PlanetMath: convergence/divergence for an infinite product

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convergence/divergence for an infinite product

(Definition)

Consider $\prod_{n=1}^{\infty} p_n$ We say that this infinite product converges iff the finite products $P_m = \prod_{n=1}^{m} p_n \longrightarrow P$ converge. Otherwise the infinite product is called divergent.

"convergence/divergence for an infinite product" is owned by aoh45. [ full author list (2) | owner history (1) ]

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Attachments:: absolute convergence of infinite product (Definition) by mathcam
link between infinite products and sums (Theorem) by paolini
examples of infinite products (Example) by mathcam
convergence condition of infinite product (Theorem) by pahio
order of factors in infinite product (Theorem) by pahio

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Cross-references: divergent, products, finite, iff, converges, infinite product

This is version 10 of convergence/divergence for an infinite product, born on 2003-04-28, modified 2005-12-08.
Object id is 4230, canonical name is ConvergenceForAnInfiniteProduct.
Accessed 2388 times total.

Classification:

AMS MSC:

30E20 (Functions of a complex variable :: Miscellaneous topics of analysis in the complex domain :: Integration, integrals of Cauchy type, integral representations of analytic functions)

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