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In [[mathematics]], specifically the area of [[Diophantine approximation]], the '''Davenport–Schmidt theorem''' tells us how well a certain kind of [[real number]] can be approximated by another kind.  Specifically it tells us that we can get a good approximation to irrational numbers that are not quadratic by using either [[quadratic irrational]]s or simply [[rational number]]s.  It is named after [[Harold Davenport]] and [[Wolfgang M. Schmidt]].


==Statement==
Given a number α which is either rational or a quadratic irrational, we can find unique integers ''x'', ''y'', and ''z'' such that ''x'', ''y'', and ''z'' are not all zero, the first non-zero one among them is positive, they are relatively prime, and we have


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:<math>x\alpha^2 +y\alpha +z=0.\,</math>
 
If α is a quadratic irrational we can take ''x'', ''y'', and ''z'' to be the coefficients of its [[minimal polynomial (field theory)|minimal polynomial]]. If α is rational we will have ''x''&nbsp;=&nbsp;0. With these integers uniquely determined for each such α we can define the ''height'' of α to be
 
:<math>H(\alpha)=\max\{|x|,|y|,|z|\}.\,</math>
 
The theorem then says that for any real number ξ which is neither rational nor a quadratic irrational, we can find infinitely many real numbers α which ''are'' rational or quadratic irrationals and which satisfy
 
:<math>|\xi-\alpha|<CH(\alpha)^{-3},\,</math>
 
where
 
:<math>C=\left\{\begin{array}{ c l } C_0 & \textrm{if}\ |\xi|<1 \\ C_0\xi^2 & \textrm{if}\ |\xi|>1.\end{array}\right.</math>
 
Here we can take ''C''<sub>0</sub> to be any real number satisfying ''C''<sub>0</sub>&nbsp;&gt;&nbsp;160/9.<ref>H. Davenport, Wolfgang M. Schmidt, "''Approximation to real numbers by quadratic irrationals''," Acta Arithmetica '''13''', (1967).</ref>
 
While the theorem is related to [[Thue–Siegel–Roth theorem|Roth's theorem]], its real use lies in the fact that it is [[Effective results in number theory|effective]], in the sense that the constant ''C'' can be worked out for any given ξ.
 
==Notes==
<references/>
 
==References==
* [[Wolfgang M. Schmidt]]. ''Diophantine approximation''. Lecture Notes in Mathematics 785. Springer. (1980 [1996 with minor corrections])
* Wolfgang M. Schmidt.''Diophantine approximations and Diophantine equations'', Lecture Notes in Mathematics, Springer Verlag 2000
 
==External links==
*{{planetmath reference|id=4151|title=Davenport-Schmidt theorem}}
 
{{DEFAULTSORT:Davenport-Schmidt theorem}}
[[Category:Diophantine approximation]]
[[Category:Theorems in number theory]]

Latest revision as of 07:01, 20 December 2013

In mathematics, specifically the area of Diophantine approximation, the Davenport–Schmidt theorem tells us how well a certain kind of real number can be approximated by another kind. Specifically it tells us that we can get a good approximation to irrational numbers that are not quadratic by using either quadratic irrationals or simply rational numbers. It is named after Harold Davenport and Wolfgang M. Schmidt.

Statement

Given a number α which is either rational or a quadratic irrational, we can find unique integers x, y, and z such that x, y, and z are not all zero, the first non-zero one among them is positive, they are relatively prime, and we have

xα2+yα+z=0.

If α is a quadratic irrational we can take x, y, and z to be the coefficients of its minimal polynomial. If α is rational we will have x = 0. With these integers uniquely determined for each such α we can define the height of α to be

H(α)=max{|x|,|y|,|z|}.

The theorem then says that for any real number ξ which is neither rational nor a quadratic irrational, we can find infinitely many real numbers α which are rational or quadratic irrationals and which satisfy

|ξα|<CH(α)3,

where

C={C0if|ξ|<1C0ξ2if|ξ|>1.

Here we can take C0 to be any real number satisfying C0 > 160/9.[1]

While the theorem is related to Roth's theorem, its real use lies in the fact that it is effective, in the sense that the constant C can be worked out for any given ξ.

Notes

  1. H. Davenport, Wolfgang M. Schmidt, "Approximation to real numbers by quadratic irrationals," Acta Arithmetica 13, (1967).

References

  • Wolfgang M. Schmidt. Diophantine approximation. Lecture Notes in Mathematics 785. Springer. (1980 [1996 with minor corrections])
  • Wolfgang M. Schmidt.Diophantine approximations and Diophantine equations, Lecture Notes in Mathematics, Springer Verlag 2000

External links

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