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 κ subsets with the same sum: We construct instances of n integers with subset sum O(nκ+1), for fixed k
AbstractList partitions generalize list colourings. Sandwich problems generalize recognition problem...
\u3cp\u3eWe study the complexity of symmetric assembly puzzles: given a collection of simple polygon...
AbstractWe prove NP-hardness of six families of naturally defined, interesting board games. Some of ...
We discuss some new geometric puzzles and the complexity of their extension to arbitrary sizes. For...
We prove the computational intractability of rotating and placing n square tiles into a 1 × n array ...
When analyzing the computational complexity of well-known puzzles, most papers consider the algorith...
The subject of this thesis is the algorithmic properties of one- and two-player games people enjoy p...
AbstractMany combinatorial riddles may be translated into integer programming problems. Here the wel...
A computation consists of algorithm of basic operations. When you consider an algorithm, you assume,...
A disentanglement puzzle consists of mechanically interlinked pieces, and the puzzle is solved by di...
Holzer and Holzer [HH04] proved that the Tantrix rotation puzzle problem is NP-complete. They also s...
© 2020 Information Processing Society of Japan. We analyze the computational complexity of several n...
This paper deals with a popular puzzle known as Hi-Q. The puzzle is generalized: the board is extend...
We propose a framework that yields instances of certain combinatorial puzzles. To explore such a fra...
In this thesis we explore a number of ways in which combinatorial games can be used to help prove re...
AbstractList partitions generalize list colourings. Sandwich problems generalize recognition problem...
\u3cp\u3eWe study the complexity of symmetric assembly puzzles: given a collection of simple polygon...
AbstractWe prove NP-hardness of six families of naturally defined, interesting board games. Some of ...
We discuss some new geometric puzzles and the complexity of their extension to arbitrary sizes. For...
We prove the computational intractability of rotating and placing n square tiles into a 1 × n array ...
When analyzing the computational complexity of well-known puzzles, most papers consider the algorith...
The subject of this thesis is the algorithmic properties of one- and two-player games people enjoy p...
AbstractMany combinatorial riddles may be translated into integer programming problems. Here the wel...
A computation consists of algorithm of basic operations. When you consider an algorithm, you assume,...
A disentanglement puzzle consists of mechanically interlinked pieces, and the puzzle is solved by di...
Holzer and Holzer [HH04] proved that the Tantrix rotation puzzle problem is NP-complete. They also s...
© 2020 Information Processing Society of Japan. We analyze the computational complexity of several n...
This paper deals with a popular puzzle known as Hi-Q. The puzzle is generalized: the board is extend...
We propose a framework that yields instances of certain combinatorial puzzles. To explore such a fra...
In this thesis we explore a number of ways in which combinatorial games can be used to help prove re...
AbstractList partitions generalize list colourings. Sandwich problems generalize recognition problem...
\u3cp\u3eWe study the complexity of symmetric assembly puzzles: given a collection of simple polygon...
AbstractWe prove NP-hardness of six families of naturally defined, interesting board games. Some of ...