Power series/Related Articles: Difference between revisions
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imported>Chris Day (New page: {{subpages}} <!-- INSTRUCTIONS, DELETE AFTER READING: Related Articles pages link to existing and proposed articles that are related to the present article. These lists of links double as...) |
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==Parent topics== | ==Parent topics== | ||
{{r|Series ( | {{r|Series (mathematics)}} | ||
==Subtopics== | ==Subtopics== | ||
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==Other related topics== | ==Other related topics== | ||
{{r|Dirichlet series}} | |||
{{r|Fourier series}} | |||
{{r|Puiseaux series}} | |||
==Articles related by keyphrases (Bot populated)== | |||
{{r|Weierstrass preparation theorem}} | |||
{{r|Dirichlet series}} | |||
{{r|Generating function}} | |||
Latest revision as of 12:01, 6 October 2024
- See also changes related to Power series, or pages that link to Power series or to this page or whose text contains "Power series".
Parent topics
- Series (mathematics) [r]: A sequence of numbers defined by the partial sums of another infinite sequence. [e]
Subtopics
- Dirichlet series [r]: An infinite series whose terms involve successive positive integers raised to powers of a variable, typically with integer, real or complex coefficients. [e]
- Fourier series [r]: Infinite series whose terms are constants multiplied by sine and cosine functions and that can approximate a wide variety of periodic functions. [e]
- Puiseaux series [r]: In mathematics, a series with fractional exponents. [e]
- Weierstrass preparation theorem [r]: A description of a canonical form for formal power series over a complete local ring. [e]
- Dirichlet series [r]: An infinite series whose terms involve successive positive integers raised to powers of a variable, typically with integer, real or complex coefficients. [e]
- Generating function [r]: Function g(x,y) corresponding to a family of orthogonal polynomials ƒ0(x), ƒ1(x),…, where a Taylor series expansion of g(x,y) in powers of y will have the polynomial ƒn (x) as the coefficient for the term yn. [e]