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CCCG
2010
2010
Any monotone boolean function can be realized by interlocked polygons
We show how to construct interlocked collections of simple polygons in the plane that fall apart upon removing certain combinations of pieces. Precisely, interiordisjoint simple planar polygons are interlocked if no subset can be separated arbitrarily far from the rest, moving each polygon as a rigid object as in a slidingblock puzzle. Removing a subset S of these polygons might keep them interlocked or free the polygons, allowing them to separate. Clearly freeing removal sets satisfy monotonicity: if S S and removing S frees the polygons, then so does S . In this paper, we show that any monotone Boolean function f on n variables can be described by m > n interlocked polygons: n of the m polygons represent the n variables, and removing a subset of these n polygons frees the remaining polygons if and only if f is 1 when the corresponding
Real-time Traffic| Added | 29 Oct 2010 |
| Updated | 29 Oct 2010 |
| Type | Conference |
| Year | 2010 |
| Where | CCCG |
| Authors | Erik D. Demaine, Martin L. Demaine, Ryuhei Uehara |
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