About: Partial fractions in complex analysis

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dbo:abstract	In complex analysis, a partial fraction expansion is a way of writing a meromorphic function as an infinite sum of rational functions and polynomials. When is a rational function, this reduces to the usual method of partial fractions. (en) Em análises complexas, a expansão de uma fração parcial é uma maneira de escrever uma função meromórfica f(z) como um somatório infinito de funções racionais e polinomiais. Quando f(z) é uma função racional, isso se reduz ao método de frações parciais. (pt) Наипростейшей дробью -ой степени называется рациональная функция вида где принимает натуральные значения, а точки , являющиеся полюсами функции , необязательно геометрически различны. Другими словами, наипростейшая дробь есть логарифмическая производная некоторого комплексного многочлена таким образом, (ru)
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dbo:wikiPageWikiLink	dbr:Meromorphic_function dbr:Residue_theorem dbr:Degree_of_a_polynomial dbr:Infinite_product dbr:Complex_analysis dbr:Entire_function dbr:Pole_(complex_analysis) dbr:Weierstrass_factorization_theorem dbr:Line_integral dbc:Partial_fractions dbr:Regular_part dbr:Residue_(complex_analysis) dbc:Complex_analysis dbr:Principal_part dbr:Polynomial_long_division dbr:Rational_functions dbr:Polynomials dbr:Tangent_numbers dbr:Polynomial_factorization dbr:Partial_fraction dbr:Partial_fractions dbr:Laurent_expansion
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dcterms:subject	dbc:Partial_fractions dbc:Complex_analysis
gold:hypernym	dbr:Way
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rdfs:comment	In complex analysis, a partial fraction expansion is a way of writing a meromorphic function as an infinite sum of rational functions and polynomials. When is a rational function, this reduces to the usual method of partial fractions. (en) Em análises complexas, a expansão de uma fração parcial é uma maneira de escrever uma função meromórfica f(z) como um somatório infinito de funções racionais e polinomiais. Quando f(z) é uma função racional, isso se reduz ao método de frações parciais. (pt) Наипростейшей дробью -ой степени называется рациональная функция вида где принимает натуральные значения, а точки , являющиеся полюсами функции , необязательно геометрически различны. Другими словами, наипростейшая дробь есть логарифмическая производная некоторого комплексного многочлена таким образом, (ru)
rdfs:label	Partial fractions in complex analysis (en) Frações parciais em análises complexas (pt) Наипростейшая дробь (ru)
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