Add to ORKGGiven a small polygon S, a big simple polygon B and a positive integer k, it is shown to be NP-hard to determine whether k copies of the small polygon (allowing translation and rotation) can be placed in the big polygon without overlap. Previous NP-hardness results were only known in the case where the big polygon is allowed to be non-simple. A novel reduction from Planar-Circuit-SAT is presented where a small polygon is constructed to encode the entire circuit.info:eu-repo/semantics/publishe
Let T be a triangulation of a simple polygon. A flip in T is the operation of removing one diagonal ...
The inherent computational complexity of polygon decomposition problems is of importance in the fiel...
We revisit the classical problem of determining the largest copy of a simple polygon $P$ that can be...
Given a small polygon S, a big simple polygon B and a positive integer k, it is shown to be NP-hard ...
We significantly extend the class of polygons for which the 22 simple packing problem can be solved ...
We show that it is NP-hard to decide the Fréchet distance between (i) non-intersecting polygons with...
We show that it is NP-hard to decide the Fréchet distance between (i) non-intersecting polygons with...
We show that it is NP-hard to decide the Fréchet distance between (i) non-intersecting polygons with...
We show that it is NP-hard to decide the Fréchet distance between (i) non-intersecting polygons with...
We show that it is NP-hard to decide the Fréchet distance between (i) non-intersecting polygons with...
Let M be an m-sided simple polygon and N be an n-sided polygon with holes. In this paper we consider...
We show that it is NP-hard to decide the Fréchet distance between (i) non-intersecting polygons with...
We present an algorithm for the two-dimensional translational containment problem: find translations...
AbstractA translational lattice packing of k polygons P1,P2,P3,…,Pk is a (non-overlapping) packing o...
\u3cp\u3eWe study the complexity of symmetric assembly puzzles: given a collection of simple polygon...
Let T be a triangulation of a simple polygon. A flip in T is the operation of removing one diagonal ...
The inherent computational complexity of polygon decomposition problems is of importance in the fiel...
We revisit the classical problem of determining the largest copy of a simple polygon $P$ that can be...
Given a small polygon S, a big simple polygon B and a positive integer k, it is shown to be NP-hard ...
We significantly extend the class of polygons for which the 22 simple packing problem can be solved ...
We show that it is NP-hard to decide the Fréchet distance between (i) non-intersecting polygons with...
We show that it is NP-hard to decide the Fréchet distance between (i) non-intersecting polygons with...
We show that it is NP-hard to decide the Fréchet distance between (i) non-intersecting polygons with...
We show that it is NP-hard to decide the Fréchet distance between (i) non-intersecting polygons with...
We show that it is NP-hard to decide the Fréchet distance between (i) non-intersecting polygons with...
Let M be an m-sided simple polygon and N be an n-sided polygon with holes. In this paper we consider...
We show that it is NP-hard to decide the Fréchet distance between (i) non-intersecting polygons with...
We present an algorithm for the two-dimensional translational containment problem: find translations...
AbstractA translational lattice packing of k polygons P1,P2,P3,…,Pk is a (non-overlapping) packing o...
\u3cp\u3eWe study the complexity of symmetric assembly puzzles: given a collection of simple polygon...
Let T be a triangulation of a simple polygon. A flip in T is the operation of removing one diagonal ...
The inherent computational complexity of polygon decomposition problems is of importance in the fiel...
We revisit the classical problem of determining the largest copy of a simple polygon $P$ that can be...