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UPDATE: the math term for what I'm looking for is actually inward/outward polygon offseting. +1 to balint for pointing this out. The alternative naming is polygon buffering.

UPDATE 2 (02.11.2011): check out the newly accepted answer - Clipper library by Angus Johnson.

Before I start developing my own solution from scratch, does anyone know of any good source for an algorithm that can inflate a polygon, something similar to this:

alt text

The requirement is that the new (inflated) polygon's edges/points are all at the same constant distance from the old (original) polygon's (on the example pic. they are not, since then it would have to use arcs for inflated vertices, but let's forget about that for now ;) ).

Results of my search:

Here are some links:

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This is not at all a trivial question: if the deflation / inflation is small, nothing serious happens, but at some point, vertices will disappear. Probably this has been done before, so I'd say: use someone else's algorithm, don't build your own. –  Martijn Jul 10 '09 at 13:37
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Indeed, if your polygon is concave to start with (as in the example above) you have to decide what should happen at the point where the naive algorithm wants to make a self-intersecting 'polygon'... –  AakashM Jul 10 '09 at 13:43
    
Yes, the main problem are the concave parts of the polygon, this is where the complexity lies. I still think it shouldn't be such a problem to calculate when a certain vertex has to be eliminated. The main question is what kind of asymptotic complexity this would require. –  Igor Brejc Jul 10 '09 at 17:02
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9 Answers

up vote 41 down vote accepted

I understand that this question was asked with an answer provided and accepted some time ago. Nevertheless I thought I might briefly mention my own polygon clipping and offsetting library - Clipper - in case others are still searching for a solution to this problem.

While Clipper is primarily designed for polygon clipping operations, it does polygon offsetting too. The library is open source freeware written in Delphi, C++ and C#. It has a very unencumbered Boost license allowing it to be used in both freeware and commercial applications without charge.

Clipper's polygon offsetting function allows the choice of three offset styles - round, squared and mitered.

Polygon offsetting styles

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Very cool! Where were you 2 years ago? :) In the end I had to implement my own offsetting logic (and lost a lot of time at it). What algorithm are you using for polygon offsetting, BTW? I used grassfire. Do you handle holes in polygons? –  Igor Brejc Nov 2 '11 at 7:09
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2 years ago I was looking for a decent solution to polygon clipping that wasn't encumbered with tricky licence issues :). Edge offsetting is achieved by generating unit normals for all the edges. Edge joins are tidied by my polygon clipper since the orientations of these overlapped intersections are opposite the orientation of the polygons. Holes are most certainly handled as are self-intersecting polygons etc. There are no restrictions to their type or number. See also "Polygon Offsetting by Computing Winding Numbers" here: me.berkeley.edu/~mcmains/pubs/DAC05OffsetPolygon.pdf –  Angus Johnson Nov 2 '11 at 17:28
    
Whoa! Don't for a second think this question is "forgotten"! I looked here last week -- I wasn't expecting to come back to this! Thanks a bunch! –  Chris Burt-Brown Nov 3 '11 at 11:24
    
Clipper's docs on poly buffering are here: angusj.com/delphi/clipper/documentation/Docs/Units/ClipperLib/… –  Drew Noakes Nov 11 '11 at 11:36
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For anyone that wants to do this, another alternative is to use GEOS, and if your using python, GEOS's wrapper, Shapely. A really pretty example: toblerity.github.com/shapely/manual.html#object.buffer –  pelson Oct 3 '12 at 8:04
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The polygon you are looking for is called inward/outward offset polygon in computational geometry and it is closely related to the straight skeleton (see http://en.wikipedia.org/wiki/Straight_skeleton)

These are several offset polygons for a complicated polygon:

offset polygons

And this is the straight skeleton for another polygon:

straight skeleton

As pointed out in other comments, as well, depending on how far you plan to "inflate/deflate" your polygon you can end up with different connectivity for the output.

From computation point of view: once you have the straight skeleton one should be able to construct the offset polygons relatively easily. The open source and (free for non-commercial) CGAL library has a package implementing these structures. See this code example to compute offset polygons using CGAL.

The package manual should give you a good starting point on how to construct these structures even if you are not going to use CGAL, and contains references to the papers with the mathematical definitions and properties:

CGAL manual: 2D Straight Skeleton and Polygon Offsetting

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Thanks for the tip! This will give me new avenues of googling around :) –  Igor Brejc Jul 10 '09 at 17:25
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Here is an alternative solution, see if you like this better.

  1. Do a triangulation, it don't have to be delaunay -- any triangulation would do.

  2. Inflate each triangle -- this should be trivial. if you store the triangle in the anti-clockwise order, just move the lines to right-hand-side and do intersection.

