark and to continue in the same direction. This is because (through some unknown path) the pixels on the other side of the mark can be reached and painted in the future. The mark is removed for future use.

If the painter encounters the mark but is going in a different direction, then some sort of loop has occurred, which caused the painter to return to the mark. This loop must be eliminated. The mark is picked up, and the painter then proceeds in the direction indicated previously by the mark using a left-hand rule for the boundary (similar to the right-hand rule but using the painter's left hand). This continues until an intersection is found (with three or more open boundary pixels). Still using the left-hand rule the painter now searches for a simple passage (made by two boundary pixels). Upon finding this two-pixel boundary path, that pixel is painted. This breaks the loop and allows the algorithm to continue.

For case #4, we need to check the opposite 8-connected corners to see whether they are filled or not. If either or both are filled, then this creates a many-path intersection and cannot be filled. If both are empty, then the current pixel can be painted and the painter can move following the right-hand rule.

The algorithm trades time for memory. For simple shapes it is very efficient. However, if the shape is complex with many features, the algorithm spends a large amount of time tracing the edges of the region trying to ensure that all can be painted.

A walking algorithm was published in 1994.[12]

Pseudocode

[edit]

This is a pseudocode implementation of an optimal fixed-memory flood-fill algorithm written in structured English:

The variables
  • cur, mark, and mark2 each hold either pixel coordinates or a null value
    • NOTE: when mark is set to null, do not erase its previous coordinate value. Keep those coordinates available to be recalled if necessary.
  • cur-dir, mark-dir, and mark2-dir each hold a direction (left, right, up, or down)
  • backtrack and findloop each hold boolean values
  • count is an integer
The algorithm
NOTE: All directions (front, back, left, right) are relative to cur-dir
set cur to starting pixel
set cur-dir to default direction
clear mark and mark2 (set values to null)
set backtrack and findloop to false

while front-pixel is empty do
    move forward
end while

jump to START

MAIN LOOP:
    move forward
    if right-pixel is inside then
        if backtrack is true and findloop is false and either front-pixel or left-pixel is inside then
            set findloop to true
        end if
        turn right
PAINT:
        move forward
    end if
START:
    set count to number of non-diagonally adjacent pixels filled (front/back/left/right ONLY)
    if count is not 4 then
        do
            turn right
        while front-pixel is inside
        do
            turn left
        while front-pixel is not inside
    end if
    switch count
        case 1
            if backtrack is true then
                set findloop to true
            else if findloop is true then
                if mark is null then
                    restore mark
                end if
            else if front-left-pixel and back-left-pixel are both inside then
                clear mark
                set cur
                jump to PAINT
            end if
        end case
        case 2
            if back-pixel is not inside then
                if front-left-pixel is inside then
                    clear mark
                    set cur
                    jump to PAINT
                end if
            else if mark is not set then
                set mark to cur
                set mark-dir to cur-dir
                clear mark2
                set findloop and backtrack to false
            else
                if mark2 is not set then
                    if cur is at mark then
                        if cur-dir is the same as mark-dir then
                            clear mark
                            turn around
                            set cur
                            jump to PAINT
                        else
                            set backtrack to true
                            set findloop to false
                            set cur-dir to mark-dir
                        end if
                    else if findloop is true then
                        set mark2 to cur
                        set mark2-dir to cur-dir
                    end if
                else
                    if cur is at mark then
                        set cur to mark2
                        set cur-dir to mark2-dir
                        clear mark and mark2
                        set backtrack to false
                        turn around
                        set cur
                        jump to PAINT
                    else if cur at mark2 then
                        set mark to cur
                        set cur-dir and mark-dir to mark2-dir
                        clear mark2
                    end if
                end if
            end if
        end case
        case 3
            clear mark
            set cur
            jump to PAINT
        end case
        case 4
            set cur
            done
        end case
    end switch
end MAIN LOOP

Advantages

[edit]
  • Constant memory usage.

Disadvantages

[edit]
  • Access pattern is not cache or bitplane-friendly.
  • Can spend a lot of time walking around loops before closing them.

Vector implementations

[edit]

Version 0.46 of Inkscape includes a bucket fill tool, giving output similar to ordinary bitmap operations and indeed using one: the canvas is rendered, a flood fill operation is performed on the selected area and the result is then traced back to a path. It uses the concept of a boundary condition.

See also

[edit]
[edit]

References

[edit]
  1. ^ a b c Smith, Alvy Ray (1979). Tint Fill. SIGGRAPH '79: Proceedings of the 6th annual conference on Computer graphics and interactive techniques. pp. 276–283. doi:10.1145/800249.807456.
  2. ^ a b Ackland, Bryan D; Weste, Neil H (1981). The edge flag algorithm — A fill method for raster scan displays. IEEE Transactions on Computers (Volume: C-30, Issue: 1). pp. 41–48. doi:10.1109/TC.1981.6312155.
  3. ^ a b c d e f g h i j Fishkin, Kenneth P; Barsky, Brian A (1985). An Analysis and Algorithm for Filling Propagation. Computer-Generated Images: The State of the Art Proceedings of Graphics Interface ’85. pp. 56–76. doi:10.1007/978-4-431-68033-8_6.
  4. ^ Newman, William M; Sproull, Robert Fletcher (1979). Principles of Interactive Computer Graphics (2nd ed.). McGraw-Hill. p. 253. ISBN 978-0-07-046338-7.
  5. ^ Pavlidis, Theo (1982). Algorithms for Graphics and Image Processing. Springer-Verlag. p. 181. ISBN 978-3-642-93210-6.
  6. ^ a b c d e f g h i Levoy, Marc (1982). Area Flooding Algorithms. SIGGRAPH 1981 Two-Dimensional Computer Animation course notes.
  7. ^ Foley, J D; van Dam, A; Feiner, S K; Hughes, S K (1990). Computer Graphics: Principles and Practice (2nd ed.). Addison–Wesley. pp. 979–982. ISBN 978-0-201-84840-3.
  8. ^ Heckbert, Paul S (1990). "IV.10: A Seed Fill Algorithm". In Glassner, Andrew S (ed.). Graphics Gems. Academic Press. pp. 275–277. ISBN 0122861663.
  9. ^ a b Lieberman, Henry (1978). How to Color in a Coloring Book. SIGGRAPH '78: Proceedings of the 5th annual conference on Computer graphics and interactive techniques. pp. 111–116. doi:10.1145/800248.807380.
  10. ^ a b c Shani, Uri (1980). Filling regions in binary raster images: A graph-theoretic approach. SIGGRAPH '80: Proceedings of the 7th annual conference on Computer graphics and interactive techniques. pp. 321–327. doi:10.1145/800250.807511.
  11. ^ a b Pavlidis, Theo (1981). Contour Filling in Raster Graphics. SIGGRAPH '81: Proceedings of the 8th annual conference on Computer graphics and interactive techniques. pp. 29–36. doi:10.1145/800224.806786.
  12. ^ Henrich, Dominik (1994). Space-efficient region filling in raster graphics. The Visual Computer. pp. 205–215. doi:10.1007/BF01901287.