Padé approximants - Revision history

Carl McBride: Added a reference

2008-08-01T11:02:19Z

Added a reference

← Older revision		Revision as of 13:02, 1 August 2008
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	because the use of rational functions allows them to be well-represented.		because the use of rational functions allows them to be well-represented.
	==Applications of Padé approximants in liquid state theory==		==Applications of Padé approximants in liquid state theory==
			#[http://dx.doi.org/10.1063/1.2958914 André O. Guerrero and Adalberto B. M. S. Bassi "On Padé approximants to virial series", Journal of Chemical Physics '''129''' 044509 (2008)]
	==See also==		==See also==
	*[http://mathworld.wolfram.com/PadeApproximant.html Padé Approximant -- from Wolfram MathWorld]		*[http://mathworld.wolfram.com/PadeApproximant.html Padé Approximant -- from Wolfram MathWorld]
	[[category: mathematics]]		[[category: mathematics]]

Carl McBride at 13:01, 12 February 2008

2008-02-12T13:01:59Z

← Older revision		Revision as of 15:01, 12 February 2008
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	{{Stub-general}}		{{Stub-general}}
	'''Padé approximants''' are derived by expanding a function as a ratio of two power series		'''Padé approximants''' are derived by expanding a function as a ratio of two [[power series]]
	and determining both the numerator and denominator coefficients.		and determining both the numerator and denominator coefficients.
	Padé approximations are usually superior to [[Taylor expansion]]s when functions contain poles,		Padé approximations are usually superior to [[Taylor expansion]]s when functions contain poles,

Carl McBride at 18:03, 9 October 2007

2007-10-09T18:03:28Z

← Older revision		Revision as of 20:03, 9 October 2007
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			{{Stub-general}}
	'''Padé approximants''' are derived by expanding a function as a ratio of two power series		'''Padé approximants''' are derived by expanding a function as a ratio of two power series
	and determining both the numerator and denominator coefficients.		and determining both the numerator and denominator coefficients.
	Padé approximations are usually superior to [[Taylor expansion]]s when functions contain poles,		Padé approximations are usually superior to [[Taylor expansion]]s when functions contain poles,
	because the use of rational functions allows them to be well-represented.		because the use of rational functions allows them to be well-represented.
			==Applications of Padé approximants in liquid state theory==
	==See also==		==See also==
	*[http://mathworld.wolfram.com/PadeApproximant.html Padé Approximant -- from Wolfram MathWorld]		*[http://mathworld.wolfram.com/PadeApproximant.html Padé Approximant -- from Wolfram MathWorld]
	[[category: mathematics]]		[[category: mathematics]]

Carl McBride at 10:19, 31 May 2007

2007-05-31T10:19:37Z

← Older revision		Revision as of 12:19, 31 May 2007
Line 3:		Line 3:
	Padé approximations are usually superior to [[Taylor expansion]]s when functions contain poles,		Padé approximations are usually superior to [[Taylor expansion]]s when functions contain poles,
	because the use of rational functions allows them to be well-represented.		because the use of rational functions allows them to be well-represented.
			==See also==
			*[http://mathworld.wolfram.com/PadeApproximant.html Padé Approximant -- from Wolfram MathWorld]
	[[category: mathematics]]		[[category: mathematics]]

Carl McBride: New page: '''Padé approximants''' are derived by expanding a function as a ratio of two power series and determining both the numerator and denominator coefficients. Padé approximations are usuall...

2007-05-29T09:20:31Z

New page: '''Padé approximants''' are derived by expanding a function as a ratio of two power series and determining both the numerator and denominator coefficients. Padé approximations are usuall...

New page

'''Padé approximants''' are derived by expanding a function as a ratio of two power series
and determining both the numerator and denominator coefficients.
Padé approximations are usually superior to [[Taylor expansion]]s when functions contain poles,
because the use of rational functions allows them to be well-represented.
[[category: mathematics]]