  3. Merge them using a modified Weiler-Atherton clipping algorithm

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how do you inflate the triangles exactly? Does your output depend on the triangulation? With this approach can you handle the case when you shrink the polygon? –  balint.miklos Jul 10 '09 at 16:49
    
Are you sure this approach really works for polygon inflation? What happens when the concave parts of the polygon are inflated to such extent that some vertices have to be eliminated. The thing is: when you look what happens to triangles after poly. inflation, the triangles are not inflated, instead they are distorted. –  Igor Brejc Jul 10 '09 at 17:09
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Igor: Weiler-Atherton clipping algorithm can handle the "some vertices have to be eliminated" case correctly; –  J-16 SDiZ Jul 11 '09 at 13:22
    
@balint: inflate an triangle is trivial: if you store the vertrex in normal order, the right-hand-side is always "outward". Just treat those line segment as lines, move them outward, and find the interaction -- they are the new vertex. For the triangulation itself, on a second thought, delaunay triangulation may give better result. –  J-16 SDiZ Jul 11 '09 at 13:25
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I think this approach can easily give bad results. Even for a simple example as quad triangulated using a diagonal. For the two enlarged triangles you get: img200.imageshack.us/img200/2640/counterm.png and their union is just not what you are looking for. I don't see how this method is useful. –  balint.miklos Jul 13 '09 at 12:42
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Sounds to me like what you want is:

  • Starting at a vertex, face anti-clockwise along an adjacent edge.
  • Replace the edge with a new, parallel edge placed at distance d to the "left" of the old one.
  • Repeat for all edges.
  • Find the intersections of the new edges to get the new vertices.
  • Detect if you've become a crossed polynomial and decide what to do about it. Probably add a new vertex at the crossing-point and get rid of some old ones. I'm not sure whether there's a better way to detect this than just to compare every pair of non-adjacent edges to see if their intersection lies between both pairs of vertices.

The resulting polygon lies at the required distance from the old polygon "far enough" from the vertices. Near a vertex, the set of points at distance d from the old polygon is, as you say, not a polygon, so the requirement as stated cannot be fulfilled.

I don't know if this algorithm has a name, example code on the web, or a fiendish optimisation, but I think it describes what you want.

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"detect if you've become a crossed polynomial" is the hard part :) –  J-16 SDiZ Jul 10 '09 at 14:00
    
Darn straight. Until you eventually become convex, after which it's not such an issue any more :-) –  Steve Jessop Jul 10 '09 at 14:07
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This is an approach I was thinking about myself - but I couldn't find anything in the usual algorithms places on the net. –  Igor Brejc Jul 10 '09 at 17:11
    
Has somebody found implementation of this approach? I don't want to write it from beginning and want to check this option for my case. –  krzych Sep 2 '12 at 9:01
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Each line should split the plane to "inside" and "outline"; you can find this out using the usual inner-product method.

Move all lines outward by some distance.

Consider all pair of neighbor lines (lines, not line segment), find the intersection. These are the new vertex.

Cleanup the new vertex by removing any intersecting parts. -- we have a few case here

(a) Case 1:

 0--7  4--3
 |  |  |  |
 |  6--5  |
 |        |
 1--------2

if you expend it by one, you got this:

0----a----3
|    |    |
|    |    |
|    b    |
|         |
|         |
1---------2

7 and 4 overlap.. if you see this, you remove this point and all points in between.

(b) case 2

 0--7  4--3
 |  |  |  |
 |  6--5  |
 |        |
 1--------2

if you expend it by two, you got this:

0----47----3
|    ||    |
|    ||    |
|    ||    |
|    56    |
|          |
|          |
|          |
1----------2

to resolve this, for each segment of line, you have to check if it overlap with latter segments.

(c) case 3

       4--3
 0--X9 |  |
 |  78 |  |
 |  6--5  |
 |        |
 1--------2

expend by 1. this is a more general case for case 1.

(d) case 4

same as case3, but expend by two.

Actually, if you can handle case 4. All other cases are just special case of it with some line or vertex overlapping.

To do case 4, you keep a stack of vertex.. you push when you find lines overlapping with latter line, pop it when you get the latter line. -- just like what you do in convex-hull.

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This looks like a half-plane intersection algorithm? –  Igor Brejc Jul 10 '09 at 17:18
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In the GIS world one uses negative buffering for this task: http://www-users.cs.umn.edu/~npramod/enc_pdf.pdf

The JTS library should do this for you. See the documentation for the buffer operation: http://tsusiatsoftware.net/jts/javadoc/com/vividsolutions/jts/operation/buffer/package-summary.html

For a rough overview see also the Developer Guide: http://www.vividsolutions.com/jts/bin/JTS%20Developer%20Guide.pdf

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I wrote some blog posts on my experiences of trying to implement the straight skeleton algorithm for precicely this case (polygon expansion / reduction through offsetting). At the time I had two blogs. It may be helpful to read about some of the problems I encountered:

  1. http://max-on-graphics.blogspot.com/2008/06/straight-skeleton-madness-plea-for-help.html

Regards,

Max

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Max, any chance your code gets open-sourced? :) –  Igor Brejc Oct 19 '09 at 19:19
    
No plans at present I'm afraid. –  Max Palmer Oct 27 '09 at 12:07
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Based on advice from @JoshO'Brian, it appears the rGeos package in the R language implements this algorithm. See rGeos::gBuffer .

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