- ホーム
- > 洋書
- > 英文書
- > Science / Mathematics
基本説明
Reports on what is known on this problem. It consists of a collection of papers, which can be read independently of each other.
Full Description
The $3x 1$ problem, or Collatz problem, concerns the following seemingly innocent arithmetic procedure applied to integers: If an integer $x$ is odd then ""multiply by three and add one"", while if it is even then ""divide by two"". The $3x 1$ problem asks whether, starting from any positive integer, repeating this procedure over and over will eventually reach the number 1. Despite its simple appearance, this problem is unsolved. Generalizations of the problem are known to be undecidable, and the problem itself is believed to be extraordinarily difficult. This book reports on what is known on this problem. It consists of a collection of papers, which can be read independently of each other. The book begins with two introductory papers, one giving an overview and current status, and the second giving history and basic results on the problem. These are followed by three survey papers on the problem, relating it to number theory and dynamical systems, to Markov chains and ergodic theory, and to logic and the theory of computation. The next paper presents results on probabilistic models for behavior of the iteration. This is followed by a paper giving the latest computational results on the problem, which verify its truth for $x < 5.4 \cdot 10^{18}$. The book also reprints six early papers on the problem and related questions, by L. Collatz, J. H. Conway, H. S. M. Coxeter, C. J. Everett, and R. K. Guy, each with editorial commentary. The book concludes with an annotated bibliography of work on the problem up to the year 2000.
Contents
Part I. Overview and introduction
The 3푥+1 problem: An overview
The 3푥+1 problem and its generalizations
Part II. Survey papers
A 3푥+1 Survey: Number theory and dynamical systems
Generalized 3푥+1 mappings: Markov chains and ergodic theory
Generalized 3푥+1 functions and the theory of computation
Part III. Stochastic modelling and computation papers
Stochastic models for the 3푥+1 and 5푥+1 problems and related problems
Empirical verification of the 3푥+1 and related conjectures
Part IV. Reprinted early papers
Cyclic sequences and Frieze patterns (The Fourth Felix Behrend Memorial Lecture)
Unpredictable iterations
Iteration of the number-theoretic function 푓(2푛)=푛,푓(2푛+1)=3푛+2
Don't try to solve these problems!
On the motivation and origin of the (3푛+1)-problem
FRACTRAN: A simple universal programming language for arithmetic
Part V. Annotated bibliography
The 3푥+1 problem: An annotated bibliography (1963-1999)
