Śleszyński–Pringsheim theorem

Criterion for convergence of continued fractions

In mathematics, the Śleszyński–Pringsheim theorem is a statement about convergence of certain continued fractions. It was discovered by Ivan Śleszyński[1] and Alfred Pringsheim[2] in the late 19th century.[3]

It states that if a n {\displaystyle a_{n}} , b n {\displaystyle b_{n}} , for n = 1 , 2 , 3 , {\displaystyle n=1,2,3,\ldots } are real numbers and | b n | | a n | + 1 {\displaystyle |b_{n}|\geq |a_{n}|+1} for all n {\displaystyle n} , then

a 1 b 1 + a 2 b 2 + a 3 b 3 + {\displaystyle {\cfrac {a_{1}}{b_{1}+{\cfrac {a_{2}}{b_{2}+{\cfrac {a_{3}}{b_{3}+\ddots }}}}}}}

converges absolutely to a number f {\displaystyle f} satisfying 0 < | f | < 1 {\displaystyle 0<|f|<1} ,[4] meaning that the series

f = n { A n B n A n 1 B n 1 } , {\displaystyle f=\sum _{n}\left\{{\frac {A_{n}}{B_{n}}}-{\frac {A_{n-1}}{B_{n-1}}}\right\},}

where A n / B n {\displaystyle A_{n}/B_{n}} are the convergents of the continued fraction, converges absolutely.

See also

  • Convergence problem

Notes and references

  1. ^ Слешинскій, И. В. (1889). "Дополненiе къ замѣткѣ о сходимости непрерывныхъ дробей". Матем. Сб. (in Russian). 14 (3): 436–438.
  2. ^ Pringsheim, A. (1898). "Ueber die Convergenz unendlicher Kettenbrüche". Münch. Ber. (in German). 28: 295–324. JFM 29.0178.02.
  3. ^ W.J.Thron has found evidence that Pringsheim was aware of the work of Śleszyński before he published his article; see Thron, W. J. (1992). "Should the Pringsheim criterion be renamed the Śleszyński criterion?". Comm. Anal. Theory Contin. Fractions. 1: 13–20. MR 1192192.
  4. ^ Lorentzen, L.; Waadeland, H. (2008). Continued Fractions: Convergence theory. Atlantic Press. p. 129.


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