Litcius/Paper detail

Framework for ER-Completeness of Two-Dimensional Packing Problems

Mikkel Abrahamsen, Tillmann Miltzow, Nadja Seiferth

202024 citationsDOIOpen Access PDF

Abstract

We show that many natural two-dimensional packing problems are algorithmically equivalent to finding real roots of multivariate polynomials. A two-dimensional packing problem is defined by the type of pieces, containers, and motions that are allowed. The aim is to decide if a given set of pieces can be placed inside a given container. The pieces must be placed so that in the resulting placement, they are pairwise interior-disjoint, and only motions of the allowed type can be used to move them there. We establish a framework which enables us to show that for many combinations of allowed pieces, containers, and motions, the resulting problem is ER-complete. This means that the problem is equivalent (under polynomial time reductions) to deciding whether a given system of polynomial equations and inequalities with integer coefficients has a real solution. A full version of this extended abstract is available on https://arxiv.org/abs/1704.06969.

Topics & Concepts

Disjoint setsPacking problemsContainer (type theory)Completeness (order theory)Pairwise comparisonPolynomialSet (abstract data type)Integer (computer science)Integer programmingPolyhedronMathematicsSet packingType (biology)Time complexityComputer scienceMathematical optimizationDiscrete mathematicsCombinatoricsMathematical analysisEngineeringProgramming languageArtificial intelligenceBiologyEcologyMechanical engineeringOptimization and Packing ProblemsComputational Geometry and Mesh GenerationManufacturing Process and Optimization
Framework for ER-Completeness of Two-Dimensional Packing Problems | Litcius