Wooden Geometric Puzzles: Design and Hardness Proofs
Publication date
2008
Authors
Alt, H.
Bodlaender, H.L.
Kreveld, M.J. van
Rote, G.
Tel, G.
Editors
Advisors
Supervisors
DOI
Document Type
Article
Metadata
Show full item recordCollections
License
Abstract
We discuss some new geometric puzzles and the complexity of their
extension to arbitrary sizes. For gate puzzles and two-layer puzzles we prove
NP-completeness of solving them. Not only the solution of puzzles leads to interesting
questions, but also puzzle design gives rise to interesting theoretical questions.
This leads to the search for instances of partition that use only integers and are
uniquely solvable.We show that instances of polynomial size exist with this property.
This result also holds for partition into k subsets with the same sum: We construct
instances of n integers with subset sum O(nk+1), for fixed k.
Keywords
Geometric puzzles, Complexity, Partition