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W4308287242 abstract "We provide additional methods for the evaluation of the integral begin{eqnarray} N_{0,4}(a;m) & := & int_{0}^{infty} frac{dx} {left( x^{4} + 2ax^{2} + 1 right)^{m+1}} end{eqnarray} where $m in {mathbb{N}}$ and $a in (-1, infty)$ in the form begin{eqnarray} N_{0,4}(a;m) & = & frac{pi}{2^{m+3/2} (a+1)^{m+1/2} } P_{m}(a) end{eqnarray} where $P_{m}(a)$ is a polynomial in $a$. The first one is based on a method of Schwinger to evaluate integrals appearing in Feynman diagrams, the second one is a byproduct of an expression for a rational integral in terms of Schur functions. Finally, the third proof, is obtained from an integral representation involving modified Bessel functions." @default.
W4308287242 created "2022-11-10" @default.
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W4308287242 date "2010-09-13" @default.
W4308287242 modified "2023-09-27" @default.
W4308287242 title "The Evaluation of a Quartic Integral via Schwinger, Schur and Bessel" @default.
W4308287242 doi "https://doi.org/10.48550/arxiv.1009.2399" @default.
W4308287242 hasPublicationYear "2010" @default.
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