Śleszyński–Pringsheim theorem

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Template:Short description 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 $a_{n}$ , $b_{n}$ , for $n = 1, 2, 3, \dots$ are real numbers and $| b_{n} | \geq | a_{n} | + 1$ for all $n$ , then

\frac{a_{1}}{b_{1} + \frac{a_{2}}{b_{2} + \frac{a_{3}}{b_{3} + ⋱}}}

converges absolutely to a number $f$ satisfying $0 < | f | < 1$ ,^[4] meaning that the series

f = \sum_{n} {\frac{A_{n}}{B_{n}} - \frac{A_{n - 1}}{B_{n - 1}}},

where $A_{n} / B_{n}$ are the convergents of the continued fraction, converges absolutely.

See also

Convergence problem

Notes and references

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↑ Template:Cite journal
↑ Template:Cite journal
↑ W.J.Thron has found evidence that Pringsheim was aware of the work of Śleszyński before he published his article; see Template:Cite journal
↑ Template:Cite book

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