Number theory/Signed Articles/Elementary diophantine approximations: Difference between revisions

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'''Definition'''&nbsp; Integers <math>\ a</math>&nbsp; and <math>\ b</math>&nbsp; are ''relatively prime'' &nbsp; <math>\Leftarrow:\Rightarrow\ </math> &nbsp; <math>\ 1</math>&nbsp; is their only common positive divisor.
'''Definition'''&nbsp; Integers <math>\ a</math>&nbsp; and <math>\ b</math>&nbsp; are ''relatively prime'' &nbsp; <math>\Leftarrow:\Rightarrow\ </math> &nbsp; <math>\ 1</math>&nbsp; is their only common positive divisor.
* Integers <math>\ x</math>&nbsp; and <math>\ 0</math>&nbsp; are relatively prime &nbsp; <math>\Leftrightarrow\ |x| = 1.</math>
* <math>1\ </math>&nbsp; is relatively prime with every integer.

Revision as of 20:56, 12 January 2008

The theory of diophantine approximations is a chapter of number theory, which in turn is a part of mathematics. It studies the approximations of real numbers by rational numbers. This article presents an elementary introduction to diophantine approximations, as well as an introduction to number theory via diophantine approximations.

Introduction

In the everyday life our civilization applies mostly (finite) decimal fractions   Decimal fractions are used both as certain values, e.g. $5.85, and as approximations of the real numbers, e.g.   However, the field of all rational numbers is much richer than the ring of the decimal fractions (or of the binary fractions   which are used in the computer science). For instance, the famous approximation   has denominator 113 much smaller than 105 but it provides a better approximation than the decimal one, which has five digits after the decimal point.

How well can real numbers (all of them or the special ones) be approximated by rational numbers? A typical Diophantine approximation result states:

Theorem  Let   be an arbitrary real number. Then

  •   is rational if and only if there exists a real number C > 0 such that

for arbitrary integers   such that   and

  •   is irrational if and only if there exist infinitely many pairs of integers   such that   and

Notation

  •   —   "equivalent by definition" (i.e. "if and only if");
  •   —   "equals by definition";
  •   —   "there exists";
  •   —   "for all";
  •   —   "  is an element of set ";

 

  •  —  the semiring of the natural numbers;
  •  —  the semiring of the non-negative integers;
  •  —  the ring of integers;
  •  —  the field of rational numbers;
  •  —  the field of real numbers;

 

  •   —   "  divides ";
  •  —  the greatest common divisor of integers   and

 

Divisibility

Definition  Integer   is divisible by integer    

Symbolically:

   


When   is divisible by   then we also say that   is a divisor of   or that   divides

  • The only integer divisible by   is   (i.e.   is a divisor only of ).
  •   is divisible by every integer.
  •   is the only positive divisor of
  • Every integer is divisible by   (and by  ).

 

 

Remark  The above three properties show that the relation of divisibility is a partial order in the set of natural number    and also in   is its minimal, and   is its maximal element.

 

Relatively prime pairs of integers

Definition  Integers   and   are relatively prime       is their only common positive divisor.

  • Integers   and   are relatively prime  
  •   is relatively prime with every integer